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| \input{preamble} | |
| % OK, start here | |
| % | |
| \begin{document} | |
| \title{de Rham Cohomology} | |
| \maketitle | |
| \phantomsection | |
| \label{section-phantom} | |
| \tableofcontents | |
| \section{Introduction} | |
| \label{section-introduction} | |
| \noindent | |
| In this chapter we start with a discussion of the de Rham complex | |
| of a morphism of schemes and we end with a proof that de Rham cohomology | |
| defines a Weil cohomology theory when the base field has characteristic zero. | |
| \section{The de Rham complex} | |
| \label{section-de-rham-complex} | |
| \noindent | |
| Let $p : X \to S$ be a morphism of schemes. There is a complex | |
| $$ | |
| \Omega^\bullet_{X/S} = | |
| \mathcal{O}_{X/S} \to \Omega^1_{X/S} \to \Omega^2_{X/S} \to \ldots | |
| $$ | |
| of $p^{-1}\mathcal{O}_S$-modules with | |
| $\Omega^i_{X/S} = \wedge^i(\Omega_{X/S})$ | |
| placed in degree $i$ and differential determined by the rule | |
| $\text{d}(g_0 \text{d}g_1 \wedge \ldots \wedge \text{d}g_p) = | |
| \text{d}g_0 \wedge \text{d}g_1 \wedge \ldots \wedge \text{d}g_p$ | |
| on local sections. | |
| See Modules, Section \ref{modules-section-de-rham-complex}. | |
| \medskip\noindent | |
| Given a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| X' \ar[r]_f \ar[d] & X \ar[d] \\ | |
| S' \ar[r] & S | |
| } | |
| $$ | |
| of schemes, there are canonical maps of complexes | |
| $f^{-1}\Omega_{X/S}^\bullet \to \Omega^\bullet_{X'/S'}$ and | |
| $\Omega_{X/S}^\bullet \to f_*\Omega^\bullet_{X'/S'}$. | |
| See Modules, Section \ref{modules-section-de-rham-complex}. | |
| Linearizing, for every $p$ we obtain a linear map | |
| $f^*\Omega^p_{X/S} \to \Omega^p_{X'/S'}$. | |
| \medskip\noindent | |
| In particular, if $f : Y \to X$ be a morphism of schemes over | |
| a base scheme $S$, then there is a map of complexes | |
| $$ | |
| \Omega^\bullet_{X/S} \longrightarrow f_*\Omega^\bullet_{Y/S} | |
| $$ | |
| Linearizing, we see that for every $p \geq 0$ we obtain a canonical map | |
| $$ | |
| \Omega^p_{X/S} \otimes_{\mathcal{O}_X} f_*\mathcal{O}_Y | |
| \longrightarrow | |
| f_*\Omega^p_{Y/S} | |
| $$ | |
| \begin{lemma} | |
| \label{lemma-base-change-de-rham} | |
| Let | |
| $$ | |
| \xymatrix{ | |
| X' \ar[r]_f \ar[d] & X \ar[d] \\ | |
| S' \ar[r] & S | |
| } | |
| $$ | |
| be a cartesian diagram of schemes. Then the maps discussed | |
| above induce isomorphisms | |
| $f^*\Omega^p_{X/S} \to \Omega^p_{X'/S'}$. | |
| \end{lemma} | |
| \begin{proof} | |
| Combine Morphisms, Lemma \ref{morphisms-lemma-base-change-differentials} | |
| with the fact that formation of exterior power commutes with base change. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-etale} | |
| Consider a commutative diagram of schemes | |
| $$ | |
| \xymatrix{ | |
| X' \ar[r]_f \ar[d] & X \ar[d] \\ | |
| S' \ar[r] & S | |
| } | |
| $$ | |
| If $X' \to X$ and $S' \to S$ are \'etale, then the maps discussed | |
| above induce isomorphisms | |
| $f^*\Omega^p_{X/S} \to \Omega^p_{X'/S'}$. | |
| \end{lemma} | |
| \begin{proof} | |
| We have $\Omega_{S'/S} = 0$ and $\Omega_{X'/X} = 0$, see for example | |
| Morphisms, Lemma \ref{morphisms-lemma-etale-at-point}. Then by | |
| the short exact sequences of Morphisms, Lemmas | |
| \ref{morphisms-lemma-triangle-differentials} and | |
| \ref{morphisms-lemma-triangle-differentials-smooth} | |
| we see that $\Omega_{X'/S'} = \Omega_{X'/S} = f^*\Omega_{X/S}$. | |
| Taking exterior powers we conclude. | |
| \end{proof} | |
| \section{de Rham cohomology} | |
| \label{section-de-rham-cohomology} | |
| \noindent | |
| Let $p : X \to S$ be a morphism of schemes. We define the | |
| {\it de Rham cohomology of $X$ over $S$} to be the cohomology | |
| groups | |
| $$ | |
| H^i_{dR}(X/S) = H^i(R\Gamma(X, \Omega^\bullet_{X/S})) | |
| $$ | |
| Since $\Omega^\bullet_{X/S}$ is a complex of $p^{-1}\mathcal{O}_S$-modules, | |
| these cohomology groups are naturally modules over $H^0(S, \mathcal{O}_S)$. | |
| \medskip\noindent | |
| Given a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| X' \ar[r]_f \ar[d] & X \ar[d] \\ | |
| S' \ar[r] & S | |
| } | |
| $$ | |
| of schemes, using the canonical maps of Section \ref{section-de-rham-complex} | |
| we obtain pullback maps | |
| $$ | |
| f^* : | |
| R\Gamma(X, \Omega^\bullet_{X/S}) | |
| \longrightarrow | |
| R\Gamma(X', \Omega^\bullet_{X'/S'}) | |
| $$ | |
| and | |
| $$ | |
| f^* : H^i_{dR}(X/S) \longrightarrow H^i_{dR}(X'/S') | |
| $$ | |
| These pullbacks satisfy an obvious composition law. | |
| In particular, if we work over a fixed base scheme $S$, then de Rham | |
| cohomology is a contravariant functor on the category of schemes over $S$. | |
| \begin{lemma} | |
| \label{lemma-de-rham-affine} | |
| Let $X \to S$ be a morphism of affine schemes given by the ring map | |
| $R \to A$. Then $R\Gamma(X, \Omega^\bullet_{X/S}) = \Omega^\bullet_{A/R}$ | |
| in $D(R)$ and $H^i_{dR}(X/S) = H^i(\Omega^\bullet_{A/R})$. | |
| \end{lemma} | |
| \begin{proof} | |
| This follows from Cohomology of Schemes, Lemma | |
| \ref{coherent-lemma-quasi-coherent-affine-cohomology-zero} | |
| and Leray's acyclicity lemma | |
| (Derived Categories, Lemma \ref{derived-lemma-leray-acyclicity}). | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-quasi-coherence-relative} | |
| Let $p : X \to S$ be a morphism of schemes. If $p$ is quasi-compact | |
| and quasi-separated, then $Rp_*\Omega^\bullet_{X/S}$ is an object | |
| of $D_\QCoh(\mathcal{O}_S)$. | |
| \end{lemma} | |
| \begin{proof} | |
| There is a spectral sequence with first page | |
| $E_1^{a, b} = R^bp_*\Omega^a_{X/S}$ converging to | |
| the cohomology of $Rp_*\Omega^\bullet_{X/S}$ | |
| (see Derived Categories, Lemma \ref{derived-lemma-two-ss-complex-functor}). | |
| Hence by Homology, Lemma \ref{homology-lemma-first-quadrant-ss} | |
| it suffices to show that $R^bp_*\Omega^a_{X/S}$ is quasi-coherent. | |
| This follows from Cohomology of Schemes, Lemma | |
| \ref{coherent-lemma-quasi-coherence-higher-direct-images}. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-coherence-relative} | |
| Let $p : X \to S$ be a proper morphism of schemes with $S$ locally | |
| Noetherian. Then $Rp_*\Omega^\bullet_{X/S}$ is an object | |
| of $D_{\textit{Coh}}(\mathcal{O}_S)$. | |
| \end{lemma} | |
| \begin{proof} | |
| In this case by Morphisms, Lemma \ref{morphisms-lemma-finite-type-differentials} | |
| the modules $\Omega^i_{X/S}$ are coherent. Hence we can use exactly the | |
| same argument as in the proof of Lemma \ref{lemma-quasi-coherence-relative} | |
| using Cohomology of Schemes, Proposition | |
| \ref{coherent-proposition-proper-pushforward-coherent}. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-finite-de-Rham} | |
| Let $A$ be a Noetherian ring. Let $X$ be a proper scheme over $S = \Spec(A)$. | |
| Then $H^i_{dR}(X/S)$ is a finite $A$-module for all $i$. | |
| \end{lemma} | |
| \begin{proof} | |
| This is a special case of Lemma \ref{lemma-coherence-relative}. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-proper-smooth-de-Rham} | |
| Let $f : X \to S$ be a proper smooth morphism of schemes. Then | |
| $Rf_*\Omega^p_{X/S}$, $p \geq 0$ and $Rf_*\Omega^\bullet_{X/S}$ are | |
| perfect objects of $D(\mathcal{O}_S)$ whose formation commutes | |
| with arbitrary change of base. | |
| \end{lemma} | |
| \begin{proof} | |
| Since $f$ is smooth the modules $\Omega^p_{X/S}$ are finite locally | |
| free $\mathcal{O}_X$-modules, see Morphisms, Lemma | |
| \ref{morphisms-lemma-smooth-omega-finite-locally-free}. Their | |
| formation commutes with arbitrary change of base by | |
| Lemma \ref{lemma-base-change-de-rham}. Hence | |
| $Rf_*\Omega^p_{X/S}$ is a perfect object of $D(\mathcal{O}_S)$ | |
| whose formation commutes with abitrary base change, see | |
| Derived Categories of Schemes, Lemma | |
| \ref{perfect-lemma-flat-proper-perfect-direct-image-general}. | |
| This proves the first assertion of the lemma. | |
| \medskip\noindent | |
| To prove that $Rf_*\Omega^\bullet_{X/S}$ is perfect on $S$ we may work | |
| locally on $S$. Thus we may assume $S$ is quasi-compact. This means | |
| we may assume that $\Omega^n_{X/S}$ is zero for $n$ large enough. | |
| For every $p \geq 0$ we claim that | |
| $Rf_*\sigma_{\geq p}\Omega^\bullet_{X/S}$ is a | |
| perfect object of $D(\mathcal{O}_S)$ whose formation commutes | |
| with arbitrary change of base. By the above we see that | |
| this is true for $p \gg 0$. Suppose the claim holds for $p$ | |
| and consider the distinguished triangle | |
| $$ | |
| \sigma_{\geq p}\Omega^\bullet_{X/S} \to | |
| \sigma_{\geq p - 1}\Omega^\bullet_{X/S} \to | |
| \Omega^{p - 1}_{X/S}[-(p - 1)] \to | |
| (\sigma_{\geq p}\Omega^\bullet_{X/S})[1] | |
| $$ | |
| in $D(f^{-1}\mathcal{O}_S)$. | |
| Applying the exact functor $Rf_*$ we obtain a distinguished triangle | |
| in $D(\mathcal{O}_S)$. | |
| Since we have the 2-out-of-3 property for being perfect | |
| (Cohomology, Lemma \ref{cohomology-lemma-two-out-of-three-perfect}) | |
| we conclude $Rf_*\sigma_{\geq p - 1}\Omega^\bullet_{X/S}$ is a | |
| perfect object of $D(\mathcal{O}_S)$. Similarly for the | |
| commutation with arbitrary base change. | |
| \end{proof} | |
| \section{Cup product} | |
| \label{section-cup-product} | |
| \noindent | |
| Consider the maps | |
| $\Omega^p_{X/S} \times \Omega^q_{X/S} \to \Omega^{p + q}_{X/S}$ | |
| given by $(\omega , \eta) \longmapsto \omega \wedge \eta$. | |
| Using the formula for $\text{d}$ given in Section \ref{section-de-rham-complex} | |
| and the Leibniz rule for $\text{d} : \mathcal{O}_X \to \Omega_{X/S}$ | |
| we see that $\text{d}(\omega \wedge \eta) = \text{d}(\omega) \wedge \eta + | |
| (-1)^{\deg(\omega)} \omega \wedge \text{d}(\eta)$. This means that | |
| $\wedge$ defines a morphism | |
| \begin{equation} | |
| \label{equation-wedge} | |
| \wedge : | |
| \text{Tot}( | |
| \Omega^\bullet_{X/S} \otimes_{p^{-1}\mathcal{O}_S} \Omega^\bullet_{X/S}) | |
| \longrightarrow | |
| \Omega^\bullet_{X/S} | |
| \end{equation} | |
| of complexes of $p^{-1}\mathcal{O}_S$-modules. | |
| \medskip\noindent | |
| Combining the cup product of | |
| Cohomology, Section \ref{cohomology-section-cup-product} | |
| with (\ref{equation-wedge}) we find a | |
| $H^0(S, \mathcal{O}_S)$-bilinear cup product map | |
| $$ | |
| \cup : H^i_{dR}(X/S) \times H^j_{dR}(X/S) \longrightarrow H^{i + j}_{dR}(X/S) | |
| $$ | |
| For example, if $\omega \in \Gamma(X, \Omega^i_{X/S})$ and | |
| $\eta \in \Gamma(X, \Omega^j_{X/S})$ are closed, then | |
| the cup product of the de Rham cohomology classes of | |
| $\omega$ and $\eta$ is the de Rham cohomology class of $\omega \wedge \eta$, | |
| see discussion in Cohomology, Section \ref{cohomology-section-cup-product}. | |
| \medskip\noindent | |
| Given a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| X' \ar[r]_f \ar[d] & X \ar[d] \\ | |
| S' \ar[r] & S | |
| } | |
| $$ | |
| of schemes, the pullback maps | |
| $f^* : R\Gamma(X, \Omega^\bullet_{X/S}) \to R\Gamma(X', \Omega^\bullet_{X'/S'})$ | |
| and | |
| $f^* : H^i_{dR}(X/S) \longrightarrow H^i_{dR}(X'/S')$ | |
| are compatible with the cup product defined above. | |
| \begin{lemma} | |
| \label{lemma-cup-product-graded-commutative} | |
| Let $p : X \to S$ be a morphism of schemes. | |
| The cup product on $H^*_{dR}(X/S)$ is associative and | |
| graded commutative. | |
| \end{lemma} | |
| \begin{proof} | |
| This follows from | |
| Cohomology, Lemmas \ref{cohomology-lemma-cup-product-associative} and | |
| \ref{cohomology-lemma-cup-product-commutative} | |
| and the fact that $\wedge$ is associative and graded commutative. | |
| \end{proof} | |
| \begin{remark} | |
| \label{remark-relative-cup-product} | |
| Let $p : X \to S$ be a morphism of schemes. Then we can think of | |
| $\Omega^\bullet_{X/S}$ as a sheaf of differential graded | |
| $p^{-1}\mathcal{O}_S$-algebras, see | |
| Differential Graded Sheaves, Definition \ref{sdga-definition-dga}. | |
| In particular, the discussion in | |
| Differential Graded Sheaves, Section \ref{sdga-section-misc} | |
| applies. For example, this means that for any commutative diagram | |
| $$ | |
| \xymatrix{ | |
| X \ar[d]_p \ar[r]_f & Y \ar[d]^q \\ | |
| S \ar[r]^h & T | |
| } | |
| $$ | |
| of schemes there is a canonical relative cup product | |
| $$ | |
| \mu : | |
| Rf_*\Omega^\bullet_{X/S} | |
| \otimes_{q^{-1}\mathcal{O}_T}^\mathbf{L} | |
| Rf_*\Omega^\bullet_{X/S} | |
| \longrightarrow | |
| Rf_*\Omega^\bullet_{X/S} | |
| $$ | |
| in $D(Y, q^{-1}\mathcal{O}_T)$ which is associative and | |
| which on cohomology reproduces the cup product discussed above. | |
| \end{remark} | |
| \begin{remark} | |
| \label{remark-cup-product-as-a-map} | |
| Let $f : X \to S$ be a morphism of schemes. Let $\xi \in H_{dR}^n(X/S)$. | |
| According to the discussion | |
| Differential Graded Sheaves, Section \ref{sdga-section-misc} | |
| there exists a canonical morphism | |
| $$ | |
| \xi' : \Omega^\bullet_{X/S} \to \Omega^\bullet_{X/S}[n] | |
| $$ | |
| in $D(f^{-1}\mathcal{O}_S)$ uniquely characterized by | |
| (1) and (2) of the following list of properties: | |
| \begin{enumerate} | |
| \item $\xi'$ can be lifted to a map in the derived category of right | |
| differential graded $\Omega^\bullet_{X/S}$-modules, and | |
| \item $\xi'(1) = \xi$ in | |
| $H^0(X, \Omega^\bullet_{X/S}[n]) = H^n_{dR}(X/S)$, | |
| \item the map $\xi'$ sends $\eta \in H^m_{dR}(X/S)$ | |
| to $\xi \cup \eta$ in $H^{n + m}_{dR}(X/S)$, | |
| \item the construction of $\xi'$ commutes with restrictions to | |
| opens: for $U \subset X$ open the restriction $\xi'|_U$ is | |
| the map corresponding to the image $\xi|_U \in H^n_{dR}(U/S)$, | |
| \item for any diagram as in Remark \ref{remark-relative-cup-product} | |
| we obtain a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| Rf_*\Omega^\bullet_{X/S} | |
| \otimes_{q^{-1}\mathcal{O}_T}^\mathbf{L} | |
| Rf_*\Omega^\bullet_{X/S} \ar[d]_{\xi' \otimes \text{id}} | |
| \ar[r]_-\mu & | |
| Rf_*\Omega^\bullet_{X/S} \ar[d]^{\xi'} \\ | |
| Rf_*\Omega^\bullet_{X/S}[n] | |
| \otimes_{q^{-1}\mathcal{O}_T}^\mathbf{L} | |
| Rf_*\Omega^\bullet_{X/S} | |
| \ar[r]^-\mu & | |
| Rf_*\Omega^\bullet_{X/S}[n] | |
| } | |
| $$ | |
| in $D(Y, q^{-1}\mathcal{O}_T)$. | |
| \end{enumerate} | |
| \end{remark} | |
| \section{Hodge cohomology} | |
| \label{section-hodge-cohomology} | |
| \noindent | |
| Let $p : X \to S$ be a morphism of schemes. We define the | |
| {\it Hodge cohomology of $X$ over $S$} to be the cohomology groups | |
| $$ | |
| H^n_{Hodge}(X/S) = \bigoplus\nolimits_{n = p + q} H^q(X, \Omega^p_{X/S}) | |
| $$ | |
| viewed as a graded $H^0(X, \mathcal{O}_X)$-module. The wedge product | |
| of forms combined with the cup product of | |
| Cohomology, Section \ref{cohomology-section-cup-product} | |
| defines a $H^0(X, \mathcal{O}_X)$-bilinear cup product | |
| $$ | |
| \cup : | |
| H^i_{Hodge}(X/S) \times H^j_{Hodge}(X/S) | |
| \longrightarrow | |
| H^{i + j}_{Hodge}(X/S) | |
| $$ | |
| Of course if $\xi \in H^q(X, \Omega^p_{X/S})$ and | |
| $\xi' \in H^{q'}(X, \Omega^{p'}_{X/S})$ then $\xi \cup \xi' \in | |
| H^{q + q'}(X, \Omega^{p + p'}_{X/S})$. | |
| \begin{lemma} | |
| \label{lemma-cup-product-hodge-graded-commutative} | |
| Let $p : X \to S$ be a morphism of schemes. | |
| The cup product on $H^*_{Hodge}(X/S)$ is associative and graded commutative. | |
| \end{lemma} | |
| \begin{proof} | |
| The proof is identical to the proof of | |
| Lemma \ref{lemma-cup-product-graded-commutative}. | |
| \end{proof} | |
| \noindent | |
| Given a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| X' \ar[r]_f \ar[d] & X \ar[d] \\ | |
| S' \ar[r] & S | |
| } | |
| $$ | |
| of schemes, there are pullback maps | |
| $f^* : H^i_{Hodge}(X/S) \longrightarrow H^i_{Hodge}(X'/S')$ | |
| compatible with gradings and with the cup product defined above. | |
| \section{Two spectral sequences} | |
| \label{section-hodge-to-de-rham} | |
| \noindent | |
| Let $p : X \to S$ be a morphism of schemes. Since the category | |
| of $p^{-1}\mathcal{O}_S$-modules on $X$ has enough injectives | |
| there exist a Cartan-Eilenberg resolution for $\Omega^\bullet_{X/S}$. | |
| See Derived Categories, Lemma \ref{derived-lemma-cartan-eilenberg}. | |
| Hence we can apply Derived Categories, Lemma | |
| \ref{derived-lemma-two-ss-complex-functor} to get two spectral sequences | |
| both converging to the de Rham cohomology of $X$ over $S$. | |
| \medskip\noindent | |
| The first is customarily called {\it the Hodge-to-de Rham spectral sequence}. | |
| The first page of this spectral sequence has | |
| $$ | |
| E_1^{p, q} = H^q(X, \Omega^p_{X/S}) | |
| $$ | |
| which are the Hodge cohomology groups of $X/S$ (whence the name). The | |
| differential $d_1$ on this page is given by the maps | |
| $d_1^{p, q} : H^q(X, \Omega^p_{X/S}) \to H^q(X. \Omega^{p + 1}_{X/S})$ | |
| induced by the differential | |
| $\text{d} : \Omega^p_{X/S} \to \Omega^{p + 1}_{X/S}$. | |
| Here is a picture | |
| $$ | |
| \xymatrix{ | |
| H^2(X, \mathcal{O}_X) \ar[r] \ar@{-->}[rrd] \ar@{..>}[rrrdd] & | |
| H^2(X, \Omega^1_{X/S}) \ar[r] \ar@{-->}[rrd] & | |
| H^2(X, \Omega^2_{X/S}) \ar[r] & | |
| H^2(X, \Omega^3_{X/S}) \\ | |
| H^1(X, \mathcal{O}_X) \ar[r] \ar@{-->}[rrd] & | |
| H^1(X, \Omega^1_{X/S}) \ar[r] \ar@{-->}[rrd] & | |
| H^1(X, \Omega^2_{X/S}) \ar[r] & | |
| H^1(X, \Omega^3_{X/S}) \\ | |
| H^0(X, \mathcal{O}_X) \ar[r] & | |
| H^0(X, \Omega^1_{X/S}) \ar[r] & | |
| H^0(X, \Omega^2_{X/S}) \ar[r] & | |
| H^0(X, \Omega^3_{X/S}) | |
| } | |
| $$ | |
| where we have drawn striped arrows to indicate the source and target of | |
| the differentials on the $E_2$ page and a dotted arrow for a differential | |
| on the $E_3$ page. Looking in degree $0$ we conclude that | |
| $$ | |
| H^0_{dR}(X/S) = | |
| \Ker(\text{d} : H^0(X, \mathcal{O}_X) \to H^0(X, \Omega^1_{X/S})) | |
| $$ | |
| Of course, this is also immediately clear from the fact that the | |
| de Rham complex starts in degree $0$ with $\mathcal{O}_X \to \Omega^1_{X/S}$. | |
| \medskip\noindent | |
| The second spectral sequence is usually called | |
| {\it the conjugate spectral sequence}. The second page of this | |
| spectral sequence has | |
| $$ | |
| E_2^{p, q} = H^p(X, H^q(\Omega^\bullet_{X/S})) = H^p(X, \mathcal{H}^q) | |
| $$ | |
| where $\mathcal{H}^q = H^q(\Omega^\bullet_{X/S})$ is the $q$th | |
| cohomology sheaf of the de Rham complex of $X/S$. The differentials | |
| on this page are given by $E_2^{p, q} \to E_2^{p + 2, q - 1}$. | |
| Here is a picture | |
| $$ | |
| \xymatrix{ | |
| H^0(X, \mathcal{H}^2) \ar[rrd] \ar@{..>}[rrrdd] & | |
| H^1(X, \mathcal{H}^2) \ar[rrd] & | |
| H^2(X, \mathcal{H}^2) & | |
| H^3(X, \mathcal{H}^2) \\ | |
| H^0(X, \mathcal{H}^1) \ar[rrd] & | |
| H^1(X, \mathcal{H}^1) \ar[rrd] & | |
| H^2(X, \mathcal{H}^1) & | |
| H^3(X, \mathcal{H}^1) \\ | |
| H^0(X, \mathcal{H}^0) & | |
| H^1(X, \mathcal{H}^0) & | |
| H^2(X, \mathcal{H}^0) & | |
| H^3(X, \mathcal{H}^0) | |
| } | |
| $$ | |
| Looking in degree $0$ we conclude that | |
| $$ | |
| H^0_{dR}(X/S) = H^0(X, \mathcal{H}^0) | |
| $$ | |
| which is obvious if you think about it. In degree $1$ we get an exact sequence | |
| $$ | |
| 0 \to H^1(X, \mathcal{H}^0) \to H^1_{dR}(X/S) \to | |
| H^0(X, \mathcal{H}^1) \to H^2(X, \mathcal{H}^0) \to H^2_{dR}(X/S) | |
| $$ | |
| It turns out that if $X \to S$ is smooth and $S$ lives in characteristic $p$, | |
| then the sheaves $\mathcal{H}^q$ are computable (in terms of a certain | |
| sheaves of differentials) and the conjugate spectral sequence is a valuable | |
| tool (insert future reference here). | |
| \section{The Hodge filtration} | |
| \label{section-hodge-filtration} | |
| \noindent | |
| Let $X \to S$ be a morphism of schemes. The Hodge filtration on $H^n_{dR}(X/S)$ | |
| is the filtration induced by the Hodge-to-de Rham spectral sequence | |
| (Homology, Definition | |
| \ref{homology-definition-filtration-cohomology-filtered-complex}). | |
| To avoid misunderstanding, we explicitly define it as follows. | |
| \begin{definition} | |
| \label{definition-hodge-filtration} | |
| Let $X \to S$ be a morphism of schemes. The {\it Hodge filtration} | |
| on $H^n_{dR}(X/S)$ is the filtration with terms | |
| $$ | |
| F^pH^n_{dR}(X/S) = \Im\left(H^n(X, \sigma_{\geq p}\Omega^\bullet_{X/S}) | |
| \longrightarrow H^n_{dR}(X/S)\right) | |
| $$ | |
| where $\sigma_{\geq p}\Omega^\bullet_{X/S}$ is as in | |
| Homology, Section \ref{homology-section-truncations}. | |
| \end{definition} | |
| \noindent | |
| Of course $\sigma_{\geq p}\Omega^\bullet_{X/S}$ is a subcomplex of | |
| the relative de Rham complex and we obtain a filtration | |
| $$ | |
| \Omega^\bullet_{X/S} = \sigma_{\geq 0}\Omega^\bullet_{X/S} \supset | |
| \sigma_{\geq 1}\Omega^\bullet_{X/S} \supset | |
| \sigma_{\geq 2}\Omega^\bullet_{X/S} \supset | |
| \sigma_{\geq 3}\Omega^\bullet_{X/S} \supset \ldots | |
| $$ | |
| of the relative de Rham complex with | |
| $\text{gr}^p(\Omega^\bullet_{X/S}) = \Omega^p_{X/S}[-p]$. | |
| The spectral sequence constructed in | |
| Cohomology, Lemma \ref{cohomology-lemma-spectral-sequence-filtered-object} | |
| for $\Omega^\bullet_{X/S}$ viewed as a filtered complex of sheaves | |
| is the same as the Hodge-to-de Rham spectral sequence constructed in | |
| Section \ref{section-hodge-to-de-rham} by | |
| Cohomology, Example \ref{cohomology-example-spectral-sequence-bis}. Further the | |
| wedge product (\ref{equation-wedge}) sends | |
| $\text{Tot}(\sigma_{\geq i}\Omega^\bullet_{X/S} \otimes_{p^{-1}\mathcal{O}_S} | |
| \sigma_{\geq j}\Omega^\bullet_{X/S})$ into | |
| $\sigma_{\geq i + j}\Omega^\bullet_{X/S}$. Hence we get | |
| commutative diagrams | |
| $$ | |
| \xymatrix{ | |
| H^n(X, \sigma_{\geq j}\Omega^\bullet_{X/S})) | |
| \times | |
| H^m(X, \sigma_{\geq j}\Omega^\bullet_{X/S})) | |
| \ar[r] \ar[d] & | |
| H^{n + m}(X, \sigma_{\geq i + j}\Omega^\bullet_{X/S})) \ar[d] \\ | |
| H^n_{dR}(X/S) \times | |
| H^m_{dR}(X/S) | |
| \ar[r]^\cup & | |
| H^{n + m}_{dR}(X/S) | |
| } | |
| $$ | |
| In particular we find that | |
| $$ | |
| F^iH^n_{dR}(X/S) \cup F^jH^m_{dR}(X/S) \subset F^{i + j}H^{n + m}_{dR}(X/S) | |
| $$ | |
| \section{K\"unneth formula} | |
| \label{section-kunneth} | |
| \noindent | |
| An important feature of de Rham cohomology is that there is a | |
| K\"unneth formula. | |
| \medskip\noindent | |
| Let $a : X \to S$ and $b : Y \to S$ be morphisms of schemes with the same | |
| target. Let $p : X \times_S Y \to X$ and $q : X \times_S Y \to Y$ be the | |
| projection morphisms and $f = a \circ p = b \circ q$. Here is a picture | |
| $$ | |
| \xymatrix{ | |
| & X \times_S Y \ar[ld]^p \ar[rd]_q \ar[dd]^f \\ | |
| X \ar[rd]_a & & Y \ar[ld]^b \\ | |
| & S | |
| } | |
| $$ | |
| In this section, given an $\mathcal{O}_X$-module $\mathcal{F}$ | |
| and an $\mathcal{O}_Y$-module $\mathcal{G}$ let us set | |
| $$ | |
| \mathcal{F} \boxtimes \mathcal{G} = | |
| p^*\mathcal{F} \otimes_{\mathcal{O}_{X \times_S Y}} q^*\mathcal{G} | |
| $$ | |
| The bifunctor | |
| $(\mathcal{F}, \mathcal{G}) \mapsto \mathcal{F} \boxtimes \mathcal{G}$ | |
| on quasi-coherent modules extends to a bifunctor on quasi-coherent modules | |
| and differential operators of finite over over $S$, see | |
| Morphisms, Remark \ref{morphisms-remark-base-change-differential-operators}. | |
| Since the differentials of the de Rham complexes $\Omega^\bullet_{X/S}$ and | |
| $\Omega^\bullet_{Y/S}$ are differential operators of order $1$ | |
| over $S$ by Modules, Lemma | |
| \ref{modules-lemma-differentials-relative-de-rham-complex-order-1}. | |
| Thus it makes sense to consider the complex | |
| $$ | |
| \text{Tot}(\Omega^\bullet_{X/S} \boxtimes \Omega^\bullet_{Y/S}) | |
| $$ | |
| Please see the discussion in Derived Categories of Schemes, Section | |
| \ref{perfect-section-kunneth-complexes}. | |
| \begin{lemma} | |
| \label{lemma-de-rham-complex-product} | |
| In the situation above there is a canonical isomorphism | |
| $$ | |
| \text{Tot}(\Omega^\bullet_{X/S} \boxtimes \Omega^\bullet_{Y/S}) | |
| \longrightarrow | |
| \Omega^\bullet_{X \times_S Y/S} | |
| $$ | |
| of complexes of $f^{-1}\mathcal{O}_S$-modules. | |
| \end{lemma} | |
| \begin{proof} | |
| We know that | |
| $ | |
| \Omega_{X \times_S Y/S} = p^*\Omega_{X/S} \oplus q^*\Omega_{Y/S} | |
| $ | |
| by Morphisms, Lemma \ref{morphisms-lemma-differential-product}. | |
| Taking exterior powers we obtain | |
| $$ | |
| \Omega^n_{X \times_S Y/S} = | |
| \bigoplus\nolimits_{i + j = n} | |
| p^*\Omega^i_{X/S} \otimes_{\mathcal{O}_{X \times_S Y}} q^*\Omega^j_{Y/S} = | |
| \bigoplus\nolimits_{i + j = n} | |
| \Omega^i_{X/S} \boxtimes \Omega^j_{Y/S} | |
| $$ | |
| by elementary properties of exterior powers. These identifications determine | |
| isomorphisms between the terms of the complexes on the left and the right | |
| of the arrow in the lemma. We omit the verification that these maps | |
| are compatible with differentials. | |
| \end{proof} | |
| \noindent | |
| Set $A = \Gamma(S, \mathcal{O}_S)$. Combining the result of | |
| Lemma \ref{lemma-de-rham-complex-product} with the map | |
| Derived Categories of Schemes, Equation | |
| (\ref{perfect-equation-de-rham-kunneth}) | |
| we obtain a cup product | |
| $$ | |
| R\Gamma(X, \Omega^\bullet_{X/S}) | |
| \otimes_A^\mathbf{L} | |
| R\Gamma(Y, \Omega^\bullet_{Y/S}) | |
| \longrightarrow | |
| R\Gamma(X \times_S Y, \Omega^\bullet_{X \times_S Y/S}) | |
| $$ | |
| On the level of cohomology, using the discussion in | |
| More on Algebra, Section \ref{more-algebra-section-products-tor}, | |
| we obtain a canonical map | |
| $$ | |
| H^i_{dR}(X/S) \otimes_A H^j_{dR}(Y/S) | |
| \longrightarrow | |
| H^{i + j}_{dR}(X \times_S Y/S),\quad | |
| (\xi, \zeta) \longmapsto p^*\xi \cup q^*\zeta | |
| $$ | |
| We note that the construction above indeed proceeds by | |
| first pulling back and then taking the cup product. | |
| \begin{lemma} | |
| \label{lemma-kunneth-de-rham} | |
| Assume $X$ and $Y$ are smooth, quasi-compact, with affine diagonal over | |
| $S = \Spec(A)$. Then the map | |
| $$ | |
| R\Gamma(X, \Omega^\bullet_{X/S}) | |
| \otimes_A^\mathbf{L} | |
| R\Gamma(Y, \Omega^\bullet_{Y/S}) | |
| \longrightarrow | |
| R\Gamma(X \times_S Y, \Omega^\bullet_{X \times_S Y/S}) | |
| $$ | |
| is an isomorphism in $D(A)$. | |
| \end{lemma} | |
| \begin{proof} | |
| By Morphisms, Lemma \ref{morphisms-lemma-smooth-omega-finite-locally-free} | |
| the sheaves $\Omega^n_{X/S}$ and $\Omega^m_{Y/S}$ are finite locally free | |
| $\mathcal{O}_X$ and $\mathcal{O}_Y$-modules. On the other hand, $X$ and $Y$ | |
| are flat over $S$ (Morphisms, Lemma \ref{morphisms-lemma-smooth-flat}) | |
| and hence we find that $\Omega^n_{X/S}$ and $\Omega^m_{Y/S}$ are flat over $S$. | |
| Also, observe that $\Omega^\bullet_{X/S}$ is a locally bounded. Thus | |
| the result by Lemma \ref{lemma-de-rham-complex-product} and | |
| Derived Categories of Schemes, Lemma \ref{perfect-lemma-kunneth-special}. | |
| \end{proof} | |
| \noindent | |
| There is a relative version of the cup product, namely a map | |
| $$ | |
| Ra_*\Omega^\bullet_{X/S} | |
| \otimes_{\mathcal{O}_S}^\mathbf{L} | |
| Rb_*\Omega^\bullet_{Y/S} | |
| \longrightarrow | |
| Rf_*\Omega^\bullet_{X \times_S Y/S} | |
| $$ | |
| in $D(\mathcal{O}_S)$. The construction combines | |
| Lemma \ref{lemma-de-rham-complex-product} with the map | |
| Derived Categories of Schemes, Equation | |
| (\ref{perfect-equation-relative-de-rham-kunneth}). | |
| The construction shows that this map is given by the diagram | |
| $$ | |
| \xymatrix{ | |
| Ra_*\Omega^\bullet_{X/S} | |
| \otimes_{\mathcal{O}_S}^\mathbf{L} | |
| Rb_*\Omega^\bullet_{Y/S} | |
| \ar[d]^{\text{units of adjunction}} \\ | |
| Rf_*(p^{-1}\Omega^\bullet_{X/S}) | |
| \otimes_{\mathcal{O}_S}^\mathbf{L} | |
| Rf_*(q^{-1}\Omega^\bullet_{Y/S}) \ar[r] \ar[d]^{\text{relative cup product}} & | |
| Rf_*(\Omega^\bullet_{X \times_S Y/S}) | |
| \otimes_{\mathcal{O}_S}^\mathbf{L} | |
| Rf_*(\Omega^\bullet_{X \times_S Y/S}) \ar[d]^{\text{relative cup product}} \\ | |
| Rf_*(p^{-1}\Omega^\bullet_{X/S} | |
| \otimes_{f^{-1}\mathcal{O}_S}^\mathbf{L} | |
| q^{-1}\Omega^\bullet_{Y/S}) | |
| \ar[d]^{\text{from derived to usual}} \ar[r] & | |
| Rf_*(\Omega^\bullet_{X \times_S Y/S} | |
| \otimes_{f^{-1}\mathcal{O}_S}^\mathbf{L} | |
| \Omega^\bullet_{X \times_S Y/S}) | |
| \ar[d]^{\text{from derived to usual}} \\ | |
| Rf_*\text{Tot}(p^{-1}\Omega^\bullet_{X/S} | |
| \otimes_{f^{-1}\mathcal{O}_S} | |
| q^{-1}\Omega^\bullet_{Y/S}) \ar[r] \ar[d]^{\text{canonical map}} & | |
| Rf_*\text{Tot}(\Omega^\bullet_{X \times_S Y/S} | |
| \otimes_{f^{-1}\mathcal{O}_S} | |
| \Omega^\bullet_{X \times_S Y/S}) | |
| \ar[d]^{\eta \otimes \omega \mapsto \eta \wedge \omega} \\ | |
| Rf_*\text{Tot}(\Omega^\bullet_{X/S} \boxtimes \Omega^\bullet_{Y/S}) | |
| \ar@{=}[r] | |
| & | |
| Rf_*\Omega^\bullet_{X \times_S Y/S} | |
| } | |
| $$ | |
| Here the first arrow uses the units $\text{id} \to Rp_* p^{-1}$ | |
| and $\text{id} \to Rq_* q^{-1}$ of adjunction as well as the | |
| identifications $Rf_* p^{-1} = Ra_* Rp_* p^{-1}$ and | |
| $Rf_* q^{-1} = Rb_* Rq_* q^{-1}$. | |
| The second arrow is the relative cup product of | |
| Cohomology, Remark \ref{cohomology-remark-cup-product}. | |
| The third arrow is the map sending a derived tensor product | |
| of complexes to the totalization of the tensor product of complexes. | |
| The final equality is Lemma \ref{lemma-de-rham-complex-product}. | |
| This construction recovers on global section the construction given earlier. | |
| \begin{lemma} | |
| \label{lemma-kunneth-de-rham-relative} | |
| Assume $X \to S$ and $Y \to S$ are smooth and quasi-compact | |
| and the morphisms $X \to X \times_S X$ and $Y \to Y \times_S Y$ are affine. | |
| Then the relative cup product | |
| $$ | |
| Ra_*\Omega^\bullet_{X/S} | |
| \otimes_{\mathcal{O}_S}^\mathbf{L} | |
| Rb_*\Omega^\bullet_{Y/S} | |
| \longrightarrow | |
| Rf_*\Omega^\bullet_{X \times_S Y/S} | |
| $$ | |
| is an isomorphism in $D(\mathcal{O}_S)$. | |
| \end{lemma} | |
| \begin{proof} | |
| Immediate consequence of Lemma \ref{lemma-kunneth-de-rham}. | |
| \end{proof} | |
| \section{First Chern class in de Rham cohomology} | |
| \label{section-first-chern-class} | |
| \noindent | |
| Let $X \to S$ be a morphism of schemes. There is a map of complexes | |
| $$ | |
| \text{d}\log : \mathcal{O}_X^*[-1] \longrightarrow \Omega^\bullet_{X/S} | |
| $$ | |
| which sends the section $g \in \mathcal{O}_X^*(U)$ to the section | |
| $\text{d}\log(g) = g^{-1}\text{d}g$ of $\Omega^1_{X/S}(U)$. | |
| Thus we can consider the map | |
| $$ | |
| \Pic(X) = H^1(X, \mathcal{O}_X^*) = | |
| H^2(X, \mathcal{O}_X^*[-1]) \longrightarrow H^2_{dR}(X/S) | |
| $$ | |
| where the first equality is | |
| Cohomology, Lemma \ref{cohomology-lemma-h1-invertible}. | |
| The image of the isomorphism class of the invertible module | |
| $\mathcal{L}$ is denoted $c^{dR}_1(\mathcal{L}) \in H^2_{dR}(X/S)$. | |
| \medskip\noindent | |
| We can also use the map $\text{d}\log : \mathcal{O}_X^* \to \Omega^1_{X/S}$ | |
| to define a Chern class in Hodge cohomology | |
| $$ | |
| c_1^{Hodge} : \Pic(X) \longrightarrow H^1(X, \Omega^1_{X/S}) | |
| \subset H^2_{Hodge}(X/S) | |
| $$ | |
| These constructions are compatible with pullbacks. | |
| \begin{lemma} | |
| \label{lemma-pullback-c1} | |
| Given a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| X' \ar[r]_f \ar[d] & X \ar[d] \\ | |
| S' \ar[r] & S | |
| } | |
| $$ | |
| of schemes the diagrams | |
| $$ | |
| \xymatrix{ | |
| \Pic(X') \ar[d]_{c_1^{dR}} & | |
| \Pic(X) \ar[d]^{c_1^{dR}} \ar[l]^{f^*} \\ | |
| H^2_{dR}(X'/S') & | |
| H^2_{dR}(X/S) \ar[l]_{f^*} | |
| } | |
| \quad | |
| \xymatrix{ | |
| \Pic(X') \ar[d]_{c_1^{Hodge}} & | |
| \Pic(X) \ar[d]^{c_1^{Hodge}} \ar[l]^{f^*} \\ | |
| H^1(X', \Omega^1_{X'/S'}) & | |
| H^1(X, \Omega^1_{X/S}) \ar[l]_{f^*} | |
| } | |
| $$ | |
| commute. | |
| \end{lemma} | |
| \begin{proof} | |
| Omitted. | |
| \end{proof} | |
| \noindent | |
| Let us ``compute'' the element $c^{dR}_1(\mathcal{L})$ in {\v C}ech | |
| cohomology (with sign rules for {\v C}ech differentials | |
| as in Cohomology, Section | |
| \ref{cohomology-section-cech-cohomology-of-complexes}). | |
| Namely, choose an open covering | |
| $\mathcal{U} : X = \bigcup_{i \in I} U_i$ such that | |
| we have a trivializing section $s_i$ of $\mathcal{L}|_{U_i}$ for all $i$. | |
| On the overlaps $U_{i_0i_1} = U_{i_0} \cap U_{i_1}$ | |
| we have an invertible function $f_{i_0i_1}$ such that | |
| $f_{i_0i_1} = s_{i_1}|_{U_{i_0i_1}} s_{i_0}|_{U_{i_0i_1}}^{-1}$\footnote{The | |
| {\v C}ech differential of a $0$-cycle $\{a_{i_0}\}$ has | |
| $a_{i_1} - a_{i_0}$ over $U_{i_0i_1}$.}. | |
| Of course we have | |
| $$ | |
| f_{i_1i_2}|_{U_{i_0i_1i_2}} | |
| f_{i_0i_2}^{-1}|_{U_{i_0i_1i_2}} | |
| f_{i_0i_1}|_{U_{i_0i_1i_2}} = 1 | |
| $$ | |
| The cohomology class of $\mathcal{L}$ in $H^1(X, \mathcal{O}_X^*)$ is | |
| the image of the {\v C}ech cohomology class of the cocycle $\{f_{i_0i_1}\}$ in | |
| $\check{\mathcal{C}}^\bullet(\mathcal{U}, \mathcal{O}_X^*)$. | |
| Therefore we see that $c_1^{dR}(\mathcal{L})$ is the image | |
| of the cohomology class associated to the {\v C}ech cocycle | |
| $\{\alpha_{i_0 \ldots i_p}\}$ in | |
| $\text{Tot}(\check{\mathcal{C}}^\bullet(\mathcal{U}, \Omega_{X/S}^\bullet))$ | |
| of degree $2$ given by | |
| \begin{enumerate} | |
| \item $\alpha_{i_0} = 0$ in $\Omega^2_{X/S}(U_{i_0})$, | |
| \item $\alpha_{i_0i_1} = f_{i_0i_1}^{-1}\text{d}f_{i_0i_1}$ in | |
| $\Omega^1_{X/S}(U_{i_0i_1})$, and | |
| \item $\alpha_{i_0i_1i_2} = 0$ in $\mathcal{O}_{X/S}(U_{i_0i_1i_2})$. | |
| \end{enumerate} | |
| Suppose we have invertible modules $\mathcal{L}_k$, $k = 1, \ldots, a$ | |
| each trivialized over $U_i$ for all $i \in I$ giving rise to cocycles | |
| $f_{k, i_0i_1}$ and $\alpha_k = \{\alpha_{k, i_0 \ldots i_p}\}$ as above. | |
| Using the rule in | |
| Cohomology, Section \ref{cohomology-section-cech-cohomology-of-complexes} | |
| we can compute | |
| $$ | |
| \beta = \alpha_1 \cup \alpha_2 \cup \ldots \cup \alpha_a | |
| $$ | |
| to be given by the cocycle $\beta = \{\beta_{i_0 \ldots i_p}\}$ | |
| described as follows | |
| \begin{enumerate} | |
| \item $\beta_{i_0 \ldots i_p} = 0$ in | |
| $\Omega^{2a - p}_{X/S}(U_{i_0 \ldots i_p})$ unless $p = a$, and | |
| \item $\beta_{i_0 \ldots i_a} = (-1)^{a(a - 1)/2} | |
| \alpha_{1, i_0i_1} \wedge \alpha_{2, i_1 i_2} \wedge \ldots \wedge | |
| \alpha_{a, i_{a - 1}i_a}$ in | |
| $\Omega^a_{X/S}(U_{i_0 \ldots i_a})$. | |
| \end{enumerate} | |
| Thus this is a cocycle representing | |
| $c_1^{dR}(\mathcal{L}_1) \cup \ldots \cup c_1^{dR}(\mathcal{L}_a)$ | |
| Of course, the same computation shows that the cocycle | |
| $\{\beta_{i_0 \ldots i_a}\}$ in | |
| $\check{\mathcal{C}}^a(\mathcal{U}, \Omega_{X/S}^a))$ | |
| represents the cohomology class | |
| $c_1^{Hodge}(\mathcal{L}_1) \cup \ldots \cup c_1^{Hodge}(\mathcal{L}_a)$ | |
| \begin{remark} | |
| \label{remark-truncations} | |
| Here is a reformulation of the calculations above in more abstract terms. | |
| Let $p : X \to S$ be a morphism of schemes. Let $\mathcal{L}$ be an | |
| invertible $\mathcal{O}_X$-module. If we view $\text{d}\log$ as a map | |
| $$ | |
| \mathcal{O}_X^*[-1] \to \sigma_{\geq 1}\Omega^\bullet_{X/S} | |
| $$ | |
| then using $\Pic(X) = H^1(X, \mathcal{O}_X^*)$ as above we find a | |
| cohomology class | |
| $$ | |
| \gamma_1(\mathcal{L}) \in H^2(X, \sigma_{\geq 1}\Omega^\bullet_{X/S}) | |
| $$ | |
| The image of $\gamma_1(\mathcal{L})$ under the map | |
| $\sigma_{\geq 1}\Omega^\bullet_{X/S} \to \Omega^\bullet_{X/S}$ | |
| recovers $c_1^{dR}(\mathcal{L})$. In particular we see that | |
| $c_1^{dR}(\mathcal{L}) \in F^1H^2_{dR}(X/S)$, see | |
| Section \ref{section-hodge-filtration}. The image of $\gamma_1(\mathcal{L})$ | |
| under the map $\sigma_{\geq 1}\Omega^\bullet_{X/S} \to \Omega^1_{X/S}[-1]$ | |
| recovers $c_1^{Hodge}(\mathcal{L})$. Taking the cup product | |
| (see Section \ref{section-hodge-filtration}) we obtain | |
| $$ | |
| \xi = \gamma_1(\mathcal{L}_1) \cup \ldots \cup \gamma_1(\mathcal{L}_a) \in | |
| H^{2a}(X, \sigma_{\geq a}\Omega^\bullet_{X/S}) | |
| $$ | |
| The commutative diagrams in Section \ref{section-hodge-filtration} | |
| show that $\xi$ is mapped to | |
| $c_1^{dR}(\mathcal{L}_1) \cup \ldots \cup c_1^{dR}(\mathcal{L}_a)$ | |
| in $H^{2a}_{dR}(X/S)$ by the map | |
| $\sigma_{\geq a}\Omega^\bullet_{X/S} \to \Omega^\bullet_{X/S}$. | |
| Also, it follows | |
| $c_1^{dR}(\mathcal{L}_1) \cup \ldots \cup c_1^{dR}(\mathcal{L}_a)$ | |
| is contained in $F^a H^{2a}_{dR}(X/S)$. Similarly, the map | |
| $\sigma_{\geq a}\Omega^\bullet_{X/S} \to \Omega^a_{X/S}[-a]$ | |
| sends $\xi$ to | |
| $c_1^{Hodge}(\mathcal{L}_1) \cup \ldots \cup c_1^{Hodge}(\mathcal{L}_a)$ | |
| in $H^a(X, \Omega^a_{X/S})$. | |
| \end{remark} | |
| \begin{remark} | |
| \label{remark-log-forms} | |
| Let $p : X \to S$ be a morphism of schemes. For $i > 0$ | |
| denote $\Omega^i_{X/S, log} \subset \Omega^i_{X/S}$ the abelian subsheaf | |
| generated by local sections of the form | |
| $$ | |
| \text{d}\log(u_1) \wedge \ldots \wedge \text{d}\log(u_i) | |
| $$ | |
| where $u_1, \ldots, u_n$ are invertible local sections of $\mathcal{O}_X$. | |
| For $i = 0$ the subsheaf $\Omega^0_{X/S, log} \subset \mathcal{O}_X$ | |
| is the image of $\mathbf{Z} \to \mathcal{O}_X$. For every $i \geq 0$ we | |
| have a map of complexes | |
| $$ | |
| \Omega^i_{X/S, log}[-i] \longrightarrow \Omega^\bullet_{X/S} | |
| $$ | |
| because the derivative of a logarithmic form is zero. Moreover, wedging | |
| logarithmic forms gives another, hence we find bilinear maps | |
| $$ | |
| \wedge : \Omega^i_{X/S, log} \times | |
| \Omega^j_{X/S, log} \longrightarrow \Omega^{i + j}_{X/S, log} | |
| $$ | |
| compatible with (\ref{equation-wedge}) and the maps above. | |
| Let $\mathcal{L}$ be an invertible $\mathcal{O}_X$-module. | |
| Using the map of abelian sheaves | |
| $\text{d}\log : \mathcal{O}_X^* \to \Omega^1_{X/S, log}$ | |
| and the identification $\Pic(X) = H^1(X, \mathcal{O}_X^*)$ | |
| we find a canonical cohomology class | |
| $$ | |
| \tilde \gamma_1(\mathcal{L}) \in H^1(X, \Omega^1_{X/S, log}) | |
| $$ | |
| These classes have the following properties | |
| \begin{enumerate} | |
| \item the image of $\tilde \gamma_1(\mathcal{L})$ under the canonical | |
| map $\Omega^1_{X/S, log}[-1] \to \sigma_{\geq 1}\Omega^\bullet_{X/S}$ | |
| sends $\tilde \gamma_1(\mathcal{L})$ to the class | |
| $\gamma_1(\mathcal{L}) \in | |
| H^2(X, \sigma_{\geq 1}\Omega^\bullet_{X/S})$ | |
| of Remark \ref{remark-truncations}, | |
| \item the image of $\tilde \gamma_1(\mathcal{L})$ under the canonical | |
| map $\Omega^1_{X/S, log}[-1] \to \Omega^\bullet_{X/S}$ | |
| sends $\tilde \gamma_1(\mathcal{L})$ to $c_1^{dR}(\mathcal{L})$ in | |
| $H^2_{dR}(X/S)$, | |
| \item the image of $\tilde \gamma_1(\mathcal{L})$ under the canonical | |
| map $\Omega^1_{X/S, log} \to \Omega^1_{X/S}$ | |
| sends $\tilde \gamma_1(\mathcal{L})$ to $c_1^{Hodge}(\mathcal{L})$ in | |
| $H^1(X, \Omega^1_{X/S})$, | |
| \item the construction of these classes is compatible with pullbacks, | |
| \item add more here. | |
| \end{enumerate} | |
| \end{remark} | |
| \section{de Rham cohomology of a line bundle} | |
| \label{section-line-bundle} | |
| \noindent | |
| A line bundle is a special case of a vector bundle, which in turn is a | |
| cone endowed with some extra structure. To intelligently talk about | |
| the de Rham complex of these, it makes sense to discuss the de Rham | |
| complex of a graded ring. | |
| \begin{remark}[de Rham complex of a graded ring] | |
| \label{remark-de-rham-complex-graded} | |
| Let $G$ be an abelian monoid written additively with neutral element $0$. | |
| Let $R \to A$ be a ring map and assume $A$ comes with a grading | |
| $A = \bigoplus_{g \in G} A_g$ by $R$-modules such that $R$ maps into $A_0$ | |
| and $A_g \cdot A_{g'} \subset A_{g + g'}$. Then the module of differentials | |
| comes with a grading | |
| $$ | |
| \Omega_{A/R} = \bigoplus\nolimits_{g \in G} \Omega_{A/R, g} | |
| $$ | |
| where $\Omega_{A/R, g}$ is the $R$-submodule of $\Omega_{A/R}$ | |
| generated by $a_0 \text{d}a_1$ with $a_i \in A_{g_i}$ such that | |
| $g = g_0 + g_1$. Similarly, we obtain | |
| $$ | |
| \Omega^p_{A/R} = \bigoplus\nolimits_{g \in G} \Omega^p_{A/R, g} | |
| $$ | |
| where $\Omega^p_{A/R, g}$ is the $R$-submodule of $\Omega^p_{A/R}$ | |
| generated by $a_0 \text{d}a_1 \wedge \ldots \wedge \text{d}a_p$ | |
| with $a_i \in A_{g_i}$ such that $g = g_0 + g_1 + \ldots + g_p$. | |
| Of course the differentials preserve the grading and the wedge | |
| product is compatible with the gradings in the obvious manner. | |
| \end{remark} | |
| \noindent | |
| Let $f : X \to S$ be a morphism of schemes. Let $\pi : C \to X$ be a cone, see | |
| Constructions, Definition \ref{constructions-definition-abstract-cone}. | |
| Recall that this means $\pi$ is affine and we have a grading | |
| $\pi_*\mathcal{O}_C = \bigoplus_{n \geq 0} \mathcal{A}_n$ with | |
| $\mathcal{A}_0 = \mathcal{O}_X$. | |
| Using the discussion in Remark \ref{remark-de-rham-complex-graded} | |
| over affine opens we find that\footnote{With excuses for the notation!} | |
| $$ | |
| \pi_*(\Omega^\bullet_{C/S}) = | |
| \bigoplus\nolimits_{n \geq 0} \Omega^\bullet_{C/S, n} | |
| $$ | |
| is canonically a direct sum of subcomplexes. Moreover, we have a factorization | |
| $$ | |
| \Omega^\bullet_{X/S} \to \Omega^\bullet_{C/S, 0} \to | |
| \pi_*(\Omega^\bullet_{C/S}) | |
| $$ | |
| and we know that $\omega \wedge \eta \in \Omega^{p + q}_{C/S, n + m}$ | |
| if $\omega \in \Omega^p_{C/S, n}$ and $\eta \in \Omega^q_{C/S, m}$. | |
| \medskip\noindent | |
| Let $f : X \to S$ be a morphism of schemes. Let $\pi : L \to X$ be the | |
| line bundle associated to the invertible $\mathcal{O}_X$-module $\mathcal{L}$. | |
| This means that $\pi$ is the unique affine morphism such that | |
| $$ | |
| \pi_*\mathcal{O}_L = | |
| \bigoplus\nolimits_{n \geq 0} \mathcal{L}^{\otimes n} | |
| $$ | |
| as $\mathcal{O}_X$-algebras. Thus $L$ is a cone over $X$. | |
| By the discussion above we find a | |
| canonical direct sum decomposition | |
| $$ | |
| \pi_*(\Omega^\bullet_{L/S}) = | |
| \bigoplus\nolimits_{n \geq 0} \Omega^\bullet_{L/S, n} | |
| $$ | |
| compatible with wedge product, compatible with the decomposition | |
| of $\pi_*\mathcal{O}_L$ above, and such that $\Omega_{X/S}$ | |
| maps into the part $\Omega_{L/S, 0}$ of degree $0$. | |
| \medskip\noindent | |
| There is another case which will be useful to us. Namely, consider the | |
| complement\footnote{The scheme $L^\star$ is the $\mathbf{G}_m$-torsor | |
| over $X$ associated to $L$. This is why the grading we get below is | |
| a $\mathbf{Z}$-grading, compare with Groupoids, | |
| Example \ref{groupoids-example-Gm-on-affine} and | |
| Lemmas \ref{groupoids-lemma-complete-reducibility-Gm} and | |
| \ref{groupoids-lemma-Gm-equivariant-module}.} | |
| $L^\star \subset L$ of the zero section $o : X \to L$ in our line | |
| bundle $L$. A local computation shows we have a canonical isomorphism | |
| $$ | |
| (L^\star \to X)_*\mathcal{O}_{L^\star} = | |
| \bigoplus\nolimits_{n \in \mathbf{Z}} \mathcal{L}^{\otimes n} | |
| $$ | |
| of $\mathcal{O}_X$-algebras. The right hand side is a $\mathbf{Z}$-graded | |
| quasi-coherent $\mathcal{O}_X$-algebra. Using the discussion in | |
| Remark \ref{remark-de-rham-complex-graded} over affine opens we find that | |
| $$ | |
| (L^\star \to X)_*(\Omega^\bullet_{L^\star/S}) = | |
| \bigoplus\nolimits_{n \in \mathbf{Z}} \Omega^\bullet_{L^\star/S, n} | |
| $$ | |
| compatible with wedge product, compatible with the decomposition | |
| of $(L^\star \to X)_*\mathcal{O}_{L^\star}$ above, and such that | |
| $\Omega_{X/S}$ maps into the part $\Omega_{L^\star/S, 0}$ of degree $0$. | |
| The complex $\Omega^\bullet_{L^\star/S, 0}$ will be | |
| of particular interest to us. | |
| \begin{lemma} | |
| \label{lemma-the-complex-for-L-star} | |
| With notation as above, there is a short exact sequence of complexes | |
| $$ | |
| 0 \to \Omega^\bullet_{X/S} \to | |
| \Omega^\bullet_{L^\star/S, 0} \to | |
| \Omega^\bullet_{X/S}[-1] \to 0 | |
| $$ | |
| \end{lemma} | |
| \begin{proof} | |
| We have constructed the map | |
| $\Omega^\bullet_{X/S} \to \Omega^\bullet_{L^\star/S, 0}$ above. | |
| \medskip\noindent | |
| Construction of | |
| $\text{Res} : \Omega^\bullet_{L^\star/S, 0} \to \Omega^\bullet_{X/S}[-1]$. | |
| Let $U \subset X$ be an open and let $s \in \mathcal{L}(U)$ | |
| and $s' \in \mathcal{L}^{\otimes -1}(U)$ be sections such that | |
| $s' s = 1$. Then $s$ gives an invertible section of the sheaf of | |
| algebras $(L^\star \to X)_*\mathcal{O}_{L^\star}$ over $U$ | |
| with inverse $s' = s^{-1}$. Then we can consider the $1$-form | |
| $\text{d}\log(s) = s' \text{d}(s)$ which is an element of | |
| $\Omega^1_{L^\star/S, 0}(U)$ by our construction of the grading on | |
| $\Omega^1_{L^\star/S}$. Our computations on affines given below | |
| will show that $1$ and $\text{d}\log(s)$ freely generate | |
| $\Omega^\bullet_{L^\star/S, 0}|_U$ as a right module over | |
| $\Omega^\bullet_{X/S}|_U$. | |
| Thus we can define $\text{Res}$ over $U$ by the rule | |
| $$ | |
| \text{Res}(\omega' + \text{d}\log(s) \wedge \omega) = \omega | |
| $$ | |
| for all $\omega', \omega \in \Omega^\bullet_{X/S}(U)$. This | |
| map is independent of the choice of local generator $s$ and hence | |
| glues to give a global map. Namely, another choice of $s$ | |
| would be of the form $gs$ for some invertible $g \in \mathcal{O}_X(U)$ | |
| and we would get $\text{d}\log(gs) = g^{-1}\text{d}(g) + \text{d}\log(s)$ | |
| from which the independence easily follows. | |
| Finally, observe that our rule for $\text{Res}$ | |
| is compatible with differentials | |
| as $\text{d}(\omega' + \text{d}\log(s) \wedge \omega) = | |
| \text{d}(\omega') - \text{d}\log(s) \wedge \text{d}(\omega)$ | |
| and because the differential on $\Omega^\bullet_{X/S}[-1]$ | |
| sends $\omega'$ to $-\text{d}(\omega')$ by our sign convention in | |
| Homology, Definition \ref{homology-definition-shift-cochain}. | |
| \medskip\noindent | |
| Local computation. We can cover $X$ by affine opens $U \subset X$ | |
| such that $\mathcal{L}|_U \cong \mathcal{O}_U$ which moreover map | |
| into an affine open $V \subset S$. Write $U = \Spec(A)$, $V = \Spec(R)$ | |
| and choose a generator $s$ of $\mathcal{L}$. We find that we have | |
| $$ | |
| L^\star \times_X U = \Spec(A[s, s^{-1}]) | |
| $$ | |
| Computing differentials we see that | |
| $$ | |
| \Omega^1_{A[s, s^{-1}]/R} = | |
| A[s, s^{-1}] \otimes_A \Omega^1_{A/R} \oplus A[s, s^{-1}] \text{d}\log(s) | |
| $$ | |
| and therefore taking exterior powers we obtain | |
| $$ | |
| \Omega^p_{A[s, s^{-1}]/R} = | |
| A[s, s^{-1}] \otimes_A \Omega^p_{A/R} | |
| \oplus | |
| A[s, s^{-1}] \text{d}\log(s) \otimes_A \Omega^{p - 1}_{A/R} | |
| $$ | |
| Taking degree $0$ parts we find | |
| $$ | |
| \Omega^p_{A[s, s^{-1}]/R, 0} = | |
| \Omega^p_{A/R} \oplus \text{d}\log(s) \otimes_A \Omega^{p - 1}_{A/R} | |
| $$ | |
| and the proof of the lemma is complete. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-the-complex-for-L-star-gives-chern-class} | |
| The ``boundary'' map | |
| $\delta : \Omega^\bullet_{X/S} \to \Omega^\bullet_{X/S}[2]$ | |
| in $D(X, f^{-1}\mathcal{O}_S)$ coming from | |
| the short exact sequence in Lemma \ref{lemma-the-complex-for-L-star} | |
| is the map of Remark \ref{remark-cup-product-as-a-map} | |
| for $\xi = c_1^{dR}(\mathcal{L})$. | |
| \end{lemma} | |
| \begin{proof} | |
| To be precise we consider the shift | |
| $$ | |
| 0 \to \Omega^\bullet_{X/S}[1] \to | |
| \Omega^\bullet_{L^\star/S, 0}[1] \to | |
| \Omega^\bullet_{X/S} \to 0 | |
| $$ | |
| of the short exact sequence of Lemma \ref{lemma-the-complex-for-L-star}. | |
| As the degree zero part of a grading on | |
| $(L^\star \to X)_*\Omega^\bullet_{L^\star/S}$ | |
| we see that $\Omega^\bullet_{L^\star/S, 0}$ is a differential | |
| graded $\mathcal{O}_X$-algebra and that the map | |
| $\Omega^\bullet_{X/S} \to \Omega^\bullet_{L^\star/S, 0}$ | |
| is a homomorphism of differential graded $\mathcal{O}_X$-algebras. | |
| Hence we may view $\Omega^\bullet_{X/S}[1] \to | |
| \Omega^\bullet_{L^\star/S, 0}[1]$ as a map of right differential graded | |
| $\Omega^\bullet_{X/S}$-modules on $X$. The map | |
| $\text{Res} : \Omega^\bullet_{L^\star/S, 0}[1] \to \Omega^\bullet_{X/S}$ | |
| is a map of right differential graded $\Omega^\bullet_{X/S}$-modules | |
| since it is locally defined by the rule | |
| $\text{Res}(\omega' + \text{d}\log(s) \wedge \omega) = \omega$, see | |
| proof of Lemma \ref{lemma-the-complex-for-L-star}. | |
| Thus by the discussion in | |
| Differential Graded Sheaves, Section \ref{sdga-section-misc} | |
| we see that $\delta$ comes from a map | |
| $\delta' : \Omega^\bullet_{X/S} \to \Omega^\bullet_{X/S}[2]$ | |
| in the derived category $D(\Omega^\bullet_{X/S}, \text{d})$ | |
| of right differential graded modules over the de Rham complex. | |
| The uniqueness averted in Remark \ref{remark-cup-product-as-a-map} | |
| shows it suffices to prove that $\delta(1) = c_1^{dR}(\mathcal{L})$. | |
| \medskip\noindent | |
| We claim that there is a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| 0 \ar[r] & | |
| \mathcal{O}_X^* \ar[r] \ar[d]_{\text{d}\log} & | |
| E \ar[r] \ar[d] & | |
| \underline{\mathbf{Z}} \ar[d] \ar[r] & | |
| 0 \\ | |
| 0 \ar[r] & | |
| \Omega^\bullet_{X/S}[1] \ar[r] & | |
| \Omega^\bullet_{L^\star/S, 0}[1] \ar[r] & | |
| \Omega^\bullet_{X/S} \ar[r] & | |
| 0 | |
| } | |
| $$ | |
| where the top row is a short exact sequence of abelian sheaves whose | |
| boundary map sends $1$ to the class of $\mathcal{L}$ in | |
| $H^1(X, \mathcal{O}_X^*)$. It suffices to prove the claim | |
| by the compatibility of boundary maps with maps between short | |
| exact sequences. We define $E$ as the sheafification of the rule | |
| $$ | |
| U \longmapsto \{(s, n) \mid | |
| n \in \mathbf{Z},\ s \in \mathcal{L}^{\otimes n}(U)\text{ generator}\} | |
| $$ | |
| with group structure given by $(s, n) \cdot (t, m) = (s \otimes t, n + m)$. | |
| The middle vertical map sends $(s, n)$ to $\text{d}\log(s)$. This produces | |
| a map of short exact sequences | |
| because the map $Res : \Omega^1_{L^\star/S, 0} \to \mathcal{O}_X$ | |
| constructed in the proof of Lemma \ref{lemma-the-complex-for-L-star} sends | |
| $\text{d}\log(s)$ to $1$ if $s$ is a local generator of $\mathcal{L}$. | |
| To calculate the boundary of $1$ in the top row, choose local trivializations | |
| $s_i$ of $\mathcal{L}$ over opens $U_i$ as in | |
| Section \ref{section-first-chern-class}. On the overlaps | |
| $U_{i_0i_1} = U_{i_0} \cap U_{i_1}$ | |
| we have an invertible function $f_{i_0i_1}$ such that | |
| $f_{i_0i_1} = s_{i_1}|_{U_{i_0i_1}} s_{i_0}|_{U_{i_0i_1}}^{-1}$ | |
| and the cohomology class of $\mathcal{L}$ is given by the {\v C}ech cocycle | |
| $\{f_{i_0i_1}\}$. Then of course we have | |
| $$ | |
| (f_{i_0i_1}, 0) = (s_{i_1}, 1)|_{U_{i_0i_1}} \cdot | |
| (s_{i_0}, 1)|_{U_{i_0i_1}}^{-1} | |
| $$ | |
| as sections of $E$ which finishes the proof. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-push-omega-a} | |
| With notation as above we have | |
| \begin{enumerate} | |
| \item $\Omega^p_{L^\star/S, n} = | |
| \Omega^p_{L^\star/S, 0} \otimes_{\mathcal{O}_X} \mathcal{L}^{\otimes n}$ | |
| for all $n \in \mathbf{Z}$ as quasi-coherent $\mathcal{O}_X$-modules, | |
| \item $\Omega^\bullet_{X/S} = \Omega^\bullet_{L/X, 0}$ | |
| as complexes, and | |
| \item for $n > 0$ and $p \geq 0$ we have | |
| $\Omega^p_{L/X, n} = \Omega^p_{L^\star/S, n}$. | |
| \end{enumerate} | |
| \end{lemma} | |
| \begin{proof} | |
| In each case there is a globally defined canonical map which | |
| is an isomorphism by local calculations which we omit. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-line-bundle-characteristic-zero} | |
| In the situation above, assume there is a morphism $S \to \Spec(\mathbf{Q})$. | |
| Then $\Omega^\bullet_{X/S} \to \pi_*\Omega^\bullet_{L/S}$ is a | |
| quasi-isomorphism and $H_{dR}^*(X/S) = H_{dR}^*(L/S)$. | |
| \end{lemma} | |
| \begin{proof} | |
| Let $R$ be a $\mathbf{Q}$-algebra. Let $A$ be an $R$-algebra. | |
| The affine local statement is that the map | |
| $$ | |
| \Omega^\bullet_{A/R} \longrightarrow \Omega^\bullet_{A[t]/R} | |
| $$ | |
| is a quasi-isomorphism of complexes of $R$-modules. In fact it is a | |
| homotopy equivalence with homotopy inverse given by the map sending | |
| $g \omega + g' \text{d}t \wedge \omega'$ to $g(0)\omega$ for | |
| $g, g' \in A[t]$ and $\omega, \omega' \in \Omega^\bullet_{A/R}$. | |
| The homotopy sends $g \omega + g' \text{d}t \wedge \omega'$ | |
| to $(\int g') \omega'$ were $\int g' \in A[t]$ is the polynomial | |
| with vanishing constant term whose derivative with respect to $t$ | |
| is $g'$. Of course, here we use that $R$ contains $\mathbf{Q}$ | |
| as $\int t^n = (1/n)t^{n + 1}$. | |
| \end{proof} | |
| \begin{example} | |
| \label{example-affine-line} | |
| Lemma \ref{lemma-line-bundle-characteristic-zero} is | |
| false in positive characteristic. The de Rham complex of | |
| $\mathbf{A}^1_k = \Spec(k[x])$ over a field $k$ looks like a direct sum | |
| $$ | |
| k \oplus | |
| \bigoplus\nolimits_{n \geq 1} | |
| (k \cdot t^n \xrightarrow{n} | |
| k \cdot t^{n - 1} \text{d}t) | |
| $$ | |
| Hence if the characteristic of $k$ is $p > 0$, then | |
| we see that both $H^0_{dR}(\mathbf{A}^1_k/k)$ and | |
| $H^1_{dR}(\mathbf{A}^1_k/k)$ | |
| are infinite dimensional over $k$. | |
| \end{example} | |
| \section{de Rham cohomology of projective space} | |
| \label{section-projective-space} | |
| \noindent | |
| Let $A$ be a ring. Let $n \geq 1$. The structure morphism | |
| $\mathbf{P}^n_A \to \Spec(A)$ is a proper smooth of relative | |
| dimension $n$. It is smooth of relative dimension $n$ and of finite type | |
| as $\mathbf{P}^n_A$ has a finite affine open covering by schemes each | |
| isomorphic to $\mathbf{A}^n_A$, see Constructions, Lemma | |
| \ref{constructions-lemma-standard-covering-projective-space}. | |
| It is proper because it is also separated and universally closed | |
| by Constructions, Lemma \ref{constructions-lemma-projective-space-separated}. | |
| Let us denote $\mathcal{O}$ and $\mathcal{O}(d)$ the structure sheaf | |
| $\mathcal{O}_{\mathbf{P}^n_A}$ and the Serre twists | |
| $\mathcal{O}_{\mathbf{P}^n_A}(d)$. | |
| Let us denote $\Omega = \Omega_{\mathbf{P}^n_A/A}$ the sheaf | |
| of relative differentials and $\Omega^p$ its exterior powers. | |
| \begin{lemma} | |
| \label{lemma-euler-sequence} | |
| There exists a short exact sequence | |
| $$ | |
| 0 \to \Omega \to \mathcal{O}(-1)^{\oplus n + 1} \to \mathcal{O} \to 0 | |
| $$ | |
| \end{lemma} | |
| \begin{proof} | |
| To explain this, we recall that | |
| $\mathbf{P}^n_A = \text{Proj}(A[T_0, \ldots, T_n])$, | |
| and we write symbolically | |
| $$ | |
| \mathcal{O}(-1)^{\oplus n + 1} = | |
| \bigoplus\nolimits_{j = 0, \ldots, n} \mathcal{O}(-1) \text{d}T_j | |
| $$ | |
| The first arrow | |
| $$ | |
| \Omega \to | |
| \bigoplus\nolimits_{j = 0, \ldots, n} \mathcal{O}(-1) \text{d}T_j | |
| $$ | |
| in the short exact sequence above | |
| is given on each of the standard opens | |
| $D_+(T_i) = \Spec(A[T_0/T_i, \ldots, T_n/T_i])$ | |
| mentioned above by the rule | |
| $$ | |
| \sum\nolimits_{j \not = i} g_j \text{d}(T_j/T_i) | |
| \longmapsto | |
| \sum\nolimits_{j \not = i} g_j/T_i \text{d}T_j | |
| - (\sum\nolimits_{j \not = i} g_jT_j/T_i^2) \text{d}T_i | |
| $$ | |
| This makes sense because $1/T_i$ is a section of $\mathcal{O}(-1)$ | |
| over $D_+(T_i)$. The map | |
| $$ | |
| \bigoplus\nolimits_{j = 0, \ldots, n} \mathcal{O}(-1) \text{d}T_j | |
| \to | |
| \mathcal{O} | |
| $$ | |
| is given by sending $\text{d}T_j$ to $T_j$, more precisely, on | |
| $D_+(T_i)$ we send the section $\sum g_j \text{d}T_j$ to | |
| $\sum T_jg_j$. We omit the verification that this produces | |
| a short exact sequence. | |
| \end{proof} | |
| \noindent | |
| Given an integer $k \in \mathbf{Z}$ and a quasi-coherent | |
| $\mathcal{O}_{\mathbf{P}^n_A}$-module $\mathcal{F}$ | |
| denote as usual $\mathcal{F}(k)$ the $k$th Serre twist of $\mathcal{F}$. | |
| See Constructions, Definition \ref{constructions-definition-twist}. | |
| \begin{lemma} | |
| \label{lemma-twisted-hodge-cohomology-projective-space} | |
| In the situation above we have the following cohomology groups | |
| \begin{enumerate} | |
| \item $H^q(\mathbf{P}^n_A, \Omega^p) = 0$ | |
| unless $0 \leq p = q \leq n$, | |
| \item for $0 \leq p \leq n$ the $A$-module | |
| $H^p(\mathbf{P}^n_A, \Omega^p)$ free of rank $1$. | |
| \item for $q > 0$, $k > 0$, and $p$ arbitrary we have | |
| $H^q(\mathbf{P}^n_A, \Omega^p(k)) = 0$, and | |
| \item add more here. | |
| \end{enumerate} | |
| \end{lemma} | |
| \begin{proof} | |
| We are going to use the results of Cohomology of Schemes, Lemma | |
| \ref{coherent-lemma-cohomology-projective-space-over-ring} | |
| without further mention. In particular, the statements are true | |
| for $H^q(\mathbf{P}^n_A, \mathcal{O}(k))$. | |
| \medskip\noindent | |
| Proof for $p = 1$. Consider the short exact sequence | |
| $$ | |
| 0 \to \Omega \to \mathcal{O}(-1)^{\oplus n + 1} \to \mathcal{O} \to 0 | |
| $$ | |
| of Lemma \ref{lemma-euler-sequence}. Since $\mathcal{O}(-1)$ has | |
| vanishing cohomology in all degrees, this gives that | |
| $H^q(\mathbf{P}^n_A, \Omega)$ is zero except in degree $1$ | |
| where it is freely generated by the boundary of $1$ in | |
| $H^0(\mathbf{P}^n_A, \mathcal{O})$. | |
| \medskip\noindent | |
| Assume $p > 1$. Let us think of the short exact sequence | |
| above as defining a $2$ step filtration on $\mathcal{O}(-1)^{\oplus n + 1}$. | |
| The induced filtration on $\wedge^p\mathcal{O}(-1)^{\oplus n + 1}$ looks | |
| like this | |
| $$ | |
| 0 \to \Omega^p \to \wedge^p\left(\mathcal{O}(-1)^{\oplus n + 1}\right) | |
| \to \Omega^{p - 1} \to 0 | |
| $$ | |
| Observe that $\wedge^p\mathcal{O}(-1)^{\oplus n + 1}$ is isomorphic | |
| to a direct sum of $n + 1$ choose $p$ copies of $\mathcal{O}(-p)$ | |
| and hence has vanishing cohomology in all degrees. | |
| By induction hypothesis, this shows that $H^q(\mathbf{P}^n_A, \Omega^p)$ | |
| is zero unless $q = p$ and $H^p(\mathbf{P}^n_A, \Omega^p)$ is free | |
| of rank $1$ with generator the boundary of the generator in | |
| $H^{p - 1}(\mathbf{P}^n_A, \Omega^{p - 1})$. | |
| \medskip\noindent | |
| Let $k > 0$. Observe that $\Omega^n = \mathcal{O}(-n - 1)$ for example | |
| by the short exact sequence above for $p = n + 1$. | |
| Hence $\Omega^n(k)$ has vanishing cohomology in positive degrees. | |
| Using the short exact sequences | |
| $$ | |
| 0 \to \Omega^p(k) \to \wedge^p\left(\mathcal{O}(-1)^{\oplus n + 1}\right)(k) | |
| \to \Omega^{p - 1}(k) \to 0 | |
| $$ | |
| and {\it descending} induction on $p$ we get the vanishing of | |
| cohomology of $\Omega^p(k)$ in positive degrees for all $p$. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-hodge-cohomology-projective-space} | |
| We have $H^q(\mathbf{P}^n_A, \Omega^p) = 0$ | |
| unless $0 \leq p = q \leq n$. For $0 \leq p \leq n$ the $A$-module | |
| $H^p(\mathbf{P}^n_A, \Omega^p)$ free of rank $1$ with basis element | |
| $c_1^{Hodge}(\mathcal{O}(1))^p$. | |
| \end{lemma} | |
| \begin{proof} | |
| We have the vanishing and and freeness by | |
| Lemma \ref{lemma-twisted-hodge-cohomology-projective-space}. | |
| For $p = 0$ it is certainly true that | |
| $1 \in H^0(\mathbf{P}^n_A, \mathcal{O})$ is a generator. | |
| \medskip\noindent | |
| Proof for $p = 1$. Consider the short exact sequence | |
| $$ | |
| 0 \to \Omega \to \mathcal{O}(-1)^{\oplus n + 1} \to \mathcal{O} \to 0 | |
| $$ | |
| of Lemma \ref{lemma-euler-sequence}. In the proof of | |
| Lemma \ref{lemma-twisted-hodge-cohomology-projective-space} | |
| we have seen that the generator of $H^1(\mathbf{P}^n_A, \Omega)$ | |
| is the boundary $\xi$ of $1 \in H^0(\mathbf{P}^n_A, \mathcal{O})$. | |
| As in the proof of Lemma \ref{lemma-euler-sequence} we will identify | |
| $\mathcal{O}(-1)^{\oplus n + 1}$ with | |
| $\bigoplus_{j = 0, \ldots, n} \mathcal{O}(-1)\text{d}T_j$. | |
| Consider the open covering | |
| $$ | |
| \mathcal{U} : | |
| \mathbf{P}^n_A = | |
| \bigcup\nolimits_{i = 0, \ldots, n} D_{+}(T_i) | |
| $$ | |
| We can lift the restriction of the global section $1$ of $\mathcal{O}$ | |
| to $U_i = D_+(T_i)$ by the section $T_i^{-1} \text{d}T_i$ of | |
| $\bigoplus \mathcal{O}(-1)\text{d}T_j$ over $U_i$. Thus the cocyle | |
| representing $\xi$ is given by | |
| $$ | |
| T_{i_1}^{-1} \text{d}T_{i_1} - T_{i_0}^{-1} \text{d}T_{i_0} = | |
| \text{d}\log(T_{i_1}/T_{i_0}) \in \Omega(U_{i_0i_1}) | |
| $$ | |
| On the other hand, for each $i$ the section $T_i$ is a trivializing | |
| section of $\mathcal{O}(1)$ over $U_i$. Hence we see that | |
| $f_{i_0i_1} = T_{i_1}/T_{i_0} \in \mathcal{O}^*(U_{i_0i_1})$ | |
| is the cocycle representing $\mathcal{O}(1)$ in $\Pic(\mathbf{P}^n_A)$, | |
| see Section \ref{section-first-chern-class}. | |
| Hence $c_1^{Hodge}(\mathcal{O}(1))$ | |
| is given by the cocycle $\text{d}\log(T_{i_1}/T_{i_0})$ | |
| which agrees with what we got for $\xi$ above. | |
| \medskip\noindent | |
| Proof for general $p$ by induction. The base cases $p = 0, 1$ were handled | |
| above. Assume $p > 1$. In the proof of | |
| Lemma \ref{lemma-twisted-hodge-cohomology-projective-space} | |
| we have seen that the generator of $H^p(\mathbf{P}^n_A, \Omega^p)$ | |
| is the boundary of $c_1^{Hodge}(\mathcal{O}(1))^{p - 1}$ | |
| in the long exact cohomology sequence associated to | |
| $$ | |
| 0 \to \Omega^p \to \wedge^p\left(\mathcal{O}(-1)^{\oplus n + 1}\right) | |
| \to \Omega^{p - 1} \to 0 | |
| $$ | |
| By the calculation in Section \ref{section-first-chern-class} | |
| the cohomology class $c_1^{Hodge}(\mathcal{O}(1))^{p - 1}$ | |
| is, up to a sign, represented by the cocycle with terms | |
| $$ | |
| \beta_{i_0 \ldots i_{p - 1}} = | |
| \text{d}\log(T_{i_1}/T_{i_0}) \wedge | |
| \text{d}\log(T_{i_2}/T_{i_1}) \wedge \ldots \wedge | |
| \text{d}\log(T_{i_{p - 1}}/T_{i_{p - 2}}) | |
| $$ | |
| in $\Omega^{p - 1}(U_{i_0 \ldots i_{p - 1}})$. These | |
| $\beta_{i_0 \ldots i_{p - 1}}$ can be lifted to the sections | |
| $\tilde \beta_{i_0 \ldots i_{p -1}} = | |
| T_{i_0}^{-1}\text{d}T_{i_0} \wedge \beta_{i_0 \ldots i_{p - 1}}$ | |
| of $\wedge^p(\bigoplus \mathcal{O}(-1) \text{d}T_j)$ over | |
| $U_{i_0 \ldots i_{p - 1}}$. We conclude that the generator of | |
| $H^p(\mathbf{P}^n_A, \Omega^p)$ is given by the cocycle whose | |
| components are | |
| \begin{align*} | |
| \sum\nolimits_{a = 0}^p (-1)^a | |
| \tilde \beta_{i_0 \ldots \hat{i_a} \ldots i_p} | |
| & = | |
| T_{i_1}^{-1}\text{d}T_{i_1} \wedge \beta_{i_1 \ldots i_p} | |
| + \sum\nolimits_{a = 1}^p (-1)^a | |
| T_{i_0}^{-1}\text{d}T_{i_0} \wedge | |
| \beta_{i_0 \ldots \hat{i_a} \ldots i_p} \\ | |
| & = | |
| (T_{i_1}^{-1}\text{d}T_{i_1} - T_{i_0}^{-1}\text{d}T_{i_0}) \wedge | |
| \beta_{i_1 \ldots i_p} + | |
| T_{i_0}^{-1}\text{d}T_{i_0} \wedge \text{d}(\beta)_{i_0 \ldots i_p} \\ | |
| & = | |
| \text{d}\log(T_{i_1}/T_{i_0}) \wedge \beta_{i_1 \ldots i_p} | |
| \end{align*} | |
| viewed as a section of $\Omega^p$ over $U_{i_0 \ldots i_p}$. | |
| This is up to sign the same as the cocycle representing | |
| $c_1^{Hodge}(\mathcal{O}(1))^p$ and the proof is complete. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-de-rham-cohomology-projective-space} | |
| For $0 \leq i \leq n$ the de Rham cohomology | |
| $H^{2i}_{dR}(\mathbf{P}^n_A/A)$ is a free $A$-module of rank $1$ | |
| with basis element $c_1^{dR}(\mathcal{O}(1))^i$. | |
| In all other degrees the de Rham cohomology of $\mathbf{P}^n_A$ | |
| over $A$ is zero. | |
| \end{lemma} | |
| \begin{proof} | |
| Consider the Hodge-to-de Rham spectral sequence of | |
| Section \ref{section-hodge-to-de-rham}. | |
| By the computation of the Hodge cohomology of $\mathbf{P}^n_A$ over $A$ | |
| done in Lemma \ref{lemma-hodge-cohomology-projective-space} | |
| we see that the spectral sequence degenerates on the $E_1$ page. | |
| In this way we see that $H^{2i}_{dR}(\mathbf{P}^n_A/A)$ is a free | |
| $A$-module of rank $1$ for $0 \leq i \leq n$ and zero else. | |
| Observe that $c_1^{dR}(\mathcal{O}(1))^i \in H^{2i}_{dR}(\mathbf{P}^n_A/A)$ | |
| for $i = 0, \ldots, n$ and that for $i = n$ this element is the | |
| image of $c_1^{Hodge}(\mathcal{L})^n$ by the map of complexes | |
| $$ | |
| \Omega^n_{\mathbf{P}^n_A/A}[-n] | |
| \longrightarrow | |
| \Omega^\bullet_{\mathbf{P}^n_A/A} | |
| $$ | |
| This follows for example from the discussion in Remark \ref{remark-truncations} | |
| or from the explicit description of cocycles representing these classes in | |
| Section \ref{section-first-chern-class}. | |
| The spectral sequence shows that the induced map | |
| $$ | |
| H^n(\mathbf{P}^n_A, \Omega^n_{\mathbf{P}^n_A/A}) \longrightarrow | |
| H^{2n}_{dR}(\mathbf{P}^n_A/A) | |
| $$ | |
| is an isomorphism and since $c_1^{Hodge}(\mathcal{L})^n$ is a generator of | |
| of the source (Lemma \ref{lemma-hodge-cohomology-projective-space}), | |
| we conclude that $c_1^{dR}(\mathcal{L})^n$ is a generator | |
| of the target. By the $A$-bilinearity of the cup products, | |
| it follows that also $c_1^{dR}(\mathcal{L})^i$ | |
| is a generator of $H^{2i}_{dR}(\mathbf{P}^n_A/A)$ for | |
| $0 \leq i \leq n$. | |
| \end{proof} | |
| \section{The spectral sequence for a smooth morphism} | |
| \label{section-relative-spectral-sequence} | |
| \noindent | |
| Consider a commutative diagram of schemes | |
| $$ | |
| \xymatrix{ | |
| X \ar[rr]_f \ar[rd]_p & & Y \ar[ld]^q \\ | |
| & S | |
| } | |
| $$ | |
| where $f$ is a smooth morphism. Then we obtain a locally split short | |
| exact sequence | |
| $$ | |
| 0 \to f^*\Omega_{Y/S} \to \Omega_{X/S} \to \Omega_{X/Y} \to 0 | |
| $$ | |
| by Morphisms, Lemma \ref{morphisms-lemma-triangle-differentials-smooth}. | |
| Let us think of this as a descending filtration $F$ on $\Omega_{X/S}$ | |
| with $F^0\Omega_{X/S} = \Omega_{X/S}$, $F^1\Omega_{X/S} = f^*\Omega_{Y/S}$, and | |
| $F^2\Omega_{X/S} = 0$. Applying the functor $\wedge^p$ we obtain | |
| for every $p$ an induced filtration | |
| $$ | |
| \Omega^p_{X/S} = F^0\Omega^p_{X/S} \supset | |
| F^1\Omega^p_{X/S} \supset | |
| F^2\Omega^p_{X/S} \supset \ldots \supset F^{p + 1}\Omega^p_{X/S} = 0 | |
| $$ | |
| whose succesive quotients are | |
| $$ | |
| \text{gr}^k\Omega^p_{X/S} = | |
| F^k\Omega^p_{X/S}/F^{k + 1}\Omega^p_{X/S} = | |
| f^*\Omega^k_{Y/S} \otimes_{\mathcal{O}_X} \Omega^{p - k}_{X/Y} = | |
| f^{-1}\Omega^k_{Y/S} \otimes_{f^{-1}\mathcal{O}_Y} \Omega^{p - k}_{X/Y} | |
| $$ | |
| for $k = 0, \ldots, p$. In fact, the reader can check using the | |
| Leibniz rule that $F^k\Omega^\bullet_{X/S}$ is a subcomplex of | |
| $\Omega^\bullet_{X/S}$. In this way $\Omega^\bullet_{X/S}$ has | |
| the structure of a filtered complex. We can also see this by observing | |
| that | |
| $$ | |
| F^k\Omega^\bullet_{X/S} = | |
| \Im\left(\wedge : | |
| \text{Tot}( | |
| f^{-1}\sigma_{\geq k}\Omega^\bullet_{Y/S} \otimes_{p^{-1}\mathcal{O}_S} | |
| \Omega^\bullet_{X/S}) | |
| \longrightarrow | |
| \Omega^\bullet_{X/S}\right) | |
| $$ | |
| is the image of a map of complexes on $X$. The filtered complex | |
| $$ | |
| \Omega^\bullet_{X/S} = F^0\Omega^\bullet_{X/S} \supset | |
| F^1\Omega^\bullet_{X/S} \supset F^2\Omega^\bullet_{X/S} \supset \ldots | |
| $$ | |
| has the following associated graded parts | |
| $$ | |
| \text{gr}^k\Omega^\bullet_{X/S} = | |
| f^{-1}\Omega^k_{Y/S}[-k] \otimes_{f^{-1}\mathcal{O}_Y} \Omega^\bullet_{X/Y} | |
| $$ | |
| by what was said above. | |
| \begin{lemma} | |
| \label{lemma-spectral-sequence-smooth} | |
| Let $f : X \to Y$ be a quasi-compact, quasi-separated, and smooth | |
| morphism of schemes over a base scheme $S$. There is a bounded spectral | |
| sequence with first page | |
| $$ | |
| E_1^{p, q} = | |
| H^q(\Omega^p_{Y/S} \otimes_{\mathcal{O}_Y}^\mathbf{L} Rf_*\Omega^\bullet_{X/Y}) | |
| $$ | |
| converging to $R^{p + q}f_*\Omega^\bullet_{X/S}$. | |
| \end{lemma} | |
| \begin{proof} | |
| Consider $\Omega^\bullet_{X/S}$ as a filtered complex with the | |
| filtration introduced above. The spectral sequence is the | |
| spectral sequence of Cohomology, Lemma | |
| \ref{cohomology-lemma-relative-spectral-sequence-filtered-object}. | |
| By Derived Categories of Schemes, Lemma | |
| \ref{perfect-lemma-cohomology-de-rham-base-change} we have | |
| $$ | |
| Rf_*\text{gr}^k\Omega^\bullet_{X/S} = | |
| \Omega^k_{Y/S}[-k] \otimes_{\mathcal{O}_Y}^\mathbf{L} Rf_*\Omega^\bullet_{X/Y} | |
| $$ | |
| and thus we conclude. | |
| \end{proof} | |
| \begin{remark} | |
| \label{remark-gauss-manin} | |
| In Lemma \ref{lemma-spectral-sequence-smooth} consider the cohomology sheaves | |
| $$ | |
| \mathcal{H}^q_{dR}(X/Y) = H^q(Rf_*\Omega^\bullet_{X/Y})) | |
| $$ | |
| If $f$ is proper in addition to being smooth and $S$ is a scheme over | |
| $\mathbf{Q}$ then $\mathcal{H}^q_{dR}(X/Y)$ is finite locally free (insert | |
| future reference here). If we only assume $\mathcal{H}^q_{dR}(X/Y)$ | |
| are flat $\mathcal{O}_Y$-modules, then we obtain (tiny argument omitted) | |
| $$ | |
| E_1^{p, q} = | |
| \Omega^p_{Y/S} \otimes_{\mathcal{O}_Y} \mathcal{H}^q_{dR}(X/Y) | |
| $$ | |
| and the differentials in the spectral sequence are maps | |
| $$ | |
| d_1^{p, q} : | |
| \Omega^p_{Y/S} \otimes_{\mathcal{O}_Y} \mathcal{H}^q_{dR}(X/Y) | |
| \longrightarrow | |
| \Omega^{p + 1}_{Y/S} \otimes_{\mathcal{O}_Y} \mathcal{H}^q_{dR}(X/Y) | |
| $$ | |
| In particular, for $p = 0$ we obtain a map | |
| $d_1^{0, q} : \mathcal{H}^q_{dR}(X/Y) \to | |
| \Omega^1_{Y/S} \otimes_{\mathcal{O}_Y} \mathcal{H}^q_{dR}(X/Y)$ | |
| which turns out to be an integrable connection | |
| $\nabla$ (insert future reference here) | |
| and the complex | |
| $$ | |
| \mathcal{H}^q_{dR}(X/Y) \to | |
| \Omega^1_{Y/S} \otimes_{\mathcal{O}_Y} \mathcal{H}^q_{dR}(X/Y) \to | |
| \Omega^2_{Y/S} \otimes_{\mathcal{O}_Y} \mathcal{H}^q_{dR}(X/Y) \to \ldots | |
| $$ | |
| with differentials given by $d_1^{\bullet, q}$ | |
| is the de Rham complex of $\nabla$. | |
| The connection $\nabla$ is known as the {\it Gauss-Manin connection}. | |
| \end{remark} | |
| \section{Leray-Hirsch type theorems} | |
| \label{section-leray-hirsch} | |
| \noindent | |
| In this section we prove that for a smooth proper morphism one | |
| can sometimes express the de Rham cohomology upstairs in terms | |
| of the de Rham cohomology downstairs. | |
| \begin{lemma} | |
| \label{lemma-relative-global-generation-on-fibres} | |
| Let $f : X \to Y$ be a smooth proper morphism of schemes. | |
| Let $N$ and $n_1, \ldots, n_N \geq 0$ be integers and let | |
| $\xi_i \in H^{n_i}_{dR}(X/Y)$, $1 \leq i \leq N$. | |
| Assume for all points $y \in Y$ the images of $\xi_1, \ldots, \xi_N$ | |
| in $H^*_{dR}(X_y/y)$ form a basis over $\kappa(y)$. Then the map | |
| $$ | |
| \bigoplus\nolimits_{i = 1}^N \mathcal{O}_Y[-n_i] | |
| \longrightarrow | |
| Rf_*\Omega^\bullet_{X/Y} | |
| $$ | |
| associated to $\xi_1, \ldots, \xi_N$ is an isomorphism. | |
| \end{lemma} | |
| \begin{proof} | |
| By Lemma \ref{lemma-proper-smooth-de-Rham} | |
| $Rf_*\Omega^\bullet_{X/Y}$ is a perfect object of $D(\mathcal{O}_Y)$ | |
| whose formation commutes with arbitrary base change. | |
| Thus the map of the lemma is a map $a : K \to L$ | |
| between perfect objects of $D(\mathcal{O}_Y)$ | |
| whose derived restriction to any point is an isomorphism | |
| by our assumption on fibres. Then the cone $C$ on $a$ is a perfect | |
| object of $D(\mathcal{O}_Y)$ (Cohomology, Lemma | |
| \ref{cohomology-lemma-two-out-of-three-perfect}) whose | |
| derived restriction to any point is zero. It follows that $C$ | |
| is zero by More on Algebra, Lemma | |
| \ref{more-algebra-lemma-lift-perfect-from-residue-field} | |
| and $a$ is an isomorphism. (This also uses Derived Categories of Schemes, | |
| Lemmas \ref{perfect-lemma-affine-compare-bounded} and | |
| \ref{perfect-lemma-perfect-affine} to translate into algebra.) | |
| \end{proof} | |
| \noindent | |
| We first prove the main result of this section in the | |
| following special case. | |
| \begin{lemma} | |
| \label{lemma-global-generation-on-fibres} | |
| Let $f : X \to Y$ be a smooth proper morphism of schemes over a base $S$. | |
| Assume | |
| \begin{enumerate} | |
| \item $Y$ and $S$ are affine, and | |
| \item there exist integers $N$ and $n_1, \ldots, n_N \geq 0$ and | |
| $\xi_i \in H^{n_i}_{dR}(X/S)$, $1 \leq i \leq N$ such that | |
| for all points $y \in Y$ the images of $\xi_1, \ldots, \xi_N$ | |
| in $H^*_{dR}(X_y/y)$ form a basis over $\kappa(y)$. | |
| \end{enumerate} | |
| Then the map | |
| $$ | |
| \bigoplus\nolimits_{i = 1}^N H^*_{dR}(Y/S) \longrightarrow | |
| H^*_{dR}(X/S), \quad | |
| (a_1, \ldots, a_N) \longmapsto \sum \xi_i \cup f^*a_i | |
| $$ | |
| is an isomorphism. | |
| \end{lemma} | |
| \begin{proof} | |
| Say $Y = \Spec(A)$ and $S = \Spec(R)$. | |
| In this case $\Omega^\bullet_{A/R}$ computes | |
| $R\Gamma(Y, \Omega^\bullet_{Y/S})$ by Lemma \ref{lemma-de-rham-affine}. | |
| Choose a finite affine open covering $\mathcal{U} : X = \bigcup_{i \in I} U_i$. | |
| Consider the complex | |
| $$ | |
| K^\bullet = | |
| \text{Tot}(\check{\mathcal{C}}^\bullet(\mathcal{U}, \Omega_{X/S}^\bullet)) | |
| $$ | |
| as in | |
| Cohomology, Section \ref{cohomology-section-cech-cohomology-of-complexes}. | |
| Let us collect some facts about this complex most of which | |
| can be found in the reference just given: | |
| \begin{enumerate} | |
| \item $K^\bullet$ is a complex of $R$-modules whose terms are | |
| $A$-modules, | |
| \item $K^\bullet$ represents $R\Gamma(X, \Omega^\bullet_{X/S})$ in $D(R)$ | |
| (Cohomology of Schemes, Lemma | |
| \ref{coherent-lemma-quasi-coherent-affine-cohomology-zero} and | |
| Cohomology, Lemma \ref{cohomology-lemma-cech-complex-complex-computes}), | |
| \item there is a natural map $\Omega^\bullet_{A/R} \to K^\bullet$ | |
| of complexes of $R$-modules which is $A$-linear on terms and | |
| induces the pullback map $H^*_{dR}(Y/S) \to H^*_{dR}(X/S)$ | |
| on cohomology, | |
| \item $K^\bullet$ has a multiplication denoted $\wedge$ | |
| which turns it into a differential graded $R$-algebra, | |
| \item the multiplication on $K^\bullet$ | |
| induces the cup product on $H^*_{dR}(X/S)$ | |
| (Cohomology, Section \ref{cohomology-section-cup-product}), | |
| \item the filtration $F$ on $\Omega^*_{X/S}$ induces a filtration | |
| $$ | |
| K^\bullet = | |
| F^0K^\bullet \supset F^1K^\bullet \supset F^2K^\bullet \supset \ldots | |
| $$ | |
| by subcomplexes on $K^\bullet$ such that | |
| \begin{enumerate} | |
| \item $F^kK^n \subset K^n$ is an $A$-submmodule, | |
| \item $F^kK^\bullet \wedge F^lK^\bullet \subset F^{k + l}K^\bullet$, | |
| \item $\text{gr}^kK^\bullet$ is a complex of $A$-modules, | |
| \item $\text{gr}^0K^\bullet = | |
| \text{Tot}(\check{\mathcal{C}}^\bullet(\mathcal{U}, \Omega_{X/Y}^\bullet))$ | |
| and represents $R\Gamma(X, \Omega^\bullet_{X/Y})$ in $D(A)$, | |
| \item multiplication induces an isomorphism | |
| $\Omega^k_{A/R}[-k] \otimes_A \text{gr}^0K^\bullet \to \text{gr}^kK^\bullet$ | |
| \end{enumerate} | |
| \end{enumerate} | |
| We omit the detailed proofs of these statements; please see discussion | |
| leading up to the construction of the spectral sequence in | |
| Lemma \ref{lemma-spectral-sequence-smooth}. | |
| \medskip\noindent | |
| For every $i = 1, \ldots, N$ we choose a cocycle $x_i \in K^{n_i}$ | |
| representing $\xi_i$. Next, we look at the map of complexes | |
| $$ | |
| \tilde x : | |
| M^\bullet = \bigoplus\nolimits_{i = 1, \ldots, N} | |
| \Omega^\bullet_{A/R}[-n_i] | |
| \longrightarrow | |
| K^\bullet | |
| $$ | |
| which sends $\omega$ in the $i$th summand to $x_i \wedge \omega$. | |
| All that remains is to show that this map is a quasi-isomorphism. | |
| We endow $M^\bullet$ with the structure of a filtered complex | |
| by the rule | |
| $$ | |
| F^kM^\bullet = | |
| \bigoplus\nolimits_{i = 1, \ldots, N} | |
| (\sigma_{\geq k}\Omega^\bullet_{A/R})[-n_i] | |
| $$ | |
| With this choice the map $\tilde x$ is a morphism of filtered complexes. | |
| Observe that $\text{gr}^0M^\bullet = \bigoplus A[-n_i]$ | |
| and multiplication induces an isomorphism | |
| $\Omega^k_{A/R}[-k] \otimes_A \text{gr}^0M^\bullet \to \text{gr}^kM^\bullet$. | |
| By construction and Lemma \ref{lemma-relative-global-generation-on-fibres} | |
| we see that | |
| $$ | |
| \text{gr}^0\tilde x : | |
| \text{gr}^0M^\bullet \longrightarrow | |
| \text{gr}^0K^\bullet | |
| $$ | |
| is an isomorphism in $D(A)$. It follows that for all $k \geq 0$ | |
| we obtain isomorphisms | |
| $$ | |
| \text{gr}^k \tilde x : | |
| \text{gr}^kM^\bullet = \Omega^k_{A/R}[-k] \otimes_A \text{gr}^0M^\bullet | |
| \longrightarrow | |
| \Omega^k_{A/R}[-k] \otimes_A \text{gr}^0K^\bullet = | |
| \text{gr}^kK^\bullet | |
| $$ | |
| in $D(A)$. Namely, the complex | |
| $\text{gr}^0K^\bullet = | |
| \text{Tot}(\check{\mathcal{C}}^\bullet(\mathcal{U}, \Omega_{X/Y}^\bullet))$ | |
| is K-flat as a complex of $A$-modules by Derived Categories of Schemes, | |
| Lemma \ref{perfect-lemma-K-flat}. | |
| Hence the tensor product on the right hand side is the | |
| derived tensor product as is true by inspection on the left hand side. | |
| Finally, taking the derived tensor product | |
| $\Omega^k_{A/R}[-k] \otimes_A^\mathbf{L} -$ is a functor on $D(A)$ | |
| and therefore sends isomorphisms to isomorphisms. | |
| Arguing by induction on $k$ we deduce that | |
| $$ | |
| \tilde x : M^\bullet/F^kM^\bullet \to K^\bullet/F^kK^\bullet | |
| $$ | |
| is an isomorphism in $D(R)$ since we have the short exact sequences | |
| $$ | |
| 0 \to F^kM^\bullet/F^{k + 1}M^\bullet \to | |
| M^\bullet/F^{k + 1}M^\bullet \to | |
| \text{gr}^kM^\bullet \to 0 | |
| $$ | |
| and similarly for $K^\bullet$. This proves that $\tilde x$ is a | |
| quasi-isomorphism as the filtrations are finite in any given degree. | |
| \end{proof} | |
| \begin{proposition} | |
| \label{proposition-global-generation-on-fibres} | |
| Let $f : X \to Y$ be a smooth proper morphism of schemes over a base $S$. | |
| Let $N$ and $n_1, \ldots, n_N \geq 0$ be integers and let | |
| $\xi_i \in H^{n_i}_{dR}(X/S)$, $1 \leq i \leq N$. | |
| Assume for all points $y \in Y$ the images of $\xi_1, \ldots, \xi_N$ | |
| in $H^*_{dR}(X_y/y)$ form a basis over $\kappa(y)$. The map | |
| $$ | |
| \tilde \xi = \bigoplus \tilde \xi_i[-n_i] : | |
| \bigoplus \Omega^\bullet_{Y/S}[-n_i] | |
| \longrightarrow | |
| Rf_*\Omega^\bullet_{X/S} | |
| $$ | |
| (see proof) is an isomorphism in $D(Y, (Y \to S)^{-1}\mathcal{O}_S)$ and | |
| correspondingly the map | |
| $$ | |
| \bigoplus\nolimits_{i = 1}^N H^*_{dR}(Y/S) \longrightarrow | |
| H^*_{dR}(X/S), \quad | |
| (a_1, \ldots, a_N) \longmapsto \sum \xi_i \cup f^*a_i | |
| $$ | |
| is an isomorphism. | |
| \end{proposition} | |
| \begin{proof} | |
| Denote $p : X \to S$ and $q : Y \to S$ be the structure morphisms. | |
| Let $\xi'_i : \Omega^\bullet_{X/S} \to \Omega^\bullet_{X/S}[n_i]$ | |
| be the map of Remark \ref{remark-cup-product-as-a-map} corresponding | |
| to $\xi_i$. Denote | |
| $$ | |
| \tilde \xi_i : | |
| \Omega^\bullet_{Y/S} \to Rf_*\Omega^\bullet_{X/S}[n_i] | |
| $$ | |
| the composition of $\xi'_i$ with the canonical map | |
| $\Omega^\bullet_{Y/S} \to Rf_*\Omega^\bullet_{X/S}$. | |
| Using | |
| $$ | |
| R\Gamma(Y, Rf_*\Omega^\bullet_{X/S}) = R\Gamma(X, \Omega^\bullet_{X/S}) | |
| $$ | |
| on cohomology $\tilde \xi_i$ is the map $\eta \mapsto \xi_i \cup f^*\eta$ | |
| from $H^m_{dR}(Y/S)$ to $H^{m + n}_{dR}(X/S)$. | |
| Further, since the formation of $\xi'_i$ commutes with | |
| restrictions to opens, so does the formation of $\tilde \xi_i$ | |
| commute with restriction to opens. | |
| \medskip\noindent | |
| Thus we can consider the map | |
| $$ | |
| \tilde \xi = \bigoplus \tilde \xi_i[-n_i] : | |
| \bigoplus \Omega^\bullet_{Y/S}[-n_i] | |
| \longrightarrow | |
| Rf_*\Omega^\bullet_{X/S} | |
| $$ | |
| To prove the lemma it suffices to show that this is an isomorphism in | |
| $D(Y, q^{-1}\mathcal{O}_S)$. If we could show $\tilde \xi$ | |
| comes from a map of filtered complexes (with suitable filtrations), | |
| then we could appeal to the spectral sequence of | |
| Lemma \ref{lemma-spectral-sequence-smooth} to finish the proof. | |
| This takes more work than is necessary and instead our approach | |
| will be to reduce to the affine case (whose proof does in some sense | |
| use the spectral sequence). | |
| \medskip\noindent | |
| Indeed, if $Y' \subset Y$ is is any open with inverse image | |
| $X' \subset X$, then $\tilde \xi|_{X'}$ induces the map | |
| $$ | |
| \bigoplus\nolimits_{i = 1}^N H^*_{dR}(Y'/S) \longrightarrow | |
| H^*_{dR}(X'/S), \quad | |
| (a_1, \ldots, a_N) \longmapsto \sum \xi_i|_{X'} \cup f^*a_i | |
| $$ | |
| on cohomology over $Y'$, see discussion above. | |
| Thus it suffices to find a basis for the topology | |
| on $Y$ such that the proposition holds for the members of the basis | |
| (in particular we can forget about the map $\tilde \xi$ when | |
| we do this). This reduces us to the case where $Y$ and $S$ | |
| are affine which is handled by Lemma \ref{lemma-global-generation-on-fibres} | |
| and the proof is complete. | |
| \end{proof} | |
| \section{Projective space bundle formula} | |
| \label{section-projective-space-bundle-formula} | |
| \noindent | |
| The title says it all. | |
| \begin{proposition} | |
| \label{proposition-projective-space-bundle-formula} | |
| Let $X \to S$ be a morphism of schemes. Let $\mathcal{E}$ be a locally | |
| free $\mathcal{O}_X$-module of constant rank $r$. Consider the morphism | |
| $p : P = \mathbf{P}(\mathcal{E}) \to X$. | |
| Then the map | |
| $$ | |
| \bigoplus\nolimits_{i = 0, \ldots, r - 1} H^*_{dR}(X/S) | |
| \longrightarrow | |
| H^*_{dR}(P/S) | |
| $$ | |
| given by the rule | |
| $$ | |
| (a_0, \ldots, a_{r - 1}) \longmapsto | |
| \sum\nolimits_{i = 0, \ldots, r - 1} c_1^{dR}(\mathcal{O}_P(1))^i \cup p^*(a_i) | |
| $$ | |
| is an isomorphism. | |
| \end{proposition} | |
| \begin{proof} | |
| Choose an affine open $\Spec(A) \subset X$ such that $\mathcal{E}$ restricts | |
| to the trivial locally free module $\mathcal{O}_{\Spec(A)}^{\oplus r}$. | |
| Then $P \times_X \Spec(A) = \mathbf{P}^{r - 1}_A$. Thus we see that | |
| $p$ is proper and smooth, see Section \ref{section-projective-space}. | |
| Moreover, the classes $c_1^{dR}(\mathcal{O}_P(1))^i$, $i = 0, 1, \ldots, r - 1$ | |
| restricted to a fibre $X_y = \mathbf{P}^{r - 1}_y$ freely generate the | |
| de Rham cohomology $H^*_{dR}(X_y/y)$ over $\kappa(y)$, see | |
| Lemma \ref{lemma-de-rham-cohomology-projective-space}. Thus we've verified the | |
| conditions of Proposition \ref{proposition-global-generation-on-fibres} | |
| and we win. | |
| \end{proof} | |
| \begin{remark} | |
| \label{remark-projective-space-bundle-formula} | |
| In the situation of | |
| Proposition \ref{proposition-projective-space-bundle-formula} | |
| we get moreover that the map | |
| $$ | |
| \tilde \xi : | |
| \bigoplus\nolimits_{t = 0, \ldots, r - 1} | |
| \Omega^\bullet_{X/S}[-2t] | |
| \longrightarrow | |
| Rp_*\Omega^\bullet_{P/S} | |
| $$ | |
| is an isomorphism in $D(X, (X \to S)^{-1}\mathcal{O}_X)$ as follows | |
| immediately from the application of | |
| Proposition \ref{proposition-global-generation-on-fibres}. | |
| Note that the arrow for $t = 0$ is simply the canonical map | |
| $c_{P/X} : \Omega^\bullet_{X/S} \to Rp_*\Omega^\bullet_{P/S}$ | |
| of Section \ref{section-de-rham-complex}. | |
| In fact, we can pin down this map further in this particular case. | |
| Namely, consider the canonical map | |
| $$ | |
| \xi' : \Omega^\bullet_{P/S} \to \Omega^\bullet_{P/S}[2] | |
| $$ | |
| of Remark \ref{remark-cup-product-as-a-map} corresponding to | |
| $c_1^{dR}(\mathcal{O}_P(1))$. Then | |
| $$ | |
| \xi'[2(t - 1)] \circ \ldots \circ \xi'[2] \circ \xi' : | |
| \Omega^\bullet_{P/S} \to \Omega^\bullet_{P/S}[2t] | |
| $$ | |
| is the map of Remark \ref{remark-cup-product-as-a-map} corresponding to | |
| $c_1^{dR}(\mathcal{O}_P(1))^t$. Tracing through the choices made in the | |
| proof of Proposition \ref{proposition-global-generation-on-fibres} | |
| we find the value | |
| $$ | |
| \tilde \xi|_{\Omega^\bullet_{X/S}[-2t]} = | |
| Rp_*\xi'[-2] \circ \ldots \circ Rp_*\xi'[-2(t - 1)] \circ | |
| Rp_*\xi'[-2t] \circ c_{P/X}[-2t] | |
| $$ | |
| for the restriction of our isomorphism to the summand | |
| $\Omega^\bullet_{X/S}[-2t]$. This has the following simple | |
| consequence we will use below: let | |
| $$ | |
| M = \bigoplus\nolimits_{t = 1, \ldots, r - 1} \Omega^\bullet_{X/S}[-2t] | |
| \quad\text{and}\quad | |
| K = \bigoplus\nolimits_{t = 0, \ldots, r - 2} \Omega^\bullet_{X/S}[-2t] | |
| $$ | |
| viewed as subcomplexes of the source of the arrow $\tilde \xi$. | |
| It follows formally from the discussion above that | |
| $$ | |
| c_{P/X} \oplus | |
| \tilde \xi|_M : | |
| \Omega^\bullet_{X/S} \oplus M \longrightarrow | |
| Rp_*\Omega^\bullet_{P/S} | |
| $$ | |
| is an isomorphism and that the diagram | |
| $$ | |
| \xymatrix{ | |
| K \ar[d]_{\tilde \xi|_K} \ar[r]_{\text{id}} & | |
| M[2] \ar[d]^{(\tilde \xi|_M)[2]} \\ | |
| Rp_*\Omega^\bullet_{P/S} \ar[r]^{Rp_*\xi'} & | |
| Rp_*\Omega^\bullet_{P/S}[2] | |
| } | |
| $$ | |
| commutes where $\text{id} : K \to M[2]$ identifies the summand | |
| corresponding to $t$ in the deomposition of $K$ to the summand | |
| corresponding to $t + 1$ in the decomposition of $M$. | |
| \end{remark} | |
| \section{Log poles along a divisor} | |
| \label{section-divisor} | |
| \noindent | |
| Let $X \to S$ be a morphism of schemes. Let $Y \subset X$ be an | |
| effective Cartier divisor. If $X$ \'etale locally along $Y$ looks | |
| like $Y \times \mathbf{A}^1$, then there is a canonical short exact sequence | |
| of complexes | |
| $$ | |
| 0 \to \Omega^\bullet_{X/S} \to | |
| \Omega^\bullet_{X/S}(\log Y) \to | |
| \Omega^\bullet_{Y/S}[-1] \to 0 | |
| $$ | |
| having many good properties we will discuss in this section. There is a | |
| variant of this construction where one starts with a normal crossings | |
| divisor | |
| (\'Etale Morphisms, Definition \ref{etale-definition-strict-normal-crossings}) | |
| which we will discuss elsewhere (insert future reference here). | |
| \begin{definition} | |
| \label{definition-local-product} | |
| Let $X \to S$ be a morphism of schemes. Let $Y \subset X$ be an | |
| effective Cartier divisor. We say the | |
| {\it de Rham complex of log poles is defined for $Y \subset X$ over $S$} | |
| if for all $y \in Y$ and local equation $f \in \mathcal{O}_{X, y}$ | |
| of $Y$ we have | |
| \begin{enumerate} | |
| \item $\mathcal{O}_{X, y} \to \Omega_{X/S, y}$, $g \mapsto g \text{d}f$ | |
| is a split injection, and | |
| \item $\Omega^p_{X/S, y}$ is $f$-torsion free for all $p$. | |
| \end{enumerate} | |
| \end{definition} | |
| \noindent | |
| An easy local calculation shows that it suffices for every $y \in Y$ | |
| to find one local equation $f$ for which conditions (1) and (2) hold. | |
| \begin{lemma} | |
| \label{lemma-log-complex} | |
| Let $X \to S$ be a morphism of schemes. Let $Y \subset X$ be an | |
| effective Cartier divisor. | |
| Assume the de Rham complex of log poles is defined for $Y \subset X$ over $S$. | |
| There is a canonical short exact sequence | |
| of complexes | |
| $$ | |
| 0 \to \Omega^\bullet_{X/S} \to | |
| \Omega^\bullet_{X/S}(\log Y) \to | |
| \Omega^\bullet_{Y/S}[-1] \to 0 | |
| $$ | |
| \end{lemma} | |
| \begin{proof} | |
| Our assumption is that for every $y \in Y$ and local equation | |
| $f \in \mathcal{O}_{X, y}$ of $Y$ we have | |
| $$ | |
| \Omega_{X/S, y} = \mathcal{O}_{X, y}\text{d}f \oplus M | |
| \quad\text{and}\quad | |
| \Omega^p_{X/S, y} = \wedge^{p - 1}(M)\text{d}f \oplus \wedge^p(M) | |
| $$ | |
| for some module $M$ with $f$-torsion free exterior powers $\wedge^p(M)$. | |
| It follows that | |
| $$ | |
| \Omega^p_{Y/S, y} = \wedge^p(M/fM) = \wedge^p(M)/f\wedge^p(M) | |
| $$ | |
| Below we will tacitly use these facts. | |
| In particular the sheaves $\Omega^p_{X/S}$ have no nonzero local | |
| sections supported on $Y$ and we have a canonical inclusion | |
| $$ | |
| \Omega^p_{X/S} \subset \Omega^p_{X/S}(Y) | |
| $$ | |
| see More on Flatness, Section \ref{flat-section-eta}. Let $U = \Spec(A)$ | |
| be an affine open subscheme such that $Y \cap U = V(f)$ for some | |
| nonzerodivisor $f \in A$. Let us consider the $\mathcal{O}_U$-submodule | |
| of $\Omega^p_{X/S}(Y)|_U$ generated by | |
| $\Omega^p_{X/S}|_U$ and $\text{d}\log(f) \wedge \Omega^{p - 1}_{X/S}$ | |
| where $\text{d}\log(f) = f^{-1}\text{d}(f)$. | |
| This is independent of the choice of $f$ as another generator of the | |
| ideal of $Y$ on $U$ is equal to $uf$ for a unit $u \in A$ and we get | |
| $$ | |
| \text{d}\log(uf) - \text{d}\log(f) = \text{d}\log(u) = u^{-1}\text{d}u | |
| $$ | |
| which is a section of $\Omega_{X/S}$ over $U$. These local | |
| sheaves glue to give a quasi-coherent submodule | |
| $$ | |
| \Omega^p_{X/S} \subset \Omega^p_{X/S}(\log Y) \subset \Omega^p_{X/S}(Y) | |
| $$ | |
| Let us agree to think of $\Omega^p_{Y/S}$ as a quasi-coherent | |
| $\mathcal{O}_X$-module. There is a unique surjective | |
| $\mathcal{O}_X$-linear map | |
| $$ | |
| \text{Res} : \Omega^p_{X/S}(\log Y) \to \Omega^{p - 1}_{Y/S} | |
| $$ | |
| defined by the rule | |
| $$ | |
| \text{Res}(\eta' + \text{d}\log(f) \wedge \eta) = \eta|_{Y \cap U} | |
| $$ | |
| for all opens $U$ as above and all | |
| $\eta' \in \Omega^p_{X/S}(U)$ and $\eta \in \Omega^{p - 1}_{X/S}(U)$. | |
| If a form $\eta$ over $U$ restricts to zero on $Y \cap U$, then | |
| $\eta = \text{d}f \wedge \eta' + f\eta''$ for some forms $\eta'$ and $\eta''$ | |
| over $U$. We conclude that | |
| we have a short exact sequence | |
| $$ | |
| 0 \to \Omega^p_{X/S} \to \Omega^p_{X/S}(\log Y) \to \Omega^{p - 1}_{Y/S} \to 0 | |
| $$ | |
| for all $p$. We still have to define the differentials | |
| $\Omega^p_{X/S}(\log Y) \to \Omega^{p + 1}_{X/S}(\log Y)$. | |
| On the subsheaf $\Omega^p_{X/S}$ we use the differential of | |
| the de Rham complex of $X$ over $S$. Finally, we define | |
| $\text{d}(\text{d}\log(f) \wedge \eta) = -\text{d}\log(f) \wedge \text{d}\eta$. | |
| The sign is forced on us by the Leibniz rule (on $\Omega^\bullet_{X/S}$) | |
| and it is compatible with the differential on $\Omega^\bullet_{Y/S}[-1]$ | |
| which is after all $-\text{d}_{Y/S}$ by our sign convention in | |
| Homology, Definition \ref{homology-definition-shift-cochain}. | |
| In this way we obtain a short exact | |
| sequence of complexes as stated in the lemma. | |
| \end{proof} | |
| \begin{definition} | |
| \label{definition-log-complex} | |
| Let $X \to S$ be a morphism of schemes. Let $Y \subset X$ be an | |
| effective Cartier divisor. Assume the de Rham complex of log poles | |
| is defined for $Y \subset X$ over $S$. Then the complex | |
| $$ | |
| \Omega^\bullet_{X/S}(\log Y) | |
| $$ | |
| constructed in Lemma \ref{lemma-log-complex} is the | |
| {\it de Rham complex of log poles for $Y \subset X$ over $S$}. | |
| \end{definition} | |
| \noindent | |
| This complex has many good properties. | |
| \begin{lemma} | |
| \label{lemma-multiplication-log} | |
| Let $p : X \to S$ be a morphism of schemes. Let $Y \subset X$ be an | |
| effective Cartier divisor. Assume the de Rham complex of log poles | |
| is defined for $Y \subset X$ over $S$. | |
| \begin{enumerate} | |
| \item The maps | |
| $\wedge : \Omega^p_{X/S} \times \Omega^q_{X/S} \to \Omega^{p + q}_{X/S}$ | |
| extend uniquely to $\mathcal{O}_X$-bilinear maps | |
| $$ | |
| \wedge : \Omega^p_{X/S}(\log Y) \times \Omega^q_{X/S}(\log Y) | |
| \to \Omega^{p + q}_{X/S}(\log Y) | |
| $$ | |
| satisfying the Leibniz rule | |
| $ | |
| \text{d}(\omega \wedge \eta) = \text{d}(\omega) \wedge \eta + | |
| (-1)^{\deg(\omega)} \omega \wedge \text{d}(\eta)$, | |
| \item with multiplication as in (1) the map | |
| $\Omega^\bullet_{X/S} \to \Omega^\bullet_{X/S}(\log(Y)$ | |
| is a homomorphism of differential graded $\mathcal{O}_S$-algebras, | |
| \item via the maps in (1) we have $\Omega^p_{X/S}(\log Y) = | |
| \wedge^p(\Omega^1_{X/S}(\log Y))$, and | |
| \item the map | |
| $\text{Res} : \Omega^\bullet_{X/S}(\log Y) \to \Omega^\bullet_{Y/S}[-1]$ | |
| satisfies | |
| $$ | |
| \text{Res}(\omega \wedge \eta) = \text{Res}(\omega) \wedge \eta|_Y | |
| $$ | |
| for $\omega$ a local section of $\Omega^p_{X/S}(\log Y)$ and $\eta$ | |
| a local section of $\Omega^q_{X/S}$. | |
| \end{enumerate} | |
| \end{lemma} | |
| \begin{proof} | |
| This follows by direct calcuation from the local construction | |
| of the complex in the proof of Lemma \ref{lemma-log-complex}. | |
| Details omitted. | |
| \end{proof} | |
| \noindent | |
| Consider a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| X' \ar[r]_f \ar[d] & X \ar[d] \\ | |
| S' \ar[r] & S | |
| } | |
| $$ | |
| of schemes. Let $Y \subset X$ be an effective Cartier divisor | |
| whose pullback $Y' = f^*Y$ is defined | |
| (Divisors, Definition | |
| \ref{divisors-definition-pullback-effective-Cartier-divisor}). | |
| Assume | |
| the de Rham complex of log poles is defined for $Y \subset X$ over $S$ | |
| and | |
| the de Rham complex of log poles is defined for $Y' \subset X'$ over $S'$. | |
| In this case we obtain a map of short exact sequences of complexes | |
| $$ | |
| \xymatrix{ | |
| 0 \ar[r] & | |
| f^{-1}\Omega^\bullet_{X/S} \ar[r] \ar[d] & | |
| f^{-1}\Omega^\bullet_{X/S}(\log Y) \ar[r] \ar[d] & | |
| f^{-1}\Omega^\bullet_{Y/S}[-1] \ar[r] \ar[d] & | |
| 0 \\ | |
| 0 \ar[r] & | |
| \Omega^\bullet_{X'/S'} \ar[r] & | |
| \Omega^\bullet_{X'/S'}(\log Y') \ar[r] & | |
| \Omega^\bullet_{Y'/S'}[-1] \ar[r] & | |
| 0 | |
| } | |
| $$ | |
| Linearizing, for every $p$ we obtain a linear map | |
| $f^*\Omega^p_{X/S}(\log Y) \to \Omega^p_{X'/S'}(\log Y')$. | |
| \begin{lemma} | |
| \label{lemma-gysin-via-log-complex} | |
| Let $f : X \to S$ be a morphism of schemes. Let $Y \subset X$ be an effective | |
| Cartier divisor. Assume the de Rham complex of log poles is defined for | |
| $Y \subset X$ over $S$. Denote | |
| $$ | |
| \delta : \Omega^\bullet_{Y/S} \to \Omega^\bullet_{X/S}[2] | |
| $$ | |
| in $D(X, f^{-1}\mathcal{O}_S)$ the ``boundary'' map coming from the | |
| short exact sequence in Lemma \ref{lemma-log-complex}. Denote | |
| $$ | |
| \xi' : \Omega^\bullet_{X/S} \to \Omega^\bullet_{X/S}[2] | |
| $$ | |
| in $D(X, f^{-1}\mathcal{O}_S)$ the map of | |
| Remark \ref{remark-cup-product-as-a-map} | |
| corresponding to $\xi = c_1^{dR}(\mathcal{O}_X(-Y))$. Denote | |
| $$ | |
| \zeta' : \Omega^\bullet_{Y/S} \to \Omega^\bullet_{Y/S}[2] | |
| $$ | |
| in $D(Y, f|_Y^{-1}\mathcal{O}_S)$ the map of | |
| Remark \ref{remark-cup-product-as-a-map} corresponding to | |
| $\zeta = c_1^{dR}(\mathcal{O}_X(-Y)|_Y)$. Then the diagram | |
| $$ | |
| \xymatrix{ | |
| \Omega^\bullet_{X/S} \ar[d]_{\xi'} \ar[r] & | |
| \Omega^\bullet_{Y/S} \ar[d]^{\zeta'} \ar[ld]_\delta \\ | |
| \Omega^\bullet_{X/S}[2] \ar[r] & | |
| \Omega^\bullet_{Y/S}[2] | |
| } | |
| $$ | |
| is commutative in $D(X, f^{-1}\mathcal{O}_S)$. | |
| \end{lemma} | |
| \begin{proof} | |
| More precisely, we define $\delta$ as the boundary map corresponding to the | |
| shifted short exact sequence | |
| $$ | |
| 0 \to \Omega^\bullet_{X/S}[1] \to | |
| \Omega^\bullet_{X/S}(\log Y)[1] \to | |
| \Omega^\bullet_{Y/S} \to 0 | |
| $$ | |
| It suffices to prove each triangle commutes. Set | |
| $\mathcal{L} = \mathcal{O}_X(-Y)$. Denote $\pi : L \to X$ the line bundle | |
| with $\pi_*\mathcal{O}_L = \bigoplus_{n \geq 0} \mathcal{L}^{\otimes n}$. | |
| \medskip\noindent | |
| Commutativity of the upper left triangle. | |
| By Lemma \ref{lemma-the-complex-for-L-star-gives-chern-class} | |
| the map $\xi'$ is the boundary map of the triangle given in | |
| Lemma \ref{lemma-the-complex-for-L-star}. | |
| By functoriality it suffices to prove there exists a morphism of | |
| short exact sequences | |
| $$ | |
| \xymatrix{ | |
| 0 \ar[r] & | |
| \Omega^\bullet_{X/S}[1] \ar[r] \ar[d] & | |
| \Omega^\bullet_{L^\star/S, 0}[1] \ar[r] \ar[d] & | |
| \Omega^\bullet_{X/S} \ar[r] \ar[d] & | |
| 0 \\ | |
| 0 \ar[r] & | |
| \Omega^\bullet_{X/S}[1] \ar[r] & | |
| \Omega^\bullet_{X/S}(\log Y)[1] \ar[r] & | |
| \Omega^\bullet_{Y/S} \ar[r] & | |
| 0 | |
| } | |
| $$ | |
| where the left and right vertical arrows are the obvious ones. | |
| We can define the middle vertical arrow by the rule | |
| $$ | |
| \omega' + \text{d}\log(s) \wedge \omega \longmapsto | |
| \omega' + \text{d}\log(f) \wedge \omega | |
| $$ | |
| where $\omega', \omega$ are local sections of $\Omega^\bullet_{X/S}$ | |
| and where $s$ is a local generator of $\mathcal{L}$ and | |
| $f \in \mathcal{O}_X(-Y)$ is the corresponding section of the ideal | |
| sheaf of $Y$ in $X$. Since the constructions of the maps in | |
| Lemmas \ref{lemma-the-complex-for-L-star} and \ref{lemma-log-complex} | |
| match exactly, this works. | |
| \medskip\noindent | |
| Commutativity of the lower right triangle. Denote | |
| $\overline{L}$ the restriction of $L$ to $Y$. | |
| By Lemma \ref{lemma-the-complex-for-L-star-gives-chern-class} | |
| the map $\zeta'$ is the boundary map of the triangle given in | |
| Lemma \ref{lemma-the-complex-for-L-star} using the line bundle | |
| $\overline{L}$ on $Y$. | |
| By functoriality it suffices to prove there exists a morphism of | |
| short exact sequences | |
| $$ | |
| \xymatrix{ | |
| 0 \ar[r] & | |
| \Omega^\bullet_{X/S}[1] \ar[r] \ar[d] & | |
| \Omega^\bullet_{X/S}(\log Y)[1] \ar[r] \ar[d] & | |
| \Omega^\bullet_{Y/S} \ar[r] \ar[d] & | |
| 0 \\ | |
| 0 \ar[r] & | |
| \Omega^\bullet_{Y/S}[1] \ar[r] & | |
| \Omega^\bullet_{\overline{L}^\star/S, 0}[1] \ar[r] & | |
| \Omega^\bullet_{Y/S} \ar[r] & | |
| 0 \\ | |
| } | |
| $$ | |
| where the left and right vertical arrows are the obvious ones. | |
| We can define the middle vertical arrow by the rule | |
| $$ | |
| \omega' + \text{d}\log(f) \wedge \omega \longmapsto | |
| \omega'|_Y + \text{d}\log(\overline{s}) \wedge \omega|_Y | |
| $$ | |
| where $\omega', \omega$ are local sections of $\Omega^\bullet_{X/S}$ | |
| and where $f$ is a local generator of $\mathcal{O}_X(-Y)$ viewed as | |
| a function on $X$ and where $\overline{s}$ is $f|_Y$ viewed as a | |
| section of $\mathcal{L}|_Y = \mathcal{O}_X(-Y)|_Y$. | |
| Since the constructions of the maps in | |
| Lemmas \ref{lemma-the-complex-for-L-star} and \ref{lemma-log-complex} | |
| match exactly, this works. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-log-complex-consequence} | |
| Let $X \to S$ be a morphism of schemes. Let $Y \subset X$ be an effective | |
| Cartier divisor. Assume the de Rham complex of log poles is defined for | |
| $Y \subset X$ over $S$. Let $b \in H^m_{dR}(X/S)$ be a de Rham cohomology | |
| class whose restriction to $Y$ is zero. Then | |
| $c_1^{dR}(\mathcal{O}_X(Y)) \cup b = 0$ in $H^{m + 2}_{dR}(X/S)$. | |
| \end{lemma} | |
| \begin{proof} | |
| This follows immediately from Lemma \ref{lemma-gysin-via-log-complex}. | |
| Namely, we have | |
| $$ | |
| c_1^{dR}(\mathcal{O}_X(Y)) \cup b = | |
| -c_1^{dR}(\mathcal{O}_X(-Y)) \cup b = -\xi'(b) = -\delta(b|_Y) = 0 | |
| $$ | |
| as desired. For the second equality, see | |
| Remark \ref{remark-cup-product-as-a-map}. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-check-log-smooth} | |
| Let $X \to T \to S$ be morphisms of schemes. Let $Y \subset X$ be an effective | |
| Cartier divisor. If both $X \to T$ and $Y \to T$ are smooth, then | |
| the de Rham complex of log poles is defined for $Y \subset X$ over $S$. | |
| \end{lemma} | |
| \begin{proof} | |
| Let $y \in Y$ be a point. | |
| By More on Morphisms, Lemma \ref{more-morphisms-lemma-etale-local-structure} | |
| there exists an integer $0 \geq m$ and a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| Y \ar[d] & | |
| V \ar[l] \ar[d] \ar[r] & | |
| \mathbf{A}^m_T | |
| \ar[d]^{(a_1, \ldots, a_m) \mapsto (a_1, \ldots, a_m, 0)} \\ | |
| X & | |
| U \ar[l] \ar[r]^-\pi & | |
| \mathbf{A}^{m + 1}_T | |
| } | |
| $$ | |
| where $U \subset X$ is open, $V = Y \cap U$, | |
| $\pi$ is \'etale, $V = \pi^{-1}(\mathbf{A}^m_T)$, and $y \in V$. | |
| Denote $z \in \mathbf{A}^m_T$ the image of $y$. Then we have | |
| $$ | |
| \Omega^p_{X/S, y} = \Omega^p_{\mathbf{A}^{m + 1}_T/S, z} | |
| \otimes_{\mathcal{O}_{\mathbf{A}^{m + 1}_T, z}} \mathcal{O}_{X, x} | |
| $$ | |
| by Lemma \ref{lemma-etale}. Denote $x_1, \ldots, x_{m + 1}$ | |
| the coordinate functions on $\mathbf{A}^{m + 1}_T$. | |
| Since the conditions (1) and (2) in Definition \ref{definition-local-product} | |
| do not depend on the choice of the local coordinate, | |
| it suffices to check the conditions (1) and (2) when $f$ is the | |
| image of $x_{m + 1}$ by the flat local ring homomorphism | |
| $\mathcal{O}_{\mathbf{A}^{m + 1}_T, z} \to \mathcal{O}_{X, x}$. | |
| In this way we see that it suffices to check conditions (1) and (2) | |
| for $\mathbf{A}^m_T \subset \mathbf{A}^{m + 1}_T$ and the point $z$. | |
| To prove this case we may assume $S = \Spec(A)$ and $T = \Spec(B)$ | |
| are affine. Let $A \to B$ be the ring map corresponding to the morphism | |
| $T \to S$ and set $P = B[x_1, \ldots, x_{m + 1}]$ so that | |
| $\mathbf{A}^{m + 1}_T = \Spec(B)$. We have | |
| $$ | |
| \Omega_{P/A} = \Omega_{B/A} \otimes_B P \oplus | |
| \bigoplus\nolimits_{j = 1, \ldots, m} P \text{d}x_j \oplus | |
| P \text{d}x_{m + 1} | |
| $$ | |
| Hence the map $P \to \Omega_{P/A}$, $g \mapsto g \text{d}x_{m + 1}$ | |
| is a split injection and $x_{m + 1}$ is a nonzerodivisor on | |
| $\Omega^p_{P/A}$ for all $p \geq 0$. Localizing at the prime ideal | |
| corresponding to $z$ finishes the proof. | |
| \end{proof} | |
| \begin{remark} | |
| \label{remark-check-log-completion-1} | |
| Let $S$ be a locally Noetherian scheme. Let $X$ be locally of finite | |
| type over $S$. Let $Y \subset X$ be an effective Cartier divisor. | |
| If the map | |
| $$ | |
| \mathcal{O}_{X, y}^\wedge \longrightarrow \mathcal{O}_{Y, y}^\wedge | |
| $$ | |
| has a section for all $y \in Y$, then | |
| the de Rham complex of log poles is defined for $Y \subset X$ over $S$. | |
| If we ever need this result we will formulate a precise statement and | |
| add a proof here. | |
| \end{remark} | |
| \begin{remark} | |
| \label{remark-check-log-completion-2} | |
| Let $S$ be a locally Noetherian scheme. Let $X$ be locally of finite | |
| type over $S$. Let $Y \subset X$ be an effective Cartier divisor. | |
| If for every $y \in Y$ we can find a diagram of schemes over $S$ | |
| $$ | |
| X \xleftarrow{\varphi} U \xrightarrow{\psi} V | |
| $$ | |
| with $\varphi$ \'etale and $\psi|_{\varphi^{-1}(Y)} : \varphi^{-1}(Y) \to V$ | |
| \'etale, then the de Rham complex of log poles is defined for | |
| $Y \subset X$ over $S$. A special case is when the pair $(X, Y)$ | |
| \'etale locally looks like $(V \times \mathbf{A}^1, V \times \{0\})$. | |
| If we ever need this result we will formulate | |
| a precise statement and add a proof here. | |
| \end{remark} | |
| \section{Calculations} | |
| \label{section-calculations} | |
| \noindent | |
| In this section we calculate some Hodge and de Rham cohomology | |
| groups for a standard blowing up. | |
| \medskip\noindent | |
| We fix a ring $R$ and we set $S = \Spec(R)$. Fix integers $0 \leq m$ and | |
| $1 \leq n$. Consider the closed immersion | |
| $$ | |
| Z = \mathbf{A}^m_S \longrightarrow \mathbf{A}^{m + n}_S = X,\quad | |
| (a_1, \ldots, a_m) \mapsto (a_1, \ldots, a_m, 0, \ldots 0). | |
| $$ | |
| We are going to consider the blowing up $L$ of $X$ | |
| along the closed subscheme $Z$. Write | |
| $$ | |
| X = | |
| \mathbf{A}^{m + n}_S = | |
| \Spec(A) | |
| \quad\text{with}\quad | |
| A = R[x_1, \ldots, x_m, y_1, \ldots, y_n] | |
| $$ | |
| We will consider $A = R[x_1, \ldots, x_m, y_1, \ldots, y_n]$ as a | |
| graded $R$-algebra by setting $\deg(x_i) = 0$ and $\deg(y_j) = 1$. | |
| With this grading we have | |
| $$ | |
| P = | |
| \text{Proj}(A) = | |
| \mathbf{A}^m_S \times_S \mathbf{P}^{n - 1}_S = | |
| Z \times_S \mathbf{P}^{n - 1}_S = | |
| \mathbf{P}^{n - 1}_Z | |
| $$ | |
| Observe that the ideal cutting out $Z$ in $X$ is the ideal $A_+$. | |
| Hence $L$ is the Proj of the Rees algebra | |
| $$ | |
| A \oplus A_+ \oplus (A_+)^2 \oplus \ldots = | |
| \bigoplus\nolimits_{d \geq 0} A_{\geq d} | |
| $$ | |
| Hence $L$ is an example of the phenomenon studied in | |
| more generality in More on Morphisms, Section | |
| \ref{more-morphisms-section-proj-spec}; | |
| we will use the observations we made there without further mention. | |
| In particular, we have a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| P \ar[r]_0 \ar[d]_p & | |
| L \ar[r]_-\pi \ar[d]^b & | |
| P \ar[d]^p \\ | |
| Z \ar[r]^i & | |
| X \ar[r] & | |
| Z | |
| } | |
| $$ | |
| such that $\pi : L \to P$ is a line bundle over | |
| $P = Z \times_S \mathbf{P}^{n - 1}_S$ | |
| with zero section $0$ whose image $E = 0(P) \subset L$ | |
| is the exceptional divisor of the blowup $b$. | |
| \begin{lemma} | |
| \label{lemma-comparison} | |
| For $a \geq 0$ we have | |
| \begin{enumerate} | |
| \item the map | |
| $\Omega^a_{X/S} \to b_*\Omega^a_{L/S}$ is an isomorphism, | |
| \item the map $\Omega^a_{Z/S} \to p_*\Omega^a_{P/S}$ is an isomorphism, | |
| and | |
| \item the map $Rb_*\Omega^a_{L/S} \to i_*Rp_*\Omega^a_{P/S}$ is an isomorphism | |
| on cohomology sheaves in degree $\geq 1$. | |
| \end{enumerate} | |
| \end{lemma} | |
| \begin{proof} | |
| Let us first prove part (2). Since | |
| $P = Z \times_S \mathbf{P}^{n - 1}_S$ | |
| we see that | |
| $$ | |
| \Omega^a_{P/S} = \bigoplus\nolimits_{a = r + s} | |
| \text{pr}_1^*\Omega^r_{Z/S} \otimes | |
| \text{pr}_2^*\Omega^s_{\mathbf{P}^{n - 1}_S/S} | |
| $$ | |
| Recalling that $p = \text{pr}_1$ by the projection formula | |
| (Cohomology, Lemma \ref{cohomology-lemma-projection-formula}) | |
| we obtain | |
| $$ | |
| p_*\Omega^a_{P/S} = \bigoplus\nolimits_{a = r + s} | |
| \Omega^r_{Z/S} \otimes | |
| \text{pr}_{1, *}\text{pr}_2^*\Omega^s_{\mathbf{P}^{n - 1}_S/S} | |
| $$ | |
| By the calculations in Section \ref{section-projective-space} | |
| and in particular in | |
| the proof of Lemma \ref{lemma-hodge-cohomology-projective-space} | |
| we have $\text{pr}_{1, *}\text{pr}_2^*\Omega^s_{\mathbf{P}^{n - 1}_S/S} = 0$ | |
| except if $s = 0$ in which case we get | |
| $\text{pr}_{1, *}\mathcal{O}_P = \mathcal{O}_Z$. | |
| This proves (2). | |
| \medskip\noindent | |
| By the material in Section \ref{section-line-bundle} and in particular | |
| Lemma \ref{lemma-push-omega-a} we have | |
| $\pi_*\Omega^a_{L/S} = \Omega^a_{P/S} \oplus | |
| \bigoplus_{k \geq 1} \Omega^a_{L/S, k}$. | |
| Since the composition $\pi \circ 0$ in the diagram above | |
| is the identity morphism on $P$ to prove part (3) it suffices to show that | |
| $\Omega^a_{L/S, k}$ has vanishing higher cohomology for $k > 0$. | |
| By Lemmas \ref{lemma-the-complex-for-L-star} and \ref{lemma-push-omega-a} | |
| there are short exact sequences | |
| $$ | |
| 0 \to \Omega^a_{P/S} \otimes \mathcal{O}_P(k) | |
| \to \Omega^a_{L/S, k} \to | |
| \Omega^{a - 1}_{P/S} \otimes \mathcal{O}_P(k) \to 0 | |
| $$ | |
| where $\Omega^{a - 1}_{P/S} = 0$ if $a = 0$. Since | |
| $P = Z \times_S \mathbf{P}^{n - 1}_S$ we have | |
| $$ | |
| \Omega^a_{P/S} = \bigoplus\nolimits_{i + j = a} | |
| \Omega^i_{Z/S} \boxtimes \Omega^j_{\mathbf{P}^{n - 1}_S/S} | |
| $$ | |
| by Lemma \ref{lemma-de-rham-complex-product}. | |
| Since $\Omega^i_{Z/S}$ is free of finite rank | |
| we see that it suffices to show that the higher cohomology of | |
| $\mathcal{O}_Z \boxtimes \Omega^j_{\mathbf{P}^{n - 1}_S/S}(k)$ | |
| is zero for $k > 0$. This follows from | |
| Lemma \ref{lemma-twisted-hodge-cohomology-projective-space} | |
| applied to $P = Z \times_S \mathbf{P}^{n - 1}_S = \mathbf{P}^{n - 1}_Z$ | |
| and the proof of (3) is complete. | |
| \medskip\noindent | |
| We still have to prove (1). If $n = 1$, then we are blowing | |
| up an effective Cartier divisor and $b$ is an isomorphism | |
| and we have (1). If $n > 1$, then the composition | |
| $$ | |
| \Gamma(X, \Omega^a_{X/S}) | |
| \to | |
| \Gamma(L, \Omega^a_{L/S}) | |
| \to | |
| \Gamma(L \setminus E, \Omega^a_{L/S}) | |
| = | |
| \Gamma(X \setminus Z, \Omega^a_{X/S}) | |
| $$ | |
| is an isomorphism as $\Omega^a_{X/S}$ is finite free | |
| (small detail omitted). Thus the only way (1) can fail is if | |
| there are nonzero elements of $\Gamma(L, \Omega^a_{L/S})$ which vanish | |
| outside of $E = 0(P)$. Since $L$ is a line bundle over $P$ | |
| with zero section $0 : P \to L$, it suffices to show that | |
| on a line bundle there are no nonzero sections of a sheaf | |
| of differentials which vanish identically outside the zero section. | |
| The reader sees this is true either (preferably) by a local caculation | |
| or by using that $\Omega_{L/S, k} \subset \Omega_{L^\star/S, k}$ | |
| (see references above). | |
| \end{proof} | |
| \noindent | |
| We suggest the reader skip to the next section at this point. | |
| \begin{lemma} | |
| \label{lemma-comparison-bis} | |
| For $a \geq 0$ there are canonical maps | |
| $$ | |
| b^*\Omega^a_{X/S} \longrightarrow | |
| \Omega^a_{L/S} \longrightarrow | |
| b^*\Omega^a_{X/S} \otimes_{\mathcal{O}_L} \mathcal{O}_L((n - 1)E) | |
| $$ | |
| whose composition is induced by the inclusion | |
| $\mathcal{O}_L \subset \mathcal{O}_L((n - 1)E)$. | |
| \end{lemma} | |
| \begin{proof} | |
| The first arrow in the displayed formula is | |
| discussed in Section \ref{section-de-rham-complex}. | |
| To get the second arrow we have to show that if we view | |
| a local section of $\Omega^a_{L/S}$ as a ``meromorphic section'' | |
| of $b^*\Omega^a_{X/S}$, then it has a pole of order at most | |
| $n - 1$ along $E$. To see this we work on affine local charts | |
| on $L$. Namely, recall that $L$ is covered by the spectra of the | |
| affine blowup algebras $A[\frac{I}{y_i}]$ where $I = A_{+}$ | |
| is the ideal generated by $y_1, \ldots, y_n$. See | |
| Algebra, Section \ref{algebra-section-blow-up} and | |
| Divisors, Lemma \ref{divisors-lemma-blowing-up-affine}. | |
| By symmetry it is enough to work on the | |
| chart corresponding to $i = 1$. Then | |
| $$ | |
| A[\frac{I}{y_1}] = R[x_1, \ldots, x_m, y_1, t_2, \ldots, t_n] | |
| $$ | |
| where $t_i = y_i/y_1$, see | |
| More on Algebra, Lemma \ref{more-algebra-lemma-blowup-regular-sequence}. | |
| Thus the module $\Omega^1_{L/S}$ is over the corresponding | |
| affine open freely generated by | |
| $\text{d}x_1, \ldots, \text{d}x_m$, $\text{d}y_1$, and | |
| $\text{d}t_1, \ldots, \text{d}t_n$. | |
| Of course, the first $m + 1$ of these generators come from | |
| $b^*\Omega^1_{X/S}$ and for the remaining $n - 1$ we have | |
| $$ | |
| \text{d}t_j = | |
| \text{d}\frac{y_j}{y_1} = | |
| \frac{1}{y_1}\text{d}y_j - \frac{y_j}{y_1^2}\text{d}y_1 = | |
| \frac{\text{d}y_j - t_j \text{d}y_1}{y_1} | |
| $$ | |
| which has a pole of order $1$ along $E$ since $E$ is cut out by $y_1$ | |
| on this chart. Since the wedges of $a$ of these elements give a basis | |
| of $\Omega^a_{L/S}$ over this chart, and since there are at most | |
| $n - 1$ of the $\text{d}t_j$ involved this finishes the proof. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-blowup-twist-same-cohomology} | |
| Let $E = 0(P)$ be the exceptional divisor of the blowing up $b$. | |
| For any locally free $\mathcal{O}_X$-module $\mathcal{E}$ and | |
| $0 \leq i \leq n - 1$ the map | |
| $$ | |
| \mathcal{E} | |
| \longrightarrow | |
| Rb_*(b^*\mathcal{E} \otimes_{\mathcal{O}_L} \mathcal{O}_L(iE)) | |
| $$ | |
| is an isomorphism in $D(\mathcal{O}_X)$. | |
| \end{lemma} | |
| \begin{proof} | |
| By the projection formula it is enough to show this for | |
| $\mathcal{E} = \mathcal{O}_X$, see Cohomology, Lemma | |
| \ref{cohomology-lemma-projection-formula}. | |
| Since $X$ is affine it suffices to show that the maps | |
| $$ | |
| H^0(X, \mathcal{O}_X) \to | |
| H^0(L, \mathcal{O}_L) \to | |
| H^0(L, \mathcal{O}_L(iE)) | |
| $$ | |
| are isomorphisms and that $H^j(X, \mathcal{O}_L(iE)) = 0$ | |
| for $j > 0$ and $0 \leq i \leq n - 1$, see Cohomology of Schemes, Lemma | |
| \ref{coherent-lemma-quasi-coherence-higher-direct-images-application}. | |
| Since $\pi$ is affine, we can compute global sections and | |
| cohomology after taking $\pi_*$, see Cohomology of Schemes, Lemma | |
| \ref{coherent-lemma-relative-affine-cohomology}. If $n = 1$, then | |
| $L \to X$ is an isomorphism and $i = 0$ hence the first statement holds. | |
| If $n > 1$, then we consider the composition | |
| $$ | |
| H^0(X, \mathcal{O}_X) \to H^0(L, \mathcal{O}_L) \to | |
| H^0(L, \mathcal{O}_L(iE)) \to H^0(L \setminus E, \mathcal{O}_L) = | |
| H^0(X \setminus Z, \mathcal{O}_X) | |
| $$ | |
| Since | |
| $H^0(X \setminus Z, \mathcal{O}_X) = H^0(X, \mathcal{O}_X)$ in this | |
| case as $Z$ has codimension $n \geq 2$ in $X$ (details omitted) we conclude | |
| the first statement holds. For the second, recall that | |
| $\mathcal{O}_L(E) = \mathcal{O}_L(-1)$, see Divisors, Lemma | |
| \ref{divisors-lemma-blowing-up-gives-effective-Cartier-divisor}. | |
| Hence we have | |
| $$ | |
| \pi_*\mathcal{O}_L(iE) = | |
| \pi_*\mathcal{O}_L(-i) = | |
| \bigoplus\nolimits_{k \geq -i} \mathcal{O}_P(k) | |
| $$ | |
| as discussed in | |
| More on Morphisms, Section \ref{more-morphisms-section-proj-spec}. | |
| Thus we conclude by the vanishing of the cohomology of twists | |
| of the structure sheaf on $P = \mathbf{P}^{n - 1}_Z$ | |
| shown in Cohomology of Schemes, Lemma | |
| \ref{coherent-lemma-cohomology-projective-space-over-ring}. | |
| \end{proof} | |
| \section{Blowing up and de Rham cohomology} | |
| \label{section-blowing-up} | |
| \noindent | |
| Fix a base scheme $S$, a smooth morphism $X \to S$, and a closed subscheme | |
| $Z \subset X$ which is also smooth over $S$. Denote $b : X' \to X$ | |
| the blowing up of $X$ along $Z$. Denote $E \subset X'$ the exceptional | |
| divisor. Picture | |
| \begin{equation} | |
| \label{equation-blowup} | |
| \vcenter{ | |
| \xymatrix{ | |
| E \ar[r]_j \ar[d]_p & X' \ar[d]^b \\ | |
| Z \ar[r]^i & X | |
| } | |
| } | |
| \end{equation} | |
| Our goal in this section is to prove that the map | |
| $b^* : H_{dR}^*(X/S) \longrightarrow H_{dR}^*(X'/S)$ | |
| is injective (although a lot more can be said). | |
| \begin{lemma} | |
| \label{lemma-blowup} | |
| Let $S$ be a scheme. Let $Z \to X$ be a closed immersion of schemes | |
| smooth over $S$. Let $b : X' \to X$ be the blowing up of $Z$ with | |
| exceptional divisor $E \subset X'$. Then $X'$ and $E$ are smooth | |
| over $S$. The morphism $p : E \to Z$ is canonically isomorphic | |
| to the projective space bundle | |
| $$ | |
| \mathbf{P}(\mathcal{I}/\mathcal{I}^2) \longrightarrow Z | |
| $$ | |
| where $\mathcal{I} \subset \mathcal{O}_X$ is the ideal sheaf | |
| of $Z$. The relative $\mathcal{O}_E(1)$ coming from the projective | |
| space bundle structure is isomorphic to the restriction of | |
| $\mathcal{O}_{X'}(-E)$ to $E$. | |
| \end{lemma} | |
| \begin{proof} | |
| By Divisors, Lemma | |
| \ref{divisors-lemma-immersion-smooth-into-smooth-regular-immersion} | |
| the immersion $Z \to X$ is a regular immmersion, hence | |
| the ideal sheaf $\mathcal{I}$ is of finite type, hence $b$ is a projective | |
| morphism with relatively ample invertible sheaf | |
| $\mathcal{O}_{X'}(1) = \mathcal{O}_{X'}(-E)$, see | |
| Divisors, Lemmas | |
| \ref{divisors-lemma-blowing-up-gives-effective-Cartier-divisor} and | |
| \ref{divisors-lemma-blowing-up-projective}. | |
| The canonical map $\mathcal{I} \to b_*\mathcal{O}_{X'}(1)$ | |
| gives a closed immersion | |
| $$ | |
| X' \longrightarrow | |
| \mathbf{P}\left(\bigoplus\nolimits_{n \geq 0} | |
| \text{Sym}^n_{\mathcal{O}_X}(\mathcal{I})\right) | |
| $$ | |
| by the very construction of the blowup. The restriction of this morphism | |
| to $E$ gives a canonical map | |
| $$ | |
| E \longrightarrow | |
| \mathbf{P}\left(\bigoplus\nolimits_{n \geq 0} | |
| \text{Sym}^n_{\mathcal{O}_Z}(\mathcal{I}/\mathcal{I}^2)\right) | |
| $$ | |
| over $Z$. Since $\mathcal{I}/\mathcal{I}^2$ is finite locally free | |
| if this canonical map is an isomorphism, then the final part of the | |
| lemma holds. Having said all of this, now the question is \'etale | |
| local on $X$. Namely, blowing up commutes with flat base change by | |
| Divisors, Lemma \ref{divisors-lemma-flat-base-change-blowing-up} | |
| and we can check smoothness after precomposing with a surjective | |
| \'etale morphism. Thus by the \'etale local structure of a | |
| closed immersion of schemes over $S$ given in More on Morphisms, Lemma | |
| \ref{more-morphisms-lemma-etale-local-structure} | |
| this reduces to the situation discussed in | |
| Section \ref{section-calculations}. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-comparison-general} | |
| With notation as in Lemma \ref{lemma-blowup} for $a \geq 0$ we have | |
| \begin{enumerate} | |
| \item the map | |
| $\Omega^a_{X/S} \to b_*\Omega^a_{X'/S}$ is an isomorphism, | |
| \item the map $\Omega^a_{Z/S} \to p_*\Omega^a_{E/S}$ is an isomorphism, | |
| \item the map $Rb_*\Omega^a_{X'/S} \to i_*Rp_*\Omega^a_{E/S}$ is an isomorphism | |
| on cohomology sheaves in degree $\geq 1$. | |
| \end{enumerate} | |
| \end{lemma} | |
| \begin{proof} | |
| Let $\epsilon : X_1 \to X$ be a surjective \'etale morphism. Denote | |
| $i_1 : Z_1 \to X_1$, $b_1 : X'_1 \to X_1$, $E_1 \subset X'_1$, and | |
| $p_1 : E_1 \to Z_1$ the base changes of the objects considered in | |
| Lemma \ref{lemma-blowup}. Observe that $i_1$ is a closed immersion | |
| of schemes smooth over $S$ and that $b_1$ is the blowing up with center | |
| $Z_1$ by Divisors, Lemma \ref{divisors-lemma-flat-base-change-blowing-up}. | |
| Suppose that we can prove (1), (2), and (3) | |
| for the morphisms $b_1$, $p_1$, and $i_1$. Then by | |
| Lemma \ref{lemma-etale} we obtain that the pullback by $\epsilon$ | |
| of the maps in (1), (2), and (3) are isomorphisms. As $\epsilon$ | |
| is a surjective flat morphism we conclude. | |
| Thus working \'etale locally, by | |
| More on Morphisms, Lemma \ref{more-morphisms-lemma-etale-local-structure}, | |
| we may assume we are in the situation discussed in | |
| Section \ref{section-calculations}. In this case the lemma | |
| is the same as Lemma \ref{lemma-comparison}. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-distinguished-triangle-blowup} | |
| With notation as in Lemma \ref{lemma-blowup} and denoting $f : X \to S$ | |
| the structure morphism there is a canonical | |
| distinguished triangle | |
| $$ | |
| \Omega^\bullet_{X/S} \to | |
| Rb_*(\Omega^\bullet_{X'/S}) \oplus i_*\Omega^\bullet_{Z/S} \to | |
| i_*Rp_*(\Omega^\bullet_{E/S}) \to | |
| \Omega^\bullet_{X/S}[1] | |
| $$ | |
| in $D(X, f^{-1}\mathcal{O}_S)$ where the four maps | |
| $$ | |
| \begin{matrix} | |
| \Omega^\bullet_{X/S} & \to & Rb_*(\Omega^\bullet_{X'/S}), \\ | |
| \Omega^\bullet_{X/S} & \to & i_*\Omega^\bullet_{Z/S}, \\ | |
| Rb_*(\Omega^\bullet_{X'/S}) & \to & i_*Rp_*(\Omega^\bullet_{E/S}), \\ | |
| i_*\Omega^\bullet_{Z/S} & \to & i_*Rp_*(\Omega^\bullet_{E/S}) | |
| \end{matrix} | |
| $$ | |
| are the canonical ones (Section \ref{section-de-rham-complex}), | |
| except with sign reversed for one of them. | |
| \end{lemma} | |
| \begin{proof} | |
| Choose a distinguished triangle | |
| $$ | |
| C \to Rb_*\Omega^\bullet_{X'/S} \oplus i_*\Omega^\bullet_{Z/S} | |
| \to i_*Rp_*\Omega^\bullet_{E/S} \to C[1] | |
| $$ | |
| in $D(X, f^{-1}\mathcal{O}_S)$. It suffices to show that | |
| $\Omega^\bullet_{X/S}$ is isomorphic to $C$ in a manner compatible | |
| with the canonical maps. By the axioms of triangulated categories | |
| there exists a map of distinguished triangles | |
| $$ | |
| \xymatrix{ | |
| C' \ar[r] \ar[d] & | |
| b_*\Omega^\bullet_{X'/S} \oplus i_*\Omega^\bullet_{Z/S} \ar[r] \ar[d] & | |
| i_*p_*\Omega^\bullet_{E/S} \ar[r] \ar[d] & | |
| C'[1] \ar[d] \\ | |
| C \ar[r] & | |
| Rb_*\Omega^\bullet_{X'/S} \oplus i_*\Omega^\bullet_{Z/S} \ar[r] & | |
| i_*Rp_*\Omega^\bullet_{E/S} \ar[r] & | |
| C[1] | |
| } | |
| $$ | |
| By Lemma \ref{lemma-comparison-general} part (3) and | |
| Derived Categories, Proposition \ref{derived-proposition-9} we conclude that | |
| $C' \to C$ is an isomorphism. By Lemma \ref{lemma-comparison-general} part (2) | |
| the map $i_*\Omega^\bullet_{Z/S} \to i_*p_*\Omega^\bullet_{E/S}$ | |
| is an isomorphism. Thus $C' = b_*\Omega^\bullet_{X'/S}$ | |
| in the derived category. Finally we use Lemma \ref{lemma-comparison-general} | |
| part (1) tells us this is equal to $\Omega^\bullet_{X/S}$. | |
| We omit the verification this is compatible with the canonical maps. | |
| \end{proof} | |
| \begin{proposition} | |
| \label{proposition-blowup-split} | |
| With notation as in Lemma \ref{lemma-blowup} the map | |
| $\Omega^\bullet_{X/S} \to Rb_*\Omega^\bullet_{X'/S}$ | |
| has a splitting in $D(X, (X \to S)^{-1}\mathcal{O}_S)$. | |
| \end{proposition} | |
| \begin{proof} | |
| Consider the triangle constructed in | |
| Lemma \ref{lemma-distinguished-triangle-blowup}. | |
| We claim that the map | |
| $$ | |
| Rb_*(\Omega^\bullet_{X'/S}) \oplus i_*\Omega^\bullet_{Z/S} \to | |
| i_*Rp_*(\Omega^\bullet_{E/S}) | |
| $$ | |
| has a splitting whose image contains the summand $i_*\Omega^\bullet_{Z/S}$. | |
| By Derived Categories, Lemma \ref{derived-lemma-split} this will show that | |
| the first arrow of the triangle has a splitting which vanishes on | |
| the summand $i_*\Omega^\bullet_{Z/S}$ which proves the lemma. | |
| We will prove the claim by decomposing $Rp_*\Omega^\bullet_{E/S}$ | |
| into a direct sum where the first piece corresponds to | |
| $\Omega^\bullet_{Z/S}$ and the second piece can be lifted | |
| through $Rb_*\Omega^\bullet_{X'/S}$. | |
| \medskip\noindent | |
| Proof of the claim. We may decompose $X$ into open and closed subschemes | |
| having fixed relative dimension to $S$, see | |
| Morphisms, Lemma \ref{morphisms-lemma-smooth-omega-finite-locally-free}. | |
| Since the derived category $D(X, f^{-1}\mathcal{O})_S)$ correspondingly | |
| decomposes as a product of categories, we may assume $X$ has | |
| fixed relative dimension $N$ over $S$. We may decompose | |
| $Z = \coprod Z_m$ into open and closed subschemes of relative | |
| dimension $m \geq 0$ over $S$. The restriction $i_m : Z_m \to X$ of | |
| $i$ to $Z_m$ is a regular immersion of codimension $N - m$, see Divisors, Lemma | |
| \ref{divisors-lemma-immersion-smooth-into-smooth-regular-immersion}. | |
| Let $E = \coprod E_m$ be the corresponding decomposition, i.e., | |
| we set $E_m = p^{-1}(Z_m)$. If $p_m : E_m \to Z_m$ denotes the | |
| restriction of $p$ to $E_m$, then we have a canonical isomorphism | |
| $$ | |
| \tilde \xi_m : | |
| \bigoplus\nolimits_{t = 0, \ldots, N - m - 1} | |
| \Omega^\bullet_{Z_m/S}[-2t] | |
| \longrightarrow | |
| Rp_{m, *}\Omega^\bullet_{E_m/S} | |
| $$ | |
| in $D(Z_m, (Z_m \to S)^{-1}\mathcal{O}_S)$ | |
| where in degree $0$ we have the canonical map | |
| $\Omega^\bullet_{Z_m/S} \to Rp_{m, *}\Omega^\bullet_{E_m/S}$. | |
| See Remark \ref{remark-projective-space-bundle-formula}. | |
| Thus we have an isomorphism | |
| $$ | |
| \tilde \xi : | |
| \bigoplus\nolimits_m | |
| \bigoplus\nolimits_{t = 0, \ldots, N - m - 1} | |
| \Omega^\bullet_{Z_m/S}[-2t] | |
| \longrightarrow | |
| Rp_*(\Omega^\bullet_{E/S}) | |
| $$ | |
| in $D(Z, (Z \to S)^{-1}\mathcal{O}_S)$ | |
| whose restriction to the summand | |
| $\Omega^\bullet_{Z/S} = \bigoplus \Omega^\bullet_{Z_m/S}$ of the source | |
| is the canonical map $\Omega^\bullet_{Z/S} \to Rp_*(\Omega^\bullet_{E/S})$. | |
| Consider the subcomplexes $M_m$ and $K_m$ of the complex | |
| $\bigoplus\nolimits_{t = 0, \ldots, N - m - 1} \Omega^\bullet_{Z_m/S}[-2t]$ | |
| introduced in Remark \ref{remark-projective-space-bundle-formula}. | |
| We set | |
| $$ | |
| M = \bigoplus M_m | |
| \quad\text{and}\quad | |
| K = \bigoplus K_m | |
| $$ | |
| We have $M = K[-2]$ and by construction the map | |
| $$ | |
| c_{E/Z} \oplus \tilde \xi|_M : | |
| \Omega^\bullet_{Z/S} \oplus M | |
| \longrightarrow | |
| Rp_*(\Omega^\bullet_{E/S}) | |
| $$ | |
| is an isomorphism (see remark referenced above). | |
| \medskip\noindent | |
| Consider the map | |
| $$ | |
| \delta : \Omega^\bullet_{E/S}[-2] \longrightarrow \Omega^\bullet_{X'/S} | |
| $$ | |
| in $D(X', (X' \to S)^{-1}\mathcal{O}_S)$ of | |
| Lemma \ref{lemma-gysin-via-log-complex} | |
| with the property that the composition | |
| $$ | |
| \Omega^\bullet_{E/S}[-2] \longrightarrow \Omega^\bullet_{X'/S} | |
| \longrightarrow | |
| \Omega^\bullet_{E/S} | |
| $$ | |
| is the map $\theta'$ of Remark \ref{remark-cup-product-as-a-map} for | |
| $c_1^{dR}(\mathcal{O}_{X'}(-E))|_E) = c_1^{dR}(\mathcal{O}_E(1))$. | |
| The final assertion of Remark \ref{remark-projective-space-bundle-formula} | |
| tells us that the diagram | |
| $$ | |
| \xymatrix{ | |
| K[-2] \ar[d]_{(\tilde \xi|_K)[-2]} \ar[r]_{\text{id}} & | |
| M \ar[d]^{\tilde x|_M} \\ | |
| Rp_*\Omega^\bullet_{E/S}[-2] \ar[r]^-{Rp_*\theta'} & | |
| Rp_*\Omega^\bullet_{E/S} | |
| } | |
| $$ | |
| commutes. Thus we see that we can obtain the desired splitting of | |
| the claim as the map | |
| \begin{align*} | |
| Rp_*(\Omega^\bullet_{E/S}) | |
| & \xrightarrow{(c_{E/Z} \oplus \tilde \xi|_M)^{-1}} | |
| \Omega^\bullet_{Z/S} \oplus M \\ | |
| & \xrightarrow{\text{id} \oplus \text{id}^{-1}} | |
| \Omega^\bullet_{Z/S} \oplus K[-2] \\ | |
| & \xrightarrow{\text{id} \oplus (\tilde \xi|_K)[-2]} | |
| \Omega^\bullet_{Z/S} \oplus Rp_*\Omega^\bullet_{E/S}[-2] \\ | |
| & \xrightarrow{\text{id} \oplus Rb_*\delta} | |
| \Omega^\bullet_{Z/S} \oplus Rb_*\Omega^\bullet_{X'/S} | |
| \end{align*} | |
| The relationship between $\theta'$ and $\delta$ stated above | |
| together with the commutative diagram involving $\theta'$, $\tilde \xi|_K$, | |
| and $\tilde \xi|_M$ above are exactly what's needed to | |
| show that this is a section to the canonical map | |
| $\Omega^\bullet_{Z/S} \oplus Rb_*(\Omega^\bullet_{X'/S}) \to | |
| Rp_*(\Omega^\bullet_{E/S})$ and the proof of the claim is complete. | |
| \end{proof} | |
| \noindent | |
| Lemma \ref{lemma-splitting-on-omega-a} | |
| shows that producing the splitting on Hodge | |
| cohomology is a good deal easier than the result of | |
| Proposition \ref{proposition-blowup-split}. | |
| We urge the reader to skip ahead to the next section. | |
| \begin{lemma} | |
| \label{lemma-ext-zero} | |
| Let $i : Z \to X$ be a closed immersion of schemes which is regular of | |
| codimension $c$. Then $\Ext^q_{\mathcal{O}_X}(i_*\mathcal{F}, \mathcal{E}) = 0$ | |
| for $q < c$ for $\mathcal{E}$ locally free on $X$ and $\mathcal{F}$ | |
| any $\mathcal{O}_Z$-module. | |
| \end{lemma} | |
| \begin{proof} | |
| By the local to global spectral sequence of $\Ext$ it suffices | |
| to prove this affine locally on $X$. See | |
| Cohomology, Section \ref{cohomology-section-ext}. | |
| Thus we may assume $X = \Spec(A)$ | |
| and there exists a regular sequence $f_1, \ldots, f_c$ in $A$ | |
| such that $Z = \Spec(A/(f_1, \ldots, f_c))$. We may assume $c \geq 1$. | |
| Then we see that $f_1 : \mathcal{E} \to \mathcal{E}$ | |
| is injective. Since $i_*\mathcal{F}$ is annihilated by $f_1$ | |
| this shows that the lemma holds for $i = 0$ and that we have | |
| a surjection | |
| $$ | |
| \Ext^{q - 1}_{\mathcal{O}_X}(i_*\mathcal{F}, \mathcal{E}/f_1\mathcal{E}) | |
| \longrightarrow | |
| \Ext^q_{\mathcal{O}_X}(i_*\mathcal{F}, \mathcal{E}) | |
| $$ | |
| Thus it suffices to show that the source of this arrow is zero. | |
| Next we repeat this argument: if $c \geq 2$ the map | |
| $f_2 : \mathcal{E}/f_1\mathcal{E} \to \mathcal{E}/f_1\mathcal{E}$ | |
| is injective. Since $i_*\mathcal{F}$ is annihilated by $f_2$ | |
| this shows that the lemma holds for $q = 1$ and that we have a | |
| surjection | |
| $$ | |
| \Ext^{q - 2}_{\mathcal{O}_X}(i_*\mathcal{F}, | |
| \mathcal{E}/f_1\mathcal{E} + f_2\mathcal{E}) | |
| \longrightarrow | |
| \Ext^{q - 1}_{\mathcal{O}_X}(i_*\mathcal{F}, \mathcal{E}/f_1\mathcal{E}) | |
| $$ | |
| Continuing in this fashion the lemma is proved. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-splitting-on-omega-a} | |
| With notation as in Lemma \ref{lemma-blowup} for $a \geq 0$ | |
| there is a unique arrow | |
| $Rb_*\Omega^a_{X'/S} \to \Omega^a_{X/S}$ in $D(\mathcal{O}_X)$ | |
| whose composition with $\Omega^a_{X/S} \to Rb_*\Omega^a_{X'/S}$ | |
| is the identity on $\Omega^a_{X/S}$. | |
| \end{lemma} | |
| \begin{proof} | |
| We may decompose $X$ into open and closed subschemes | |
| having fixed relative dimension to $S$, see | |
| Morphisms, Lemma \ref{morphisms-lemma-smooth-omega-finite-locally-free}. | |
| Since the derived category $D(X, f^{-1}\mathcal{O})_S)$ correspondingly | |
| decomposes as a product of categories, we may assume $X$ has | |
| fixed relative dimension $N$ over $S$. We may decompose | |
| $Z = \coprod Z_m$ into open and closed subschemes of relative | |
| dimension $m \geq 0$ over $S$. The restriction $i_m : Z_m \to X$ of | |
| $i$ to $Z_m$ is a regular immersion of codimension $N - m$, see Divisors, Lemma | |
| \ref{divisors-lemma-immersion-smooth-into-smooth-regular-immersion}. | |
| Let $E = \coprod E_m$ be the corresponding decomposition, i.e., | |
| we set $E_m = p^{-1}(Z_m)$. We claim that there are natural maps | |
| $$ | |
| b^*\Omega^a_{X/S} \to \Omega^a_{X'/S} \to | |
| b^*\Omega^a_{X/S} \otimes_{\mathcal{O}_{X'}} | |
| \mathcal{O}_{X'}(\sum (N - m - 1)E_m) | |
| $$ | |
| whose composition is induced by the inclusion | |
| $\mathcal{O}_{X'} \to \mathcal{O}_{X'}(\sum (N - m - 1)E_m)$. | |
| Namely, in order to prove this, it suffices to show that the | |
| cokernel of the first arrow is locally on $X'$ annihilated by | |
| a local equation of the effective Cartier divisor $\sum (N - m - 1)E_m$. | |
| To see this in turn we can work \'etale locally on $X$ as in the | |
| proof of Lemma \ref{lemma-comparison-general} and apply | |
| Lemma \ref{lemma-comparison-bis}. | |
| Computing \'etale locally using Lemma \ref{lemma-blowup-twist-same-cohomology} | |
| we see that the induced composition | |
| $$ | |
| \Omega^a_{X/S} \to Rb_*\Omega^a_{X'/S} \to | |
| Rb_*\left(b^*\Omega^a_{X/S} \otimes_{\mathcal{O}_{X'}} | |
| \mathcal{O}_{X'}(\sum (N - m - 1)E_m)\right) | |
| $$ | |
| is an isomorphism in $D(\mathcal{O}_X)$ | |
| which is how we obtain the existence of the map in the lemma. | |
| \medskip\noindent | |
| For uniqueness, it suffices to show that there are no nonzero maps from | |
| $\tau_{\geq 1}Rb_*\Omega_{X'/S}$ to $\Omega^a_{X/S}$ in $D(\mathcal{O}_X)$. | |
| For this it suffices in turn to show that there are no nonzero maps | |
| from $R^qb_*\Omega_{X'/s}[-q]$ to $\Omega^a_{X/S}$ in $D(\mathcal{O}_X)$ | |
| for $q \geq 1$ (details omitted). By | |
| Lemma \ref{lemma-comparison-general} | |
| we see that $R^qb_*\Omega_{X'/s} \cong i_*R^qp_*\Omega^a_{E/S}$ | |
| is the pushforward of a module on $Z = \coprod Z_m$. | |
| Moreover, observe that the restriction of $R^qp_*\Omega^a_{E/S}$ | |
| to $Z_m$ is nonzero only for $q < N - m$. Namely, the fibres of | |
| $E_m \to Z_m$ have dimension $N - m - 1$ and we can apply Limits, Lemma | |
| \ref{limits-lemma-higher-direct-images-zero-above-dimension-fibre}. | |
| Thus the desired vanishing follows from Lemma \ref{lemma-ext-zero}. | |
| \end{proof} | |
| \section{Comparing sheaves of differential forms} | |
| \label{section-quasi-finite-syntomic} | |
| \noindent | |
| The goal of this section is to compare the sheaves | |
| $\Omega^p_{X/\mathbf{Z}}$ and $\Omega^p_{Y/\mathbf{Z}}$ | |
| when given a locally quasi-finite syntomic morphism of schemes $f : Y \to X$. | |
| The result will be applied in Section \ref{section-trace} | |
| to the construction of the trace map on de Rham complexes if $f$ is finite. | |
| \begin{lemma} | |
| \label{lemma-funny-map} | |
| Let $R$ be a ring and consider a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| 0 \ar[r] & | |
| K^0 \ar[r] & | |
| L^0 \ar[r] & | |
| M^0 \ar[r] & 0 \\ | |
| & & L^{-1} \ar[u]_\partial \ar@{=}[r] & | |
| M^{-1} \ar[u] | |
| } | |
| $$ | |
| of $R$-modules with exact top row and $M^0$ and $M^{-1}$ | |
| finite free of the same rank. Then there are canonical maps | |
| $$ | |
| \wedge^i(H^0(L^\bullet)) \longrightarrow \wedge^i(K^0) \otimes_R \det(M^\bullet) | |
| $$ | |
| whose composition with $\wedge^i(K^0) \to \wedge^i(H^0(L^\bullet))$ | |
| is equal to multiplication with $\delta(M^\bullet)$. | |
| \end{lemma} | |
| \begin{proof} | |
| Say $M^0$ and $M^{-1}$ are free of rank $n$. For every $i \geq 0$ | |
| there is a canonical surjection | |
| $$ | |
| \pi_i : | |
| \wedge^{n + i}(L^0) | |
| \longrightarrow | |
| \wedge^i(K^0) \otimes \wedge^n(M^0) | |
| $$ | |
| whose kernel is the submodule generated by wedges | |
| $l_1 \wedge \ldots \wedge l_{n + i}$ such that $> i$ of the | |
| $l_j$ are in $K^0$. On the other hand, the exact sequence | |
| $$ | |
| L^{-1} \to L^0 \to H^0(L^\bullet) \to 0 | |
| $$ | |
| similarly produces canonical maps | |
| $$ | |
| \wedge^i(H^0(L^\bullet)) \otimes \wedge^n(L^{-1}) | |
| \longrightarrow | |
| \wedge^{n + i}(L^0) | |
| $$ | |
| by sending $\eta \otimes \theta$ to $\tilde \eta \wedge \partial(\theta)$ | |
| where $\tilde \eta \in \wedge^i(L^0)$ is a lift of $\eta$. | |
| The composition of these two maps, combined with the identification | |
| $\wedge^n(L^{-1}) = \wedge^n(M^{-1})$ gives a map | |
| $$ | |
| \wedge^i(H^0(L^\bullet)) \otimes \wedge^n(M^{-1}) | |
| \longrightarrow | |
| \wedge^i(K^0) \otimes \wedge^n(M^0) | |
| $$ | |
| Since $\det(M^\bullet) = \wedge^n(M^0) \otimes | |
| (\wedge^n(M^{-1}))^{\otimes -1}$ this produces a map as | |
| in the statement of the lemma. | |
| If $\eta$ is the image of $\omega \in \wedge^i(K^0)$, then we see | |
| that $\theta \otimes \eta$ is mapped to | |
| $\pi_i(\omega \wedge \partial(\theta)) = \omega \otimes \overline{\theta}$ in | |
| $\wedge^i(K^0) \otimes \wedge^n(M^0)$ where $\overline{\theta}$ | |
| is the image of $\theta$ in $\wedge^n(M^0)$. Since | |
| $\delta(M^\bullet)$ is simply the determinant of the map | |
| $M^{-1} \to M^0$ this proves the last statement. | |
| \end{proof} | |
| \begin{remark} | |
| \label{remark-local-description} | |
| Let $A$ be a ring. Let $P = A[x_1, \ldots, x_n]$. Let | |
| $f_1, \ldots, f_n \in P$ and set $B = P/(f_1, \ldots, f_n)$. | |
| Assume $A \to B$ is quasi-finite. Then | |
| $B$ is a relative global complete intersection over $A$ (Algebra, Definition | |
| \ref{algebra-definition-relative-global-complete-intersection}) and | |
| $(f_1, \ldots, f_n)/(f_1, \ldots, f_n)^2$ is free with generators | |
| the classes $\overline{f}_i$ by Algebra, Lemma | |
| \ref{algebra-lemma-relative-global-complete-intersection-conormal}. | |
| Consider the following diagram | |
| $$ | |
| \xymatrix{ | |
| \Omega_{A/\mathbf{Z}} \otimes_A B \ar[r] & | |
| \Omega_{P/\mathbf{Z}} \otimes_P B \ar[r] & | |
| \Omega_{P/A} \otimes_P B \\ | |
| & | |
| (f_1, \ldots, f_n)/(f_1, \ldots, f_n)^2 \ar[u] \ar@{=}[r] & | |
| (f_1, \ldots, f_n)/(f_1, \ldots, f_n)^2 \ar[u] | |
| } | |
| $$ | |
| The right column represents $\NL_{B/A}$ in $D(B)$ hence has cohomology | |
| $\Omega_{B/A}$ in degree $0$. The top row is the split short exact sequence | |
| $0 \to \Omega_{A/\mathbf{Z}} \otimes_A B \to | |
| \Omega_{P/\mathbf{Z}} \otimes_P B \to \Omega_{P/A} \otimes_P B \to 0$. | |
| The middle column has cohomology $\Omega_{B/\mathbf{Z}}$ in degree $0$ | |
| by Algebra, Lemma \ref{algebra-lemma-differential-seq}. | |
| Thus by Lemma \ref{lemma-funny-map} we obtain canonical $B$-module maps | |
| $$ | |
| \Omega^p_{B/\mathbf{Z}} \longrightarrow | |
| \Omega^p_{A/\mathbf{Z}} \otimes_A \det(\NL_{B/A}) | |
| $$ | |
| whose composition with | |
| $\Omega^p_{A/\mathbf{Z}} \to \Omega^p_{B/\mathbf{Z}}$ | |
| is multiplication by $\delta(\NL_{B/A})$. | |
| \end{remark} | |
| \begin{lemma} | |
| \label{lemma-Garel-upstairs} | |
| There exists a unique rule that to every locally quasi-finite syntomic | |
| morphism of schemes $f : Y \to X$ assigns $\mathcal{O}_Y$-module maps | |
| $$ | |
| c^p_{Y/X} : | |
| \Omega^p_{Y/\mathbf{Z}} | |
| \longrightarrow | |
| f^*\Omega^p_{X/\mathbf{Z}} \otimes_{\mathcal{O}_Y} \det(\NL_{Y/X}) | |
| $$ | |
| satisfying the following two properties | |
| \begin{enumerate} | |
| \item the composition with | |
| $f^*\Omega^p_{X/\mathbf{Z}} \to \Omega^p_{Y/\mathbf{Z}}$ | |
| is multiplication by $\delta(\NL_{Y/X})$, and | |
| \item the rule is compatible with restriction to opens and with | |
| base change. | |
| \end{enumerate} | |
| \end{lemma} | |
| \begin{proof} | |
| This proof is very similar to the proof of | |
| Discriminants, Proposition \ref{discriminant-proposition-tate-map} | |
| and we suggest the reader look at that proof first. | |
| We fix $p \geq 0$ throughout the proof. | |
| \medskip\noindent | |
| Let us reformulate the statement. Consider the category | |
| $\mathcal{C}$ whose objects, denoted $Y/X$, are locally quasi-finite syntomic | |
| morphism $f : Y \to X$ of schemes and whose morphisms | |
| $b/a : Y'/X' \to Y/X$ are commutative diagrams | |
| $$ | |
| \xymatrix{ | |
| Y' \ar[d]_{f'} \ar[r]_b & Y \ar[d]^f \\ | |
| X' \ar[r]^a & X | |
| } | |
| $$ | |
| which induce an isomorphism of $Y'$ with an open subscheme of | |
| $X' \times_X Y$. The lemma means that for every object | |
| $Y/X$ of $\mathcal{C}$ we have maps $c^p_{Y/X}$ with property (1) | |
| and for every morphism $b/a : Y'/X' \to Y/X$ of $\mathcal{C}$ we have | |
| $b^*c^p_{Y/X} = c^p_{Y'/X'}$ via the identifications | |
| $b^*\det(\NL_{Y/X}) = \det(\NL_{Y'/X'})$ | |
| (Discriminants, Section \ref{discriminant-section-tate-map}) | |
| and $b^*\Omega^p_{Y/X} = \Omega^p_{Y'/X'}$ | |
| (Lemma \ref{lemma-base-change-de-rham}). | |
| \medskip\noindent | |
| Given $Y/X$ in $\mathcal{C}$ and $y \in Y$ we can find | |
| an affine open $V \subset Y$ and $U \subset X$ with $f(V) \subset U$ | |
| such that there exists some maps | |
| $$ | |
| \Omega^p_{Y/\mathbf{Z}}|_V | |
| \longrightarrow | |
| \left( | |
| f^*\Omega^p_{X/\mathbf{Z}} \otimes_{\mathcal{O}_Y} \det(\NL_{Y/X}) | |
| \right)|_V | |
| $$ | |
| with property (1). This follows | |
| from picking affine opens as in | |
| Discriminants, Lemma \ref{discriminant-lemma-syntomic-quasi-finite} part (5) | |
| and Remark \ref{remark-local-description}. | |
| If $\Omega^p_{X/\mathbf{Z}}$ is finite locally free and | |
| annihilator of the section $\delta(\NL_{Y/X})$ is zero, then | |
| these local maps are unique and automatically glue! | |
| \medskip\noindent | |
| Let $\mathcal{C}_{nice} \subset \mathcal{C}$ denote the full subcategory | |
| of $Y/X$ such that | |
| \begin{enumerate} | |
| \item $X$ is of finite type over $\mathbf{Z}$, | |
| \item $\Omega_{X/\mathbf{Z}}$ is locally free, and | |
| \item the annihilator of $\delta(\NL_{Y/X})$ is zero. | |
| \end{enumerate} | |
| By the remarks in the previous paragraph, we see that for any | |
| object $Y/X$ of $\mathcal{C}_{nice}$ we have a unique map | |
| $c^p_{Y/X}$ satisfying condition (1). If $b/a : Y'/X' \to Y/X$ | |
| is a morphism of $\mathcal{C}_{nice}$, then | |
| $b^*c^p_{Y/X}$ is equal to $c^p_{Y'/X'}$ because | |
| $b^*\delta(\NL_{Y/X}) = \delta(\NL_{Y'/X'})$ (see | |
| Discriminants, Section \ref{discriminant-section-tate-map}). | |
| In other words, we have solved the problem | |
| on the full subcategory $\mathcal{C}_{nice}$. For $Y/X$ in $\mathcal{C}_{nice}$ | |
| we continue to denote $c^p_{Y/X}$ the solution we've just found. | |
| \medskip\noindent | |
| Consider morphisms | |
| $$ | |
| Y_1/X_1 \xleftarrow{b_1/a_1} Y/X \xrightarrow{b_2/a_2} Y_2/X_2 | |
| $$ | |
| in $\mathcal{C}$ such that $Y_1/X_1$ and $Y_2/X_2$ are objects | |
| of $\mathcal{C}_{nice}$. | |
| {\bf Claim.} $b_1^*c^p_{Y_1/X_1} = b_2^*c^p_{Y_2/X_2}$. | |
| We will first show that the claim implies the lemma | |
| and then we will prove the claim. | |
| \medskip\noindent | |
| Let $d, n \geq 1$ and consider the locally | |
| quasi-finite syntomic morphism $Y_{n, d} \to X_{n, d}$ | |
| constructed in Discriminants, Example | |
| \ref{discriminant-example-universal-quasi-finite-syntomic}. | |
| Then $Y_{n, d}$ and $Y_{n, d}$ are irreducible schemes of finite type and | |
| smooth over $\mathbf{Z}$. Namely, $X_{n, d}$ is a spectrum of a | |
| polynomial ring over $\mathbf{Z}$ and $Y_{n, d}$ is an open subscheme | |
| of such. The morphism $Y_{n, d} \to X_{n, d}$ is locally quasi-finite syntomic | |
| and \'etale over a dense open, see Discriminants, Lemma | |
| \ref{discriminant-lemma-universal-quasi-finite-syntomic-etale}. | |
| Thus $\delta(\NL_{Y_{n, d}/X_{n, d}})$ is nonzero: for example we have | |
| the local description of $\delta(\NL_{Y/X})$ in | |
| Discriminants, Remark \ref{discriminant-remark-local-description-delta} | |
| and we have the local description of \'etale morphisms in | |
| Morphisms, Lemma \ref{morphisms-lemma-etale-at-point} part (8). | |
| Now a nonzero section of an invertible module over an irreducible | |
| regular scheme has vanishing annihilator. Thus | |
| $Y_{n, d}/X_{n, d}$ is an object of $\mathcal{C}_{nice}$. | |
| \medskip\noindent | |
| Let $Y/X$ be an arbitrary object of $\mathcal{C}$. Let $y \in Y$. | |
| By Discriminants, Lemma \ref{discriminant-lemma-locally-comes-from-universal} | |
| we can find $n, d \geq 1$ and morphisms | |
| $$ | |
| Y/X \leftarrow V/U \xrightarrow{b/a} Y_{n, d}/X_{n, d} | |
| $$ | |
| of $\mathcal{C}$ such that $V \subset Y$ and $U \subset X$ are open. | |
| Thus we can pullback the canonical morphism $c^p_{Y_{n, d}/X_{n, d}}$ | |
| constructed above by $b$ to $V$. The claim guarantees these local | |
| isomorphisms glue! Thus we get a well defined global maps | |
| $c^p_{Y/X}$ with property (1). | |
| If $b/a : Y'/X' \to Y/X$ is a morphism of $\mathcal{C}$, then | |
| the claim also implies that the similarly constructed map | |
| $c^p_{Y'/X'}$ is the pullback by $b$ of the locally constructed | |
| map $c^p_{Y/X}$. Thus it remains to prove the claim. | |
| \medskip\noindent | |
| In the rest of the proof we prove the claim. We may pick a point | |
| $y \in Y$ and prove the maps agree in an open neighbourhood of $y$. | |
| Thus we may replace $Y_1$, $Y_2$ by open neighbourhoods of the | |
| image of $y$ in $Y_1$ and $Y_2$. Thus we may assume | |
| $Y, X, Y_1, X_1, Y_2, X_2$ are affine. | |
| We may write $X = \lim X_\lambda$ as a cofiltered limit of affine | |
| schemes of finite type over $X_1 \times X_2$. For each $\lambda$ | |
| we get | |
| $$ | |
| Y_1 \times_{X_1} X_\lambda | |
| \quad\text{and}\quad | |
| X_\lambda \times_{X_2} Y_2 | |
| $$ | |
| If we take limits we obtain | |
| $$ | |
| \lim Y_1 \times_{X_1} X_\lambda = | |
| Y_1 \times_{X_1} X \supset Y \subset | |
| X \times_{X_2} Y_2 = \lim X_\lambda \times_{X_2} Y_2 | |
| $$ | |
| By Limits, Lemma \ref{limits-lemma-descend-opens} | |
| we can find a $\lambda$ and opens | |
| $V_{1, \lambda} \subset Y_1 \times_{X_1} X_\lambda$ and | |
| $V_{2, \lambda} \subset X_\lambda \times_{X_2} Y_2$ | |
| whose base change to $X$ recovers $Y$ (on both sides). | |
| After increasing $\lambda$ we may assume | |
| there is an isomorphism | |
| $V_{1, \lambda} \to V_{2, \lambda}$ whose base change to $X$ is the | |
| identity on $Y$, see | |
| Limits, Lemma \ref{limits-lemma-descend-finite-presentation}. | |
| Then we have the commutative diagram | |
| $$ | |
| \xymatrix{ | |
| & Y/X \ar[d] \ar[ld]_{b_1/a_1} \ar[rd]^{b_2/a_2} \\ | |
| Y_1/X_1 & V_{1, \lambda}/X_\lambda \ar[l] \ar[r] & Y_2/X_2 | |
| } | |
| $$ | |
| Thus it suffices to prove the claim for the lower row | |
| of the diagram and we reduce to the case discussed in the | |
| next paragraph. | |
| \medskip\noindent | |
| Assume $Y, X, Y_1, X_1, Y_2, X_2$ are affine of finite type over $\mathbf{Z}$. | |
| Write $X = \Spec(A)$, $X_i = \Spec(A_i)$. The ring map $A_1 \to A$ corresponding | |
| to $X \to X_1$ is of finite type and hence we may choose a surjection | |
| $A_1[x_1, \ldots, x_n] \to A$. Similarly, we may choose a surjection | |
| $A_2[y_1, \ldots, y_m] \to A$. Set $X'_1 = \Spec(A_1[x_1, \ldots, x_n])$ | |
| and $X'_2 = \Spec(A_2[y_1, \ldots, y_m])$. Observe that | |
| $\Omega_{X'_1/\mathbf{Z}}$ is the direct sum of the pullback of | |
| $\Omega_{X_1/\mathbf{Z}}$ and a finite free module. | |
| Similarly for $X'_2$. Set $Y'_1 = Y_1 \times_{X_1} X'_1$ and | |
| $Y'_2 = Y_2 \times_{X_2} X'_2$. We get the following diagram | |
| $$ | |
| Y_1/X_1 \leftarrow | |
| Y'_1/X'_1 \leftarrow | |
| Y/X | |
| \rightarrow Y'_2/X'_2 | |
| \rightarrow Y_2/X_2 | |
| $$ | |
| Since $X'_1 \to X_1$ and $X'_2 \to X_2$ are flat, the same is true | |
| for $Y'_1 \to Y_1$ and $Y'_2 \to Y_2$. It follows easily that the | |
| annihilators of $\delta(\NL_{Y'_1/X'_1})$ and $\delta(\NL_{Y'_2/X'_2})$ | |
| are zero. | |
| Hence $Y'_1/X'_1$ and $Y'_2/X'_2$ are in $\mathcal{C}_{nice}$. | |
| Thus the outer morphisms in the displayed diagram are morphisms | |
| of $\mathcal{C}_{nice}$ for which we know the desired compatibilities. | |
| Thus it suffices to prove the claim for | |
| $Y'_1/X'_1 \leftarrow Y/X \rightarrow Y'_2/X'_2$. This reduces us | |
| to the case discussed in the next paragraph. | |
| \medskip\noindent | |
| Assume $Y, X, Y_1, X_1, Y_2, X_2$ are affine of finite type over | |
| $\mathbf{Z}$ and $X \to X_1$ and $X \to X_2$ are closed immersions. | |
| Consider the open embeddings | |
| $Y_1 \times_{X_1} X \supset Y \subset X \times_{X_2} Y_2$. | |
| There is an open neighbourhood $V \subset Y$ of $y$ which is a | |
| standard open of both $Y_1 \times_{X_1} X$ and $X \times_{X_2} Y_2$. | |
| This follows from Schemes, Lemma \ref{schemes-lemma-standard-open-two-affines} | |
| applied to the scheme obtained by glueing $Y_1 \times_{X_1} X$ and | |
| $X \times_{X_2} Y_2$ along $Y$; details omitted. | |
| Since $X \times_{X_2} Y_2$ is a closed subscheme of $Y_2$ | |
| we can find a standard open $V_2 \subset Y_2$ such that | |
| $V_2 \times_{X_2} X = V$. Similarly, we can find a standard open | |
| $V_1 \subset Y_1$ such that $V_1 \times_{X_1} X = V$. | |
| After replacing $Y, Y_1, Y_2$ by $V, V_1, V_2$ we reduce to the | |
| case discussed in the next paragraph. | |
| \medskip\noindent | |
| Assume $Y, X, Y_1, X_1, Y_2, X_2$ are affine of finite type over | |
| $\mathbf{Z}$ and $X \to X_1$ and $X \to X_2$ are closed immersions | |
| and $Y_1 \times_{X_1} X = Y = X \times_{X_2} Y_2$. | |
| Write $X = \Spec(A)$, $X_i = \Spec(A_i)$, $Y = \Spec(B)$, | |
| $Y_i = \Spec(B_i)$. Then we can consider the affine schemes | |
| $$ | |
| X' = \Spec(A_1 \times_A A_2) = \Spec(A') | |
| \quad\text{and}\quad | |
| Y' = \Spec(B_1 \times_B B_2) = \Spec(B') | |
| $$ | |
| Observe that $X' = X_1 \amalg_X X_2$ and $Y' = Y_1 \amalg_Y Y_2$, see | |
| More on Morphisms, Lemma \ref{more-morphisms-lemma-basic-example-pushout}. | |
| By More on Algebra, Lemma \ref{more-algebra-lemma-fibre-product-finite-type} | |
| the rings $A'$ and $B'$ are of finite type over $\mathbf{Z}$. By | |
| More on Algebra, Lemma \ref{more-algebra-lemma-module-over-fibre-product} | |
| we have $B' \otimes_A A_1 = B_1$ and $B' \times_A A_2 = B_2$. | |
| In particular a fibre of $Y' \to X'$ over a point of | |
| $X' = X_1 \amalg_X X_2$ is always equal to either a fibre of $Y_1 \to X_1$ | |
| or a fibre of $Y_2 \to X_2$. By More on Algebra, Lemma | |
| \ref{more-algebra-lemma-flat-module-over-fibre-product} | |
| the ring map $A' \to B'$ is flat. Thus by Discriminants, Lemma | |
| \ref{discriminant-lemma-syntomic-quasi-finite} part (3) | |
| we conclude that $Y'/X'$ is an object of $\mathcal{C}$. | |
| Consider now the commutative diagram | |
| $$ | |
| \xymatrix{ | |
| & Y/X \ar[ld]_{b_1/a_1} \ar[rd]^{b_2/a_2} \\ | |
| Y_1/X_1 \ar[rd] & & Y_2/X_2 \ar[ld] \\ | |
| & Y'/X' | |
| } | |
| $$ | |
| Now we would be done if $Y'/X'$ is an object of $\mathcal{C}_{nice}$, | |
| but this is almost never the case. Namely, then pulling back $c^p_{Y'/X'}$ | |
| around the two sides of the square, we would obtain the desired conclusion. | |
| To get around the problem that $Y'/X'$ is not in $\mathcal{C}_{nice}$ | |
| we note the arguments above show that, after possibly shrinking all | |
| of the schemes $X, Y, X_1, Y_1, X_2, Y_2, X', Y'$ we can find some | |
| $n, d \geq 1$, and extend the diagram like so: | |
| $$ | |
| \xymatrix{ | |
| & Y/X \ar[ld]_{b_1/a_1} \ar[rd]^{b_2/a_2} \\ | |
| Y_1/X_1 \ar[rd] & & Y_2/X_2 \ar[ld] \\ | |
| & Y'/X' \ar[d] \\ | |
| & Y_{n, d}/X_{n, d} | |
| } | |
| $$ | |
| and then we can use the already given argument by pulling | |
| back from $c^p_{Y_{n, d}/X_{n, d}}$. This finishes the proof. | |
| \end{proof} | |
| \section{Trace maps on de Rham complexes} | |
| \label{section-trace} | |
| \noindent | |
| A reference for some of the material in this section is \cite{Garel}. | |
| Let $S$ be a scheme. Let $f : Y \to X$ be a finite locally free morphism | |
| of schemes over $S$. Then there is a trace map | |
| $\text{Trace}_f : f_*\mathcal{O}_Y \to \mathcal{O}_X$, see | |
| Discriminants, Section \ref{discriminant-section-discriminant}. | |
| In this situation a trace map on de Rham complexes is a map | |
| of complexes | |
| $$ | |
| \Theta_{Y/X} : f_*\Omega^\bullet_{Y/S} \longrightarrow \Omega^\bullet_{X/S} | |
| $$ | |
| such that $\Theta_{Y/X}$ is equal to $\text{Trace}_f$ in degree $0$ | |
| and satisfies | |
| $$ | |
| \Theta_{Y/X}(\omega \wedge \eta) = \omega \wedge \Theta_{Y/X}(\eta) | |
| $$ | |
| for local sections $\omega$ of $\Omega^\bullet_{X/S}$ and $\eta$ | |
| of $f_*\Omega^\bullet_{Y/S}$. It is not clear to us whether such a trace map | |
| $\Theta_{Y/X}$ exists for every finite locally free morphism $Y \to X$; | |
| please email | |
| \href{mailto:stacks.project@gmail.com}{stacks.project@gmail.com} | |
| if you have a counterexample or a proof. | |
| \begin{example} | |
| \label{example-no-trace} | |
| Here is an example where we do not have a trace map on de Rham complexes. | |
| For example, consider the $\mathbf{C}$-algebra $B = \mathbf{C}[x, y]$ with | |
| action of $G = \{\pm 1\}$ given by $x \mapsto -x$ and $y \mapsto -y$. | |
| The invariants $A = B^G$ form a normal domain of finite type over $\mathbf{C}$ | |
| generated by $x^2, xy, y^2$. We claim that for the inclusion $A \subset B$ | |
| there is no reasonable trace map | |
| $\Omega_{B/\mathbf{C}} \to \Omega_{A/\mathbf{C}}$ | |
| on $1$-forms. Namely, consider the element | |
| $\omega = x \text{d} y \in \Omega_{B/\mathbf{C}}$. | |
| Since $\omega$ is invariant under the action of $G$ if a ``reasonable'' | |
| trace map exists, then $2\omega$ should be in the image of | |
| $\Omega_{A/\mathbf{C}} \to \Omega_{B/\mathbf{C}}$. This is | |
| not the case: there is no way to write $2\omega$ as a linear | |
| combination of $\text{d}(x^2)$, $\text{d}(xy)$, and $\text{d}(y^2)$ | |
| even with coefficients in $B$. | |
| This example contradicts the main theorem in | |
| \cite{Zannier}. | |
| \end{example} | |
| \begin{lemma} | |
| \label{lemma-Garel} | |
| There exists a unique rule that to every finite syntomic | |
| morphism of schemes $f : Y \to X$ assigns $\mathcal{O}_X$-module maps | |
| $$ | |
| \Theta^p_{Y/X} : | |
| f_*\Omega^p_{Y/\mathbf{Z}} | |
| \longrightarrow | |
| \Omega^p_{X/\mathbf{Z}} | |
| $$ | |
| satisfying the following properties | |
| \begin{enumerate} | |
| \item the composition with | |
| $\Omega^p_{X/\mathbf{Z}} \otimes_{\mathcal{O}_X} f_*\mathcal{O}_Y | |
| \to f_*\Omega^p_{Y/\mathbf{Z}}$ is equal to | |
| $\text{id} \otimes \text{Trace}_f$ | |
| where $\text{Trace}_f : f_*\mathcal{O}_Y \to \mathcal{O}_X$ | |
| is the map from | |
| Discriminants, Section \ref{discriminant-section-discriminant}, | |
| \item the rule is compatible with base change. | |
| \end{enumerate} | |
| \end{lemma} | |
| \begin{proof} | |
| First, assume that $X$ is locally Noetherian. By | |
| Lemma \ref{lemma-Garel-upstairs} we have a canonical map | |
| $$ | |
| c^p_{Y/X} : \Omega_{Y/S}^p | |
| \longrightarrow | |
| f^*\Omega_{X/S}^p \otimes_{\mathcal{O}_Y} \det(\NL_{Y/X}) | |
| $$ | |
| By Discriminants, Proposition \ref{discriminant-proposition-tate-map} | |
| we have a canonical isomorphism | |
| $$ | |
| c_{Y/X} : \det(\NL_{Y/X}) \to \omega_{Y/X} | |
| $$ | |
| mapping $\delta(\NL_{Y/X})$ to $\tau_{Y/X}$. Combined these maps give | |
| $$ | |
| c^p_{Y/X} \otimes c_{Y/X} : | |
| \Omega_{Y/S}^p | |
| \longrightarrow | |
| f^*\Omega_{X/S}^p \otimes_{\mathcal{O}_Y} \omega_{Y/X} | |
| $$ | |
| By Discriminants, Section \ref{discriminant-section-finite-morphisms} | |
| this is the same thing as a map | |
| $$ | |
| \Theta_{Y/X}^p : | |
| f_*\Omega_{Y/S}^p | |
| \longrightarrow | |
| \Omega_{X/S}^p | |
| $$ | |
| Recall that the relationship between $c^p_{Y/X} \otimes c_{Y/X}$ | |
| and $\Theta_{Y/X}^p$ uses the evaluation map | |
| $f_*\omega_{Y/X} \to \mathcal{O}_X$ | |
| which sends $\tau_{Y/X}$ to $\text{Trace}_f(1)$, see | |
| Discriminants, Section \ref{discriminant-section-finite-morphisms}. | |
| Hence property (1) holds. Property (2) holds for base changes by | |
| $X' \to X$ with $X'$ locally Noetherian because both $c^p_{Y/X}$ and | |
| $c_{Y/X}$ are compatible with such base changes. For $f : Y \to X$ | |
| finite syntomic and $X$ locally Noetherian, | |
| we will continue to denote $\Theta^p_{Y/X}$ the solution we've just found. | |
| \medskip\noindent | |
| Uniqueness. Suppose that we have a finite syntomic morphism | |
| $f: Y \to X$ such that $X$ is smooth over $\Spec(\mathbf{Z})$ | |
| and $f$ is \'etale over a dense open of $X$. We claim that | |
| in this case $\Theta^p_{Y/X}$ is uniquely determined by property (1). | |
| Namely, consider the maps | |
| $$ | |
| \Omega^p_{X/\mathbf{Z}} \otimes_{\mathcal{O}_X} f_*\mathcal{O}_Y \to | |
| f_*\Omega^p_{Y/\mathbf{Z}} \to | |
| \Omega^p_{X/\mathbf{Z}} | |
| $$ | |
| The sheaf $\Omega^p_{X/\mathbf{Z}}$ is torsion free (by the assumed | |
| smoothness), hence it suffices to check that the restriction of | |
| $\Theta^p_{Y/X}$ is uniquely determined over the dense open over | |
| which $f$ is \'etale, i.e., we may assume $f$ is \'etale. | |
| However, if $f$ is \'etale, then | |
| $f^*\Omega_{X/\mathbf{Z}} = \Omega_{Y/\mathbf{Z}}$ | |
| hence the first arrow in the displayed equation is an isomorphism. | |
| Since we've pinned down the composition, this guarantees uniqueness. | |
| \medskip\noindent | |
| Let $f : Y \to X$ be a finite syntomic morphism of locally Noetherian schemes. | |
| Let $x \in X$. By Discriminants, Lemma | |
| \ref{discriminant-lemma-locally-comes-from-universal-finite} | |
| we can find $d \geq 1$ and a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| Y \ar[d] & | |
| V \ar[d] \ar[l] \ar[r] & | |
| V_d \ar[d] \\ | |
| X & | |
| U \ar[l] \ar[r] & | |
| U_d | |
| } | |
| $$ | |
| such that $x \in U \subset X$ is open, $V = f^{-1}(U)$ | |
| and $V = U \times_{U_d} V_d$. Thus $\Theta^p_{Y/X}|_V$ | |
| is the pullback of the map $\Theta^p_{V_d/U_d}$. | |
| However, by the discussion on uniqueness above and | |
| Discriminants, Lemmas | |
| \ref{discriminant-lemma-universal-finite-syntomic-smooth} and | |
| \ref{discriminant-lemma-universal-finite-syntomic-etale} | |
| the map $\Theta^p_{V_d/U_d}$ is uniquely determined | |
| by the requirement (1). Hence uniqueness holds. | |
| \medskip\noindent | |
| At this point we know that we have existence and uniqueness | |
| for all finite syntomic morphisms $Y \to X$ with $X$ locally Noetherian. | |
| We could now give an argument similar to the proof of | |
| Lemma \ref{lemma-Garel-upstairs} to extend to general $X$. | |
| However, instead it possible to directly use absolute Noetherian approximation | |
| to finish the proof. Namely, to construct $\Theta^p_{Y/X}$ | |
| it suffices to do so Zariski locally on $X$ (provided we also | |
| show the uniqueness). Hence we may assume $X$ is affine (small | |
| detail omitted). Then we can write $X = \lim_{i \in I} X_i$ | |
| as the limit over a directed set $I$ of Noetherian affine schemes. | |
| By Algebra, Lemma \ref{algebra-lemma-colimit-category-fp-algebras} | |
| we can find $0 \in I$ and a finitely | |
| presented morphism of affines $f_0 : Y_0 \to X_0$ whose base change to | |
| $X$ is $Y \to X$. After increasing $0$ we may assume $Y_0 \to X_0$ | |
| is finite and syntomic, see | |
| Algebra, Lemma \ref{algebra-lemma-colimit-lci} and | |
| \ref{algebra-lemma-colimit-finite}. For $i \geq 0$ also the | |
| base change $f_i : Y_i = Y_0 \times_{X_0} X_i \to X_i$ is finite syntomic. | |
| Then | |
| $$ | |
| \Gamma(X, f_*\Omega^p_{Y/\mathbf{Z}}) = | |
| \Gamma(Y, \Omega^p_{Y/\mathbf{Z}}) = | |
| \colim_{i \geq 0} \Gamma(Y_i, \Omega^p_{Y_i/\mathbf{Z}}) = | |
| \colim_{i \geq 0} \Gamma(X_i, f_{i, *}\Omega^p_{Y_i/\mathbf{Z}}) | |
| $$ | |
| Hence we can (and are forced to) define $\Theta^p_{Y/X}$ as the colimit | |
| of the maps $\Theta^p_{Y_i/X_i}$. This map is compatible with any | |
| cartesian diagram | |
| $$ | |
| \xymatrix{ | |
| Y' \ar[r] \ar[d] & Y \ar[d] \\ | |
| X' \ar[r] & X | |
| } | |
| $$ | |
| with $X'$ affine as we know this for the case of Noetherian affine schemes | |
| by the arguments given above (small detail omitted; hint: if we also | |
| write $X' = \lim_{j \in J} X'_j$ then for every $i \in I$ there is a $j \in J$ | |
| and a morphism $X'_j \to X_i$ compatible with the morphism $X' \to X$). | |
| This finishes the proof. | |
| \end{proof} | |
| \begin{proposition} | |
| \label{proposition-Garel} | |
| \begin{reference} | |
| \cite{Garel} | |
| \end{reference} | |
| Let $f : Y \to X$ be a finite syntomic morphism of schemes. | |
| The maps $\Theta^p_{Y/X}$ of Lemma \ref{lemma-Garel} define a map of complexes | |
| $$ | |
| \Theta_{Y/X} : | |
| f_*\Omega^\bullet_{Y/\mathbf{Z}} | |
| \longrightarrow | |
| \Omega^\bullet_{X/\mathbf{Z}} | |
| $$ | |
| with the following properties | |
| \begin{enumerate} | |
| \item in degree $0$ we get | |
| $\text{Trace}_f : f_*\mathcal{O}_Y \to \mathcal{O}_X$, see | |
| Discriminants, Section \ref{discriminant-section-discriminant}, | |
| \item we have | |
| $\Theta_{Y/X}(\omega \wedge \eta) = \omega \wedge \Theta_{Y/X}(\eta)$ | |
| for $\omega$ in $\Omega^\bullet_{X/\mathbf{Z}}$ and $\eta$ | |
| in $f_*\Omega^\bullet_{Y/\mathbf{Z}}$, | |
| \item if $f$ is a morphism over a base scheme $S$, then | |
| $\Theta_{Y/X}$ induces a map of complexes | |
| $f_*\Omega^\bullet_{Y/S} \to \Omega^\bullet_{X/S}$. | |
| \end{enumerate} | |
| \end{proposition} | |
| \begin{proof} | |
| By Discriminants, Lemma | |
| \ref{discriminant-lemma-locally-comes-from-universal-finite} | |
| for every $x \in X$ we can find $d \geq 1$ and a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| Y \ar[d] & | |
| V \ar[d] \ar[l] \ar[r] & | |
| V_d \ar[d] \ar[r] & | |
| Y_d = \Spec(B_d) \ar[d] \\ | |
| X & | |
| U \ar[l] \ar[r] & | |
| U_d \ar[r] & | |
| X_d = \Spec(A_d) | |
| } | |
| $$ | |
| such that $x \in U \subset X$ is affine open, $V = f^{-1}(U)$ | |
| and $V = U \times_{U_d} V_d$. Write $U = \Spec(A)$ and $V = \Spec(B)$ | |
| and observe that $B = A \otimes_{A_d} B_d$ and recall that | |
| $B_d = A_d e_1 \oplus \ldots \oplus A_d e_d$. Suppose we have | |
| $a_1, \ldots, a_r \in A$ and $b_1, \ldots, b_s \in B$. | |
| We may write $b_j = \sum a_{j, l} e_d$ with $a_{j, l} \in A$. | |
| Set $N = r + sd$ and consider the factorizations | |
| $$ | |
| \xymatrix{ | |
| V \ar[r] \ar[d] & | |
| V' = \mathbf{A}^N \times V_d \ar[r] \ar[d] & | |
| V_d \ar[d] \\ | |
| U \ar[r]& | |
| U' = \mathbf{A}^N \times U_d \ar[r] & | |
| U_d | |
| } | |
| $$ | |
| Here the horizontal lower right arrow is given by the morphism | |
| $U \to U_d$ (from the earlier diagram) and the morphism | |
| $U \to \mathbf{A}^N$ given by $a_1, \ldots, a_r, a_{1, 1}, \ldots, a_{s, d}$. | |
| Then we see that the functions $a_1, \ldots, a_r$ are in the image of | |
| $\Gamma(U', \mathcal{O}_{U'}) \to \Gamma(U, \mathcal{O}_U)$ | |
| and the functions $b_1, \ldots, b_s$ are in the image of | |
| $\Gamma(V', \mathcal{O}_{V'}) \to \Gamma(V, \mathcal{O}_V)$. | |
| In this way we see that for any finite collection of elements\footnote{After | |
| all these elements will be finite sums of elements of the form | |
| $a_0 \text{d}a_1 \wedge \ldots \wedge \text{d}a_i$ with | |
| $a_0, \ldots, a_i \in A$ or finite sums of elements of the form | |
| $b_0 \text{d}b_1 \wedge \ldots \wedge \text{d}b_j$ with | |
| $b_0, \ldots, b_j \in B$.} of the groups | |
| $$ | |
| \Gamma(V, \Omega^i_{Y/\mathbf{Z}}),\quad i = 0, 1, 2, \ldots | |
| \quad\text{and}\quad | |
| \Gamma(U, \Omega^j_{X/\mathbf{Z}}),\quad j = 0, 1, 2, \ldots | |
| $$ | |
| we can find a factorizations $V \to V' \to V_d$ and | |
| $U \to U' \to U_d$ with $V' = \mathbf{A}^N \times V_d$ and | |
| $U' = \mathbf{A}^N \times U_d$ as above | |
| such that these sections are the pullbacks of sections from | |
| $$ | |
| \Gamma(V', \Omega^i_{V'/\mathbf{Z}}),\quad i = 0, 1, 2, \ldots | |
| \quad\text{and}\quad | |
| \Gamma(U', \Omega^j_{U'/\mathbf{Z}}),\quad j = 0, 1, 2, \ldots | |
| $$ | |
| The upshot of this is that to check | |
| $\text{d} \circ \Theta_{Y/X} = \Theta_{Y/X} \circ \text{d}$ | |
| it suffices to check this is true for $\Theta_{V'/U'}$. | |
| Similarly, for property (2) of the lemma. | |
| \medskip\noindent | |
| By Discriminants, Lemmas | |
| \ref{discriminant-lemma-universal-finite-syntomic-smooth} and | |
| \ref{discriminant-lemma-universal-finite-syntomic-etale} | |
| the scheme $U_d$ is smooth and the morphism $V_d \to U_d$ | |
| is \'etale over a dense open of $U_d$. | |
| Hence the same is true for the morphism | |
| $V' \to U'$. Since $\Omega_{U'/\mathbf{Z}}$ is locally free and hence | |
| $\Omega^p_{U'/\mathbf{Z}}$ is torsion | |
| free, it suffices to check the desired relations | |
| after restricting to the open over which $V'$ is finite \'etale. | |
| Then we may check the relations after a surjective \'etale | |
| base change. Hence we may split the finite \'etale cover | |
| and assume we are looking at a morphism of the form | |
| $$ | |
| \coprod\nolimits_{i = 1, \ldots, d} W \longrightarrow W | |
| $$ | |
| with $W$ smooth over $\mathbf{Z}$. | |
| In this case any local properties of our construction are trivial to check | |
| (provided they are true). This finishes the proof of (1) and (2). | |
| \medskip\noindent | |
| Finally, we observe that (3) follows from (2) because $\Omega_{Y/S}$ | |
| is the quotient of $\Omega_{Y/\mathbf{Z}}$ by the submodule | |
| generated by pullbacks of local sections of $\Omega_{S/\mathbf{Z}}$. | |
| \end{proof} | |
| \begin{example} | |
| \label{example-Garel} | |
| Let $A$ be a ring. Let $f = x^d + \sum_{0 \leq i < d} a_{d - i} x^i \in A[x]$. | |
| Let $B = A[x]/(f)$. By Proposition \ref{proposition-Garel} | |
| we have a morphism of complexes | |
| $$ | |
| \Theta_{B/A} : \Omega^\bullet_B \longrightarrow \Omega^\bullet_A | |
| $$ | |
| In particular, if $t \in B$ denotes the image of $x \in A[x]$ | |
| we can consider the elements | |
| $$ | |
| \Theta_{B/A}(t^i\text{d}t) \in \Omega^1_A,\quad i = 0, \ldots, d - 1 | |
| $$ | |
| What are these elements? By the same principle as used in the proof of | |
| Proposition \ref{proposition-Garel} it suffices to compute this | |
| in the universal case, i.e., when $A = \mathbf{Z}[a_1, \ldots, a_d]$ | |
| or even when $A$ is replaced by the fraction field | |
| $\mathbf{Q}(a_1, \ldots, a_d)$. Writing symbolically | |
| $$ | |
| f = \prod\nolimits_{i = 1, \ldots, d} (x - \alpha_i) | |
| $$ | |
| we see that over $\mathbf{Q}(\alpha_1, \ldots, \alpha_d)$ | |
| the algebra $B$ becomes split: | |
| $$ | |
| \mathbf{Q}(a_0, \ldots, a_{d - 1})[x]/(f) | |
| \longrightarrow | |
| \prod\nolimits_{i = 1, \ldots, d} \mathbf{Q}(\alpha_1, \ldots, \alpha_d), | |
| \quad | |
| t \longmapsto (\alpha_1, \ldots, \alpha_d) | |
| $$ | |
| Thus for example | |
| $$ | |
| \Theta(\text{d}t) = \sum \text{d} \alpha_i = - \text{d}a_1 | |
| $$ | |
| Next, we have | |
| $$ | |
| \Theta(t\text{d}t) = \sum \alpha_i \text{d}\alpha_i = | |
| a_1 \text{d} a_1 - \text{d}a_2 | |
| $$ | |
| Next, we have | |
| $$ | |
| \Theta(t^2\text{d}t) = \sum \alpha_i^2 \text{d}\alpha_i = | |
| - a_1^2 \text{d} a_1 + a_1 \text{d}a_2 + a_2 \text{d}a_1 - \text{d}a_3 | |
| $$ | |
| (modulo calculation error), and so on. This suggests that | |
| if $f(x) = x^d - a$ then | |
| $$ | |
| \Theta_{B/A}(t^i\text{d}t) = | |
| \left\{ | |
| \begin{matrix} | |
| 0 & \text{if} & i = 0, \ldots, d - 2 \\ | |
| \text{d}a & \text{if} & i = d - 1 | |
| \end{matrix} | |
| \right. | |
| $$ | |
| in $\Omega_A$. This is true for in this particular case one can do | |
| the calculation for the extension $\mathbf{Q}(a)[x]/(x^d - a)$ | |
| to verify this directly. | |
| \end{example} | |
| \begin{lemma} | |
| \label{lemma-Garel-map-frobenius-smooth-char-p} | |
| Let $p$ be a prime number. Let $X \to S$ be a smooth morphism | |
| of relative dimension $d$ of schemes in characteristic $p$. | |
| The relative Frobenius $F_{X/S} : X \to X^{(p)}$ of $X/S$ | |
| (Varieties, Definition \ref{varieties-definition-relative-frobenius}) | |
| is finite syntomic and the corresponding map | |
| $$ | |
| \Theta_{X/X^{(p)}} : | |
| F_{X/S, *}\Omega^\bullet_{X/S} \to \Omega^\bullet_{X^{(p)}/S} | |
| $$ | |
| is zero in all degrees except in degree $d$ where it defines a | |
| surjection. | |
| \end{lemma} | |
| \begin{proof} | |
| Observe that $F_{X/S}$ is a finite morphism by | |
| Varieties, Lemma \ref{varieties-lemma-relative-frobenius-finite}. | |
| To prove that $F_{X/S}$ is flat, it suffices to show that | |
| the morphism $F_{X/S, s} : X_s \to X^{(p)}_s$ between fibres | |
| is flat for all $s \in S$, see More on Morphisms, Theorem | |
| \ref{more-morphisms-theorem-criterion-flatness-fibre}. | |
| Flatness of $X_s \to X^{(p)}_s$ follows from | |
| Algebra, Lemma \ref{algebra-lemma-CM-over-regular-flat} | |
| (and the finiteness already shown). | |
| By More on Morphisms, Lemma | |
| \ref{more-morphisms-lemma-lci-permanence} | |
| the morphism $F_{X/S}$ is a local complete intersection morphism. | |
| Hence $F_{X/S}$ is finite syntomic (see | |
| More on Morphisms, Lemma \ref{more-morphisms-lemma-flat-lci}). | |
| \medskip\noindent | |
| For every point $x \in X$ we may choose a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| X \ar[d] & U \ar[l] \ar[d]_\pi \\ | |
| S & \mathbf{A}^d_S \ar[l] | |
| } | |
| $$ | |
| where $\pi$ is \'etale and $x \in U$ is open in $X$, see | |
| Morphisms, Lemma \ref{morphisms-lemma-smooth-etale-over-affine-space}. | |
| Observe that | |
| $\mathbf{A}^d_S \to \mathbf{A}^d_S$, $(x_1, \ldots, x_d) \mapsto | |
| (x_1^p, \ldots, x_d^p)$ is the relative Frobenius for $\mathcal{A}^d_S$ | |
| over $S$. The commutative diagram | |
| $$ | |
| \xymatrix{ | |
| U \ar[d]_\pi \ar[r]_{F_{X/S}} & U^{(p)} \ar[d]^{\pi^{(p)}} \\ | |
| \mathbf{A}^d_S \ar[r]^{x_i \mapsto x_i^p} & \mathbf{A}^d_S | |
| } | |
| $$ | |
| of | |
| Varieties, Lemma \ref{varieties-lemma-relative-frobenius-endomorphism-identity} | |
| for $\pi : U \to \mathbf{A}^d_S$ is cartesian by | |
| \'Etale Morphisms, Lemma | |
| \ref{etale-lemma-relative-frobenius-etale}. | |
| Since the construction of $\Theta$ is compatible with base change | |
| and since $\Omega_{U/S} = \pi^*\Omega_{\mathbf{A}^d_S/S}$ | |
| (Lemma \ref{lemma-etale}) | |
| we conclude that it suffices to show the lemma for | |
| $\mathbf{A}^d_S$. | |
| \medskip\noindent | |
| Let $A$ be a ring of characteristic $p$. Consider the unique $A$-algebra | |
| homomorphism $A[y_1, \ldots, y_d] \to A[x_1, \ldots, x_d]$ | |
| sending $y_i$ to $x_i^p$. The arguments above | |
| reduce us to computing the map | |
| $$ | |
| \Theta^i : \Omega^i_{A[x_1, \ldots, x_d]/A} \to | |
| \Omega^i_{A[y_1, \ldots, y_d]/A} | |
| $$ | |
| We urge the reader to do the computation in this case for themselves. | |
| As in Example \ref{example-Garel} we may reduce this to computing | |
| a formula for $\Theta^i$ in the universal case | |
| $$ | |
| \mathbf{Z}[y_1, \ldots, y_d] \to \mathbf{Z}[x_1, \ldots, x_d],\quad | |
| y_i \mapsto x_i^p | |
| $$ | |
| In turn, we can find the formula for $\Theta^i$ by computing in the complex | |
| case, i.e., for the $\mathbf{C}$-algebra map | |
| $$ | |
| \mathbf{C}[y_1, \ldots, y_d] \to \mathbf{C}[x_1, \ldots, x_d],\quad | |
| y_i \mapsto x_i^p | |
| $$ | |
| We may even invert $x_1, \ldots, x_d$ and $y_1, \ldots, y_d$. | |
| In this case, we have $\text{d}x_i = p^{-1} x_i^{- p + 1}\text{d}y_i$. | |
| Hence we see that | |
| \begin{align*} | |
| \Theta^i( | |
| x_1^{e_1} \ldots x_d^{e_d} \text{d}x_1 \wedge \ldots \wedge \text{d}x_i) | |
| & = | |
| p^{-i} \Theta^i( | |
| x_1^{e_1 - p + 1} \ldots x_i^{e_i - p + 1} x_{i + 1}^{e_{i + 1}} \ldots | |
| x_d^{e_d} \text{d}y_1 \wedge \ldots \wedge \text{d}y_i ) \\ | |
| & = | |
| p^{-i} \text{Trace}(x_1^{e_1 - p + 1} \ldots x_i^{e_i - p + 1} | |
| x_{i + 1}^{e_{i + 1}} \ldots x_d^{e_d}) | |
| \text{d}y_1 \wedge \ldots \wedge \text{d}y_i | |
| \end{align*} | |
| by the properties of $\Theta^i$. An elementary computation shows | |
| that the trace in the expression above is zero unless | |
| $e_1, \ldots, e_i$ are congruent to $-1$ modulo $p$ | |
| and $e_{i + 1}, \ldots, e_d$ are divisible by $p$. | |
| Moreover, in this case we obtain | |
| $$ | |
| p^{d - i} y_1^{(e_1 - p + 1)/p} \ldots y_i^{(e_i - p + 1)/p} | |
| y_{i + 1}^{e_{i + 1}/p} \ldots y_d^{e_d/p} | |
| \text{d}y_1 \wedge \ldots \wedge \text{d}y_i | |
| $$ | |
| We conclude that we get zero in characteristic $p$ unless $d = i$ | |
| and in this case we get every possible $d$-form. | |
| \end{proof} | |
| \section{Poincar\'e duality} | |
| \label{section-poincare-duality} | |
| \noindent | |
| In this section we prove Poincar'e duality for the de Rham cohomology | |
| of a proper smooth scheme over a field. Let us first explain how this | |
| works for Hodge cohomology. | |
| \begin{lemma} | |
| \label{lemma-duality-hodge} | |
| Let $k$ be a field. Let $X$ be a nonempty smooth proper scheme over $k$ | |
| equidimensional of dimension $d$. There exists a $k$-linear map | |
| $$ | |
| t : H^d(X, \Omega^d_{X/k}) \longrightarrow k | |
| $$ | |
| unique up to precomposing by multiplication by a unit of | |
| $H^0(X, \mathcal{O}_X)$ with the following property: for all $p, q$ the pairing | |
| $$ | |
| H^q(X, \Omega^p_{X/k}) \times H^{d - q}(X, \Omega^{d - p}_{X/k}) | |
| \longrightarrow | |
| k, \quad | |
| (\xi, \xi') \longmapsto t(\xi \cup \xi') | |
| $$ | |
| is perfect. | |
| \end{lemma} | |
| \begin{proof} | |
| By Duality for Schemes, Lemma \ref{duality-lemma-duality-proper-over-field} | |
| we have $\omega_X^\bullet = \Omega^d_{X/k}[d]$. | |
| Since $\Omega_{X/k}$ is locally free of rank $d$ | |
| (Morphisms, Lemma \ref{morphisms-lemma-smooth-omega-finite-locally-free}) | |
| we have | |
| $$ | |
| \Omega^d_{X/k} \otimes_{\mathcal{O}_X} (\Omega^p_{X/k})^\vee | |
| \cong | |
| \Omega^{d - p}_{X/k} | |
| $$ | |
| Thus we obtain a $k$-linear map $t : H^d(X, \Omega^d_{X/k}) \to k$ | |
| such that the statement is true by Duality for Schemes, Lemma | |
| \ref{duality-lemma-duality-proper-over-field-perfect}. | |
| In particular the pairing | |
| $H^0(X, \mathcal{O}_X) \times H^d(X, \Omega^d_{X/k}) \to k$ | |
| is perfect, which implies that any $k$-linear map | |
| $t' : H^d(X, \Omega^d_{X/k}) \to k$ is of the form | |
| $\xi \mapsto t(g\xi)$ for some $g \in H^0(X, \mathcal{O}_X)$. | |
| Of course, in order for $t'$ to still produce a duality | |
| between $H^0(X, \mathcal{O}_X)$ and $H^d(X, \Omega^d_{X/k})$ | |
| we need $g$ to be a unit. Denote $\langle -, - \rangle_{p, q}$ | |
| the pairing constructed using $t$ and denote $\langle -, - \rangle'_{p, q}$ | |
| the pairing constructed using $t'$. Clearly we have | |
| $$ | |
| \langle \xi, \xi' \rangle'_{p, q} = | |
| \langle g\xi, \xi' \rangle_{p, q} | |
| $$ | |
| for $\xi \in H^q(X, \Omega^p_{X/k})$ and | |
| $\xi' \in H^{d - q}(X, \Omega^{d - p}_{X/k})$. Since $g$ is a unit, i.e., | |
| invertible, we see that using $t'$ instead of $t$ we still get perfect | |
| pairings for all $p, q$. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-bottom-part-degenerates} | |
| Let $k$ be a field. Let $X$ be a smooth proper scheme over $k$. The map | |
| $$ | |
| \text{d} : H^0(X, \mathcal{O}_X) \to H^0(X, \Omega^1_{X/k}) | |
| $$ | |
| is zero. | |
| \end{lemma} | |
| \begin{proof} | |
| Since $X$ is smooth over $k$ it is geometrically reduced over $k$, see | |
| Varieties, Lemma \ref{varieties-lemma-smooth-geometrically-normal}. | |
| Hence $H^0(X, \mathcal{O}_X) = \prod k_i$ | |
| is a finite product of finite separable | |
| field extensions $k_i/k$, see Varieties, Lemma | |
| \ref{varieties-lemma-proper-geometrically-reduced-global-sections}. | |
| It follows that $\Omega_{H^0(X, \mathcal{O}_X)/k} = \prod \Omega_{k_i/k} = 0$ | |
| (see for example Algebra, Lemma | |
| \ref{algebra-lemma-characterize-separable-algebraic-field-extensions}). | |
| Since the map of the lemma factors as | |
| $$ | |
| H^0(X, \mathcal{O}_X) \to | |
| \Omega_{H^0(X, \mathcal{O}_X)/k} \to | |
| H^0(X, \Omega_{X/k}) | |
| $$ | |
| by functoriality of the de Rham complex | |
| (see Section \ref{section-de-rham-complex}), we conclude. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-top-part-degenerates} | |
| Let $k$ be a field. Let $X$ be a smooth proper scheme over $k$ | |
| equidimensional of dimension $d$. The map | |
| $$ | |
| \text{d} : H^d(X, \Omega^{d - 1}_{X/k}) \to H^d(X, \Omega^d_{X/k}) | |
| $$ | |
| is zero. | |
| \end{lemma} | |
| \begin{proof} | |
| It is tempting to think this follows from a combination of | |
| Lemmas \ref{lemma-bottom-part-degenerates} and \ref{lemma-duality-hodge}. | |
| However this doesn't work because the maps $\mathcal{O}_X \to \Omega^1_{X/k}$ | |
| and $\Omega^{d - 1}_{X/k} \to \Omega^d_{X/k}$ are not $\mathcal{O}_X$-linear | |
| and hence we cannot use the functoriality discussed in | |
| Duality for Schemes, Remark | |
| \ref{duality-remark-coherent-duality-proper-over-field} | |
| to conclude the map in Lemma \ref{lemma-bottom-part-degenerates} | |
| is dual to the one in this lemma. | |
| \medskip\noindent | |
| We may replace $X$ by a connected component of $X$. Hence we may assume | |
| $X$ is irreducible. By | |
| Varieties, Lemmas \ref{varieties-lemma-smooth-geometrically-normal} and | |
| \ref{varieties-lemma-proper-geometrically-reduced-global-sections} | |
| we see that $k' = H^0(X, \mathcal{O}_X)$ is a finite separable | |
| extension $k'/k$. Since $\Omega_{k'/k} = 0$ | |
| (see for example Algebra, Lemma | |
| \ref{algebra-lemma-characterize-separable-algebraic-field-extensions}) | |
| we see that $\Omega_{X/k} = \Omega_{X/k'}$ | |
| (see Morphisms, Lemma \ref{morphisms-lemma-triangle-differentials}). | |
| Thus we may replace $k$ by $k'$ and assume that $H^0(X, \mathcal{O}_X) = k$. | |
| \medskip\noindent | |
| Assume $H^0(X, \mathcal{O}_X) = k$. We conclude that | |
| $\dim H^d(X, \Omega^d_{X/k}) = 1$ by Lemma \ref{lemma-duality-hodge}. | |
| Assume first that the characteristic of $k$ is a prime number $p$. | |
| Denote $F_{X/k} : X \to X^{(p)}$ the relative Frobenius of $X$ over $k$; | |
| please keep in mind the facts proved about this morphism in | |
| Lemma \ref{lemma-Garel-map-frobenius-smooth-char-p}. | |
| Consider the commutative diagram | |
| $$ | |
| \xymatrix{ | |
| H^d(X, \Omega^{d - 1}_{X/k}) \ar[d] \ar[r] & | |
| H^d(X^{(p)}, F_{X/k, *}\Omega^{d - 1}_{X/k}) \ar[d] \ar[r]_{\Theta^{d - 1}} & | |
| H^d(X^{(p)}, \Omega^{d - 1}_{X^{(p)}/k}) \ar[d] \\ | |
| H^d(X, \Omega^d_{X/k}) \ar[r] & | |
| H^d(X^{(p)}, F_{X/k, *}\Omega^d_{X/k}) \ar[r]^{\Theta^d} & | |
| H^d(X^{(p)}, \Omega^d_{X^{(p)}/k}) | |
| } | |
| $$ | |
| The left two horizontal arrows are isomorphisms as $F_{X/k}$ is finite, see | |
| Cohomology of Schemes, Lemma \ref{coherent-lemma-relative-affine-cohomology}. | |
| The right square commutes as $\Theta_{X^{(p)}/X}$ is a morphism of | |
| complexes and $\Theta^{d - 1}$ is zero. Thus it suffices to show that | |
| $\Theta^d$ is nonzero (because the dimension of the source of the map | |
| $\Theta^d$ is $1$ by the discussion above). However, we know that | |
| $$ | |
| \Theta^d : F_{X/k, *}\Omega^d_{X/k} \to \Omega^d_{X^{(p)}/k} | |
| $$ | |
| is surjective and hence surjective after applying the right exact | |
| functor $H^d(X^{(p)}, -)$ (right exactness by the vanishing of cohomology | |
| beyond $d$ as follows from | |
| Cohomology, Proposition \ref{cohomology-proposition-vanishing-Noetherian}). | |
| Finally, $H^d(X^{(d)}, \Omega^d_{X^{(d)}/k})$ is nonzero for example because | |
| it is dual to $H^0(X^{(d)}, \mathcal{O}_{X^{(p)}})$ by | |
| Lemma \ref{lemma-duality-hodge} applied to $X^{(p)}$ over $k$. | |
| This finishes the proof in this case. | |
| \medskip\noindent | |
| Finally, assume the characteristic of $k$ is $0$. | |
| We can write $k$ as the filtered colimit of its finite type | |
| $\mathbf{Z}$-subalgebras $R$. For one of these we can find a | |
| cartesian diagram of schemes | |
| $$ | |
| \xymatrix{ | |
| X \ar[d] \ar[r] & Y \ar[d] \\ | |
| \Spec(k) \ar[r] & \Spec(R) | |
| } | |
| $$ | |
| such that $Y \to \Spec(R)$ is smooth of relative dimension $d$ and proper. | |
| See Limits, Lemmas \ref{limits-lemma-descend-finite-presentation}, | |
| \ref{limits-lemma-descend-smooth}, \ref{limits-lemma-descend-dimension-d}, and | |
| \ref{limits-lemma-eventually-proper}. | |
| The modules $M^{i, j} = H^j(Y, \Omega^i_{Y/R})$ are finite $R$-modules, see | |
| Cohomology of Schemes, Lemma | |
| \ref{coherent-lemma-proper-over-affine-cohomology-finite}. | |
| Thus after replacing $R$ by a localization we may assume all of these | |
| modules are finite free. We have | |
| $M^{i, j} \otimes_R k = H^j(X, \Omega^i_{X/k})$ | |
| by flat base change (Cohomology of Schemes, Lemma | |
| \ref{coherent-lemma-flat-base-change-cohomology}). | |
| Thus it suffices to show that $M^{d - 1, d} \to M^{d, d}$ | |
| is zero. This is a map of finite free modules over a domain, | |
| hence it suffices to find a dense set of primes $\mathfrak p \subset R$ | |
| such that after tensoring with $\kappa(\mathfrak p)$ we get zero. | |
| Since $R$ is of finite type over $\mathbf{Z}$, we can take | |
| the collection of primes $\mathfrak p$ whose residue field | |
| has positive characteristic (details omitted). Observe that | |
| $$ | |
| M^{d - 1, d} \otimes_R \kappa(\mathfrak p) = | |
| H^d(Y_{\kappa(\mathfrak p)}, | |
| \Omega^{d - 1}_{Y_{\kappa(\mathfrak p)}/\kappa(\mathfrak p)}) | |
| $$ | |
| for example by Limits, Lemma | |
| \ref{limits-lemma-higher-direct-images-zero-above-dimension-fibre}. | |
| Similarly for $M^{d, d}$. Thus we see that | |
| $M^{d - 1, d} \otimes_R \kappa(\mathfrak p) \to | |
| M^{d, d} \otimes_R \kappa(\mathfrak p)$ | |
| is zero by the case of positive characteristic handled above. | |
| \end{proof} | |
| \begin{proposition} | |
| \label{proposition-poincare-duality} | |
| Let $k$ be a field. Let $X$ be a nonempty smooth proper scheme over $k$ | |
| equidimensional of dimension $d$. There exists a $k$-linear map | |
| $$ | |
| t : H^{2d}_{dR}(X/k) \longrightarrow k | |
| $$ | |
| unique up to precomposing by multiplication by a unit of | |
| $H^0(X, \mathcal{O}_X)$ with the following property: for all $i$ the pairing | |
| $$ | |
| H^i_{dR}(X/k) \times H_{dR}^{2d - i}(X/k) | |
| \longrightarrow | |
| k, \quad | |
| (\xi, \xi') \longmapsto t(\xi \cup \xi') | |
| $$ | |
| is perfect. | |
| \end{proposition} | |
| \begin{proof} | |
| By the Hodge-to-de Rham spectral sequence | |
| (Section \ref{section-hodge-to-de-rham}), the vanishing | |
| of $\Omega^i_{X/k}$ for $i > d$, the vanishing in | |
| Cohomology, Proposition \ref{cohomology-proposition-vanishing-Noetherian} | |
| and the results of Lemmas \ref{lemma-bottom-part-degenerates} and | |
| \ref{lemma-top-part-degenerates} | |
| we see that $H^0_{dR}(X/k) = H^0(X, \mathcal{O}_X)$ | |
| and $H^d(X, \Omega^d_{X/k}) = H_{dR}^{2d}(X/k)$. | |
| More precisesly, these identifications come from the maps | |
| of complexes | |
| $$ | |
| \Omega^\bullet_{X/k} \to \mathcal{O}_X[0] | |
| \quad\text{and}\quad | |
| \Omega^d_{X/k}[-d] \to \Omega^\bullet_{X/k} | |
| $$ | |
| Let us choose $t : H_{dR}^{2d}(X/k) \to k$ which via this identification | |
| corresponds to a $t$ as in Lemma \ref{lemma-duality-hodge}. | |
| Then in any case we see that the pairing displayed in the lemma | |
| is perfect for $i = 0$. | |
| \medskip\noindent | |
| Denote $\underline{k}$ the constant sheaf with value $k$ on $X$. | |
| Let us abbreviate $\Omega^\bullet = \Omega^\bullet_{X/k}$. | |
| Consider the map (\ref{equation-wedge}) which in our situation reads | |
| $$ | |
| \wedge : | |
| \text{Tot}(\Omega^\bullet \otimes_{\underline{k}} \Omega^\bullet) | |
| \longrightarrow | |
| \Omega^\bullet | |
| $$ | |
| For every integer $p = 0, 1, \ldots, d$ this map | |
| annihilates the subcomplex | |
| $\text{Tot}(\sigma_{> p} \Omega^\bullet \otimes_{\underline{k}} | |
| \sigma_{\geq d - p} \Omega^\bullet)$ for degree reasons. | |
| Hence we find that the restriction of $\wedge$ to the subcomplex | |
| $\text{Tot}(\Omega^\bullet \otimes_{\underline{k}} | |
| \sigma_{\geq d - p}\Omega^\bullet)$ factors through a map of complexes | |
| $$ | |
| \gamma_p : | |
| \text{Tot}(\sigma_{\leq p} \Omega^\bullet \otimes_{\underline{k}} | |
| \sigma_{\geq d - p} \Omega^\bullet) | |
| \longrightarrow | |
| \Omega^\bullet | |
| $$ | |
| Using the same procedure as in Section \ref{section-cup-product} we obtain | |
| cup products | |
| $$ | |
| H^i(X, \sigma_{\leq p} \Omega^\bullet) \times | |
| H^{2d - i}(X, \sigma_{\geq d - p}\Omega^\bullet) | |
| \longrightarrow | |
| H_{dR}^{2d}(X, \Omega^\bullet) | |
| $$ | |
| We will prove by induction on $p$ that these cup products via $t$ | |
| induce perfect pairings between $H^i(X, \sigma_{\leq p} \Omega^\bullet)$ | |
| and $H^{2d - i}(X, \sigma_{\geq d - p}\Omega^\bullet)$. For $p = d$ | |
| this is the assertion of the proposition. | |
| \medskip\noindent | |
| The base case is $p = 0$. In this case we simply obtain the pairing | |
| between $H^i(X, \mathcal{O}_X)$ and $H^{d - i}(X, \Omega^d)$ of | |
| Lemma \ref{lemma-duality-hodge} and the result is true. | |
| \medskip\noindent | |
| Induction step. Say we know the result is true for $p$. Then | |
| we consider the distinguished triangle | |
| $$ | |
| \Omega^{p + 1}[-p - 1] \to | |
| \sigma_{\leq p + 1}\Omega^\bullet \to | |
| \sigma_{\leq p}\Omega^\bullet \to | |
| \Omega^{p + 1}[-p] | |
| $$ | |
| and the distinguished triangle | |
| $$ | |
| \sigma_{\geq d - p}\Omega^\bullet \to | |
| \sigma_{\geq d - p - 1}\Omega^\bullet \to | |
| \Omega^{d - p - 1}[-d + p + 1] \to | |
| (\sigma_{\geq d - p}\Omega^\bullet)[1] | |
| $$ | |
| Observe that both are distinguished triangles in the homotopy category | |
| of complexes of sheaves of $\underline{k}$-modules; in particular the | |
| maps $\sigma_{\leq p}\Omega^\bullet \to \Omega^{p + 1}[-p]$ and | |
| $\Omega^{d - p - 1}[-d + p + 1] \to (\sigma_{\geq d - p}\Omega^\bullet)[1]$ | |
| are given by actual maps of complexes, namely using the differential | |
| $\Omega^p \to \Omega^{p + 1}$ and the differential | |
| $\Omega^{d - p - 1} \to \Omega^{d - p}$. | |
| Consider the long exact cohomology sequences associated to these | |
| distinguished triangles | |
| $$ | |
| \xymatrix{ | |
| H^{i - 1}(X, \sigma_{\leq p}\Omega^\bullet) \ar[d]_a \\ | |
| H^i(X, \Omega^{p + 1}[-p - 1]) \ar[d]_b \\ | |
| H^i(X, \sigma_{\leq p + 1}\Omega^\bullet) \ar[d]_c \\ | |
| H^i(X, \sigma_{\leq p}\Omega^\bullet) \ar[d]_d \\ | |
| H^{i + 1}(X, \Omega^{p + 1}[-p - 1]) | |
| } | |
| \quad\quad | |
| \xymatrix{ | |
| H^{2d - i + 1}(X, \sigma_{\geq d - p}\Omega^\bullet) \\ | |
| H^{2d - i}(X, \Omega^{d - p - 1}[-d + p + 1]) \ar[u]_{a'} \\ | |
| H^{2d - i}(X, \sigma_{\geq d - p - 1}\Omega^\bullet) \ar[u]_{b'} \\ | |
| H^{2d - i}(X, \sigma_{\geq d - p}\Omega^\bullet) \ar[u]_{c'} \\ | |
| H^{2d - i - 1}(X, \Omega^{d - p - 1}[-d + p + 1]) \ar[u]_{d'} | |
| } | |
| $$ | |
| By induction and Lemma \ref{lemma-duality-hodge} | |
| we know that the pairings constructed above between the | |
| $k$-vectorspaces on the first, second, fourth, and fifth | |
| rows are perfect. By the $5$-lemma, in order to show that | |
| the pairing between the cohomology groups in the middle row | |
| is perfect, it suffices to show that the pairs | |
| $(a, a')$, $(b, b')$, $(c, c')$, and $(d, d')$ | |
| are compatible with the given pairings (see below). | |
| \medskip\noindent | |
| Let us prove this for the pair $(c, c')$. Here we observe simply | |
| that we have a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| \text{Tot}(\sigma_{\leq p} \Omega^\bullet \otimes_{\underline{k}} | |
| \sigma_{\geq d - p} \Omega^\bullet) \ar[d]_{\gamma_p} & | |
| \text{Tot}(\sigma_{\leq p + 1} \Omega^\bullet \otimes_{\underline{k}} | |
| \sigma_{\geq d - p} \Omega^\bullet) \ar[l] \ar[d] \\ | |
| \Omega^\bullet & | |
| \text{Tot}(\sigma_{\leq p + 1} \Omega^\bullet \otimes_{\underline{k}} | |
| \sigma_{\geq d - p - 1} \Omega^\bullet) \ar[l]_-{\gamma_{p + 1}} | |
| } | |
| $$ | |
| Hence if we have $\alpha \in H^i(X, \sigma_{\leq p + 1}\Omega^\bullet)$ | |
| and $\beta \in H^{2d - i}(X, \sigma_{\geq d - p}\Omega^\bullet)$ | |
| then we get | |
| $\gamma_p(\alpha \cup c'(\beta)) = \gamma_{p + 1}(c(\alpha) \cup \beta)$ | |
| by functoriality of the cup product. | |
| \medskip\noindent | |
| Similarly for the pair $(b, b')$ we use the commutative diagram | |
| $$ | |
| \xymatrix{ | |
| \text{Tot}(\sigma_{\leq p + 1} \Omega^\bullet \otimes_{\underline{k}} | |
| \sigma_{\geq d - p - 1} \Omega^\bullet) \ar[d]_{\gamma_{p + 1}} & | |
| \text{Tot}(\Omega^{p + 1}[-p - 1] \otimes_{\underline{k}} | |
| \sigma_{\geq d - p - 1} \Omega^\bullet) \ar[l] \ar[d] \\ | |
| \Omega^\bullet & | |
| \Omega^{p + 1}[-p - 1] | |
| \otimes_{\underline{k}} | |
| \Omega^{d - p - 1}[-d + p + 1] \ar[l]_-\wedge | |
| } | |
| $$ | |
| and argue in the same manner. | |
| \medskip\noindent | |
| For the pair $(d, d')$ we use the commutative diagram | |
| $$ | |
| \xymatrix{ | |
| \Omega^{p + 1}[-p] \otimes_{\underline{k}} | |
| \Omega^{d - p - 1}[-d + p] \ar[d] & | |
| \text{Tot}(\sigma_{\leq p}\Omega^\bullet \otimes_{\underline{k}} | |
| \Omega^{d - p - 1}[-d + p]) \ar[l] \ar[d] \\ | |
| \Omega^\bullet & | |
| \text{Tot}(\sigma_{\leq p}\Omega^\bullet \otimes_{\underline{k}} | |
| \sigma_{\geq d - p}\Omega^\bullet) \ar[l] | |
| } | |
| $$ | |
| and we look at cohomology classes in | |
| $H^i(X, \sigma_{\leq p}\Omega^\bullet)$ and | |
| $H^{2d - i}(X, \Omega^{d - p - 1}[-d + p])$. | |
| Changing $i$ to $i - 1$ we get the result for the pair $(a, a')$ | |
| thereby finishing the proof that our pairings are perfect. | |
| \medskip\noindent | |
| We omit the argument showing the uniqueness of $t$ up to | |
| precomposing by multiplication by a unit in $H^0(X, \mathcal{O}_X)$. | |
| \end{proof} | |
| \section{Chern classes} | |
| \label{section-chern-classes} | |
| \noindent | |
| The results proved so far suffice to use the discussion in | |
| Weil Cohomology Theories, Section \ref{weil-section-chern} | |
| to produce Chern classes in de Rham cohomology. | |
| \begin{lemma} | |
| \label{lemma-chern-classes} | |
| There is a unique rule which assigns to every quasi-compact and | |
| quasi-separated scheme $X$ a total Chern class | |
| $$ | |
| c^{dR} : | |
| K_0(\textit{Vect}(X)) | |
| \longrightarrow | |
| \prod\nolimits_{i \geq 0} H^{2i}_{dR}(X/\mathbf{Z}) | |
| $$ | |
| with the following properties | |
| \begin{enumerate} | |
| \item we have $c^{dR}(\alpha + \beta) = c^{dR}(\alpha) c^{dR}(\beta)$ | |
| for $\alpha, \beta \in K_0(\textit{Vect}(X))$, | |
| \item if $f : X \to X'$ is a morphism of quasi-compact and | |
| quasi-separated schemes, then $c^{dR}(f^*\alpha) = f^*c^{dR}(\alpha)$, | |
| \item given $\mathcal{L} \in \Pic(X)$ we have | |
| $c^{dR}([\mathcal{L}]) = 1 + c_1^{dR}(\mathcal{L})$ | |
| \end{enumerate} | |
| \end{lemma} | |
| \noindent | |
| The construction can easily be extended to all schemes, but to do so one needs | |
| to slightly upgrade the discussion in Weil Cohomology Theories, | |
| Section \ref{weil-section-chern}. | |
| \begin{proof} | |
| We will apply Weil Cohomology Theories, Proposition | |
| \ref{weil-proposition-chern-class} to get this. | |
| \medskip\noindent | |
| Let $\mathcal{C}$ be the category of all quasi-compact and quasi-separated | |
| schemes. This certainly satisfies conditions | |
| (1), (2), and (3) (a), (b), and (c) of Weil Cohomology Theories, | |
| Section \ref{weil-section-chern}. | |
| \medskip\noindent | |
| As our contravariant functor $A$ from $\mathcal{C}$ to the | |
| category of graded algebras will send $X$ to | |
| $A(X) = \bigoplus_{i \geq 0} H_{dR}^{2i}(X/\mathbf{Z})$ | |
| endowed with its cup product. | |
| Functoriality is discussed in Section \ref{section-de-rham-cohomology} | |
| and the cup product in Section \ref{section-cup-product}. | |
| For the additive maps $c_1^A$ we take $c_1^{dR}$ constructed | |
| in Section \ref{section-first-chern-class}. | |
| \medskip\noindent | |
| In fact, we obtain commutative algebras by | |
| Lemma \ref{lemma-cup-product-graded-commutative} | |
| which shows we have axiom (1) for $A$. | |
| \medskip\noindent | |
| To check axiom (2) for $A$ it suffices to check that | |
| $H^*_{dR}(X \coprod Y/\mathbf{Z}) = H^*_{dR}(X/\mathbf{Z}) \times | |
| H^*_{dR}(Y/\mathbf{Z})$. | |
| This is a consequence of the fact that de Rham cohomology | |
| is constructed by taking the cohomology of a sheaf of differential | |
| graded algebras (in the Zariski topology). | |
| \medskip\noindent | |
| Axiom (3) for $A$ is just the statement that taking first Chern | |
| classes of invertible modules is compatible with pullbacks. | |
| This follows from the more general Lemma \ref{lemma-pullback-c1}. | |
| \medskip\noindent | |
| Axiom (4) for $A$ is the projective space bundle formula which | |
| we proved in Proposition \ref{proposition-projective-space-bundle-formula}. | |
| \medskip\noindent | |
| Axiom (5). Let $X$ be a quasi-compact and quasi-separated scheme and | |
| let $\mathcal{E} \to \mathcal{F}$ be a surjection of finite locally free | |
| $\mathcal{O}_X$-modules of ranks $r + 1$ and $r$. Denote | |
| $i : P' = \mathbf{P}(\mathcal{F}) \to \mathbf{P}(\mathcal{E}) = P$ the | |
| corresponding incusion morphism. This is a morphism of smooth projective | |
| schemes over $X$ which exhibits $P'$ as an effective Cartier divisor on $P$. | |
| Thus by Lemma \ref{lemma-check-log-smooth} the complex of log poles | |
| for $P' \subset P$ over $\mathbf{Z}$ is defined. | |
| Hence for $a \in A(P)$ with $i^*a = 0$ we have | |
| $a \cup c_1^A(\mathcal{O}_P(P')) = 0$ by | |
| Lemma \ref{lemma-log-complex-consequence}. | |
| This finishes the proof. | |
| \end{proof} | |
| \begin{remark} | |
| \label{remark-splitting-principle} | |
| The analogues of Weil Cohomology Theories, Lemmas | |
| \ref{weil-lemma-splitting-principle} (splitting principle) and | |
| \ref{weil-lemma-chern-classes-E-tensor-L} (chern classes of tensor products) | |
| hold for de Rham Chern classes on quasi-compact and quasi-separated schemes. | |
| This is clear as we've shown in the proof of | |
| Lemma \ref{lemma-chern-classes} | |
| that all the axioms of Weil Cohomology Theories, Section | |
| \ref{weil-section-chern} are satisfied. | |
| \end{remark} | |
| \noindent | |
| Working with schemes over $\mathbf{Q}$ we can construct a Chern character. | |
| \begin{lemma} | |
| \label{lemma-chern-character} | |
| There is a unique rule which assigns to every quasi-compact and quasi-separated | |
| scheme $X$ over $\mathbf{Q}$ a ``chern character'' | |
| $$ | |
| ch^{dR} : K_0(\textit{Vect}(X)) \longrightarrow | |
| \prod\nolimits_{i \geq 0} H_{dR}^{2i}(X/\mathbf{Q}) | |
| $$ | |
| with the following properties | |
| \begin{enumerate} | |
| \item $ch^{dR}$ is a ring map for all $X$, | |
| \item if $f : X' \to X$ is a morphism of quasi-compact and quasi-separated | |
| schemes over $\mathbf{Q}$, then $f^* \circ ch^{dR} = ch^{dR} \circ f^*$, and | |
| \item given $\mathcal{L} \in \Pic(X)$ | |
| we have $ch^{dR}([\mathcal{L}]) = \exp(c_1^{dR}(\mathcal{L}))$. | |
| \end{enumerate} | |
| \end{lemma} | |
| \noindent | |
| The construction can easily be extended to all schemes over $\mathbf{Q}$, | |
| but to do so one needs to slightly upgrade the discussion in | |
| Weil Cohomology Theories, Section \ref{weil-section-chern}. | |
| \begin{proof} | |
| Exactly as in the proof of Lemma \ref{lemma-chern-classes} | |
| one shows that the category of quasi-compact and quasi-separated | |
| schemes over $\mathbf{Q}$ together with the functor | |
| $A^*(X) = \bigoplus_{i \geq 0} H_{dR}^{2i}(X/\mathbf{Q})$ | |
| satisfy the axioms of | |
| Weil Cohomology Theories, Section \ref{weil-section-chern}. | |
| Moreover, in this case $A(X)$ is a $\mathbf{Q}$-algebra for | |
| all $X$. Hence the lemma follows from | |
| Weil Cohomology Theories, Proposition | |
| \ref{weil-proposition-chern-character}. | |
| \end{proof} | |
| \section{A Weil cohomology theory} | |
| \label{section-weil} | |
| \noindent | |
| Let $k$ be a field of characteristic $0$. In this section we prove that | |
| the functor | |
| $$ | |
| X \longmapsto H^*_{dR}(X/k) | |
| $$ | |
| defines a Weil cohomology theory over $k$ with coefficients in $k$ as defined | |
| in Weil Cohomology Theories, Definition | |
| \ref{weil-definition-weil-cohomology-theory}. | |
| We will proceed by checking the constructions earlier in this | |
| chapter provide us with data (D0), (D1), and (D2') satisfying | |
| axioms (A1) -- (A9) of | |
| Weil Cohomology Theories, Section \ref{weil-section-c1}. | |
| \medskip\noindent | |
| Throughout the rest of this section we fix the field $k$ of characteristic | |
| $0$ and we set $F = k$. Next, we take the following data | |
| \begin{enumerate} | |
| \item[(D0)] For our $1$-dimensional $F$ vector space $F(1)$ we take | |
| $F(1) = F = k$. | |
| \item[(D1)] For our functor $H^*$ we take the functor sending | |
| a smooth projective scheme $X$ over $k$ to $H^*_{dR}(X/k)$. | |
| Functoriality is discussed in Section \ref{section-de-rham-cohomology} | |
| and the cup product in Section \ref{section-cup-product}. | |
| We obtain graded commutative $F$-algebras by | |
| Lemma \ref{lemma-cup-product-graded-commutative}. | |
| \item[(D2')] For the maps $c_1^H : \Pic(X) \to H^2(X)(1)$ we | |
| use the de Rham first Chern class introduced in | |
| Section \ref{section-first-chern-class}. | |
| \end{enumerate} | |
| We are going to show axioms (A1) -- (A9) hold. | |
| \medskip\noindent | |
| In this paragraph, we are going to reduce the checking of the | |
| axioms to the case where $k$ is algebraically closed by | |
| using Weil Cohomology Theories, Lemma \ref{weil-lemma-check-over-extension}. | |
| Denote $k'$ the algebraic closure of $k$. | |
| Set $F' = k'$. We obtain data (D0), (D1), (D2') over $k'$ with | |
| coefficient field $F'$ in exactly the same way as above. | |
| By Lemma \ref{lemma-proper-smooth-de-Rham} there are | |
| functorial isomorphisms | |
| $$ | |
| H_{dR}^{2d}(X/k) \otimes_k k' | |
| \longrightarrow | |
| H_{dR}^{2d}(X_{k'}/k') | |
| $$ | |
| for $X$ smooth and projective over $k$. Moreover, the diagrams | |
| $$ | |
| \xymatrix{ | |
| \Pic(X) \ar[r]_{c^{dR}_1} \ar[d] & H_{dR}^2(X/k) \ar[d] \\ | |
| \Pic(X_{k'}) \ar[r]^{c^{dR}_1} & H_{dR}^2(X_{k'}/k') | |
| } | |
| $$ | |
| commute by Lemma \ref{lemma-pullback-c1}. | |
| This finishes the proof of the reduction. | |
| \medskip\noindent | |
| Assume $k$ is algebraically closed field of characteristic zero. | |
| We will show axioms (A1) -- (A9) for the data (D0), (D1), and (D2') | |
| given above. | |
| \medskip\noindent | |
| Axiom (A1). Here we have to check that | |
| $H^*_{dR}(X \coprod Y/k) = H^*_{dR}(X/k) \times H^*_{dR}(Y/k)$. | |
| This is a consequence of the fact that de Rham cohomology | |
| is constructed by taking the cohomology of a sheaf of differential | |
| graded algebras (in the Zariski topology). | |
| \medskip\noindent | |
| Axiom (A2). This is just the statement that taking first Chern | |
| classes of invertible modules is compatible with pullbacks. | |
| This follows from the more general Lemma \ref{lemma-pullback-c1}. | |
| \medskip\noindent | |
| Axiom (A3). This follows from the more general | |
| Proposition \ref{proposition-projective-space-bundle-formula}. | |
| \medskip\noindent | |
| Axiom (A4). This follows from the more general | |
| Lemma \ref{lemma-log-complex-consequence}. | |
| \medskip\noindent | |
| Already at this point, using | |
| Weil Cohomology Theories, Lemmas \ref{weil-lemma-chern-classes} and | |
| \ref{weil-lemma-cycle-classes}, we obtain a Chern character and | |
| cycle class maps | |
| $$ | |
| \gamma : | |
| \CH^*(X) | |
| \longrightarrow | |
| \bigoplus\nolimits_{i \geq 0} H^{2i}_{dR}(X/k) | |
| $$ | |
| for $X$ smooth projective over $k$ which are graded ring homomorphisms | |
| compatible with pullbacks between morphisms $f : X \to Y$ | |
| of smooth projective schemes over $k$. | |
| \medskip\noindent | |
| Axiom (A5). We have $H_{dR}^*(\Spec(k)/k) = k = F$ in degree $0$. | |
| We have the K\"unneth formula for the product of two smooth projective | |
| $k$-schemes by Lemma \ref{lemma-kunneth-de-rham} (observe that the | |
| derived tensor products in the statement are harmless as we are | |
| tensoring over the field $k$). | |
| \medskip\noindent | |
| Axiom (A7). This follows from Proposition \ref{proposition-blowup-split}. | |
| \medskip\noindent | |
| Axiom (A8). Let $X$ be a smooth projective scheme over $k$. | |
| By the explanatory text to this axiom in | |
| Weil Cohomology Theories, Section \ref{weil-section-c1} | |
| we see that $k' = H^0(X, \mathcal{O}_X)$ is a finite | |
| separable $k$-algebra. It follows that $H_{dR}^*(\Spec(k')/k) = k'$ | |
| sitting in degree $0$ because $\Omega_{k'/k} = 0$. By | |
| Lemma \ref{lemma-bottom-part-degenerates} | |
| we also have $H_{dR}^0(X, \mathcal{O}_X) = k'$ and we get | |
| the axiom. | |
| \medskip\noindent | |
| Axiom (A6). Let $X$ be a nonempty smooth projective scheme over $k$ | |
| which is equidimensional of dimension $d$. Denote | |
| $\Delta : X \to X \times_{\Spec(k)} X$ | |
| the diagonal morphism of $X$ over $k$. We have to show that there | |
| exists a $k$-linear map | |
| $$ | |
| \lambda : H_{dR}^{2d}(X/k) \longrightarrow k | |
| $$ | |
| such that $(1 \otimes \lambda)\gamma([\Delta]) = 1$ in $H^0_{dR}(X/k)$. | |
| Let us write | |
| $$ | |
| \gamma = \gamma([\Delta]) = \gamma_0 + \ldots + \gamma_{2d} | |
| $$ | |
| with $\gamma_i \in H_{dR}^i(X/k) \otimes_k H_{dR}^{2d - i}(X/k)$ | |
| the K\"unneth components. Our problem is to show that there is a | |
| linear map $\lambda : H_{dR}^{2d}(X/k) \to k$ such that | |
| $(1 \otimes \lambda)\gamma_0 = 1$ in $H^0_{dR}(X/k)$. | |
| \medskip\noindent | |
| Let $X = \coprod X_i$ be the decomposition of $X$ into connected | |
| and hence irreducible components. Then we have correspondingly | |
| $\Delta = \coprod \Delta_i$ with $\Delta_i \subset X_i \times X_i$. | |
| It follows that | |
| $$ | |
| \gamma([\Delta]) = \sum \gamma([\Delta_i]) | |
| $$ | |
| and moreover $\gamma([\Delta_i])$ corresponds to the class of | |
| $\Delta_i \subset X_i \times X_i$ via the decomposition | |
| $$ | |
| H^*_{dR}(X \times X) = \prod\nolimits_{i, j} H^*_{dR}(X_i \times X_j) | |
| $$ | |
| We omit the details; one way to show this is to use that in | |
| $\CH^0(X \times X)$ we have idempotents $e_{i, j}$ corresponding to | |
| the open and closed subschemes $X_i \times X_j$ and to use that | |
| $\gamma$ is a ring map which sends $e_{i, j}$ to the corresponding | |
| idempotent in the displayed product decomposition of cohomology. | |
| If we can find $\lambda_i : H_{dR}^{2d}(X_i/k) \to k$ with | |
| $(1 \otimes \lambda_i)\gamma([\Delta_i]) = 1$ in $H^0_{dR}(X_i/k)$ | |
| then taking $\lambda = \sum \lambda_i$ will solve the problem for $X$. | |
| Thus we may and do assume $X$ is irreducible. | |
| \medskip\noindent | |
| Proof of Axiom (A6) for $X$ irreducible. Since $k$ is algebraically | |
| closed we have $H^0_{dR}(X/k) = k$ because $H^0(X, \mathcal{O}_X) = k$ | |
| as $X$ is a projective variety over an algebraically closed field | |
| (see Varieties, Lemma | |
| \ref{varieties-lemma-proper-geometrically-reduced-global-sections} | |
| for example). Let $x \in X$ be any closed point. | |
| Consider the cartesian diagram | |
| $$ | |
| \xymatrix{ | |
| x \ar[d] \ar[r] & X \ar[d]^\Delta \\ | |
| X \ar[r]^-{x \times \text{id}} & X \times_{\Spec(k)} X | |
| } | |
| $$ | |
| Compatibility of $\gamma$ with pullbacks implies that | |
| $\gamma([\Delta])$ maps to $\gamma([x])$ in $H_{dR}^{2d}(X/k)$, | |
| in other words, we have $\gamma_0 = 1 \otimes \gamma([x])$. | |
| We conclude two things from this: (a) the class | |
| $\gamma([x])$ is independent of $x$, (b) it suffices | |
| to show the class $\gamma([x])$ is nonzero, and hence (c) | |
| it suffices to find any zero cycle $\alpha$ on $X$ such that | |
| $\gamma(\alpha) \not = 0$. To do this we choose a finite | |
| morphism | |
| $$ | |
| f : X \longrightarrow \mathbf{P}^d_k | |
| $$ | |
| To see such a morphism exist, see | |
| Intersection Theory, Section \ref{intersection-section-projection} | |
| and in particular Lemma \ref{intersection-lemma-projection-generically-finite}. | |
| Observe that $f$ is finite syntomic (local complete intersection morphism | |
| by More on Morphisms, Lemma \ref{more-morphisms-lemma-lci-permanence} | |
| and flat by Algebra, Lemma \ref{algebra-lemma-CM-over-regular-flat}). | |
| By Proposition \ref{proposition-Garel} we have a trace map | |
| $$ | |
| \Theta_f : | |
| f_*\Omega^\bullet_{X/k} | |
| \longrightarrow | |
| \Omega^\bullet_{\mathbf{P}^d_k/k} | |
| $$ | |
| whose composition with the canonical map | |
| $$ | |
| \Omega^\bullet_{\mathbf{P}^d_k/k} | |
| \longrightarrow | |
| f_*\Omega^\bullet_{X/k} | |
| $$ | |
| is multiplication by the degree of $f$. Hence we see that we get a map | |
| $$ | |
| \Theta : H_{dR}^{2d}(X/k) \to H_{dR}^{2d}(\mathbf{P}^d_k/k) | |
| $$ | |
| such that $\Theta \circ f^*$ is multiplication by a positive integer. | |
| Hence if we can find a zero cycle on $\mathbf{P}^d_k$ whose class | |
| is nonzero, then we conclude by the compatibility of $\gamma$ | |
| with pullbacks. This is true by | |
| Lemma \ref{lemma-de-rham-cohomology-projective-space} and this | |
| finishes the proof of axiom (A6). | |
| \medskip\noindent | |
| Below we will use the following without further mention. | |
| First, by Weil Cohomology Theories, Remark \ref{weil-remark-trace} | |
| the map $\lambda_X : H^{2d}_{dR}(X/k) \to k$ is unique. | |
| Second, in the proof of axiom (A6) we have | |
| seen that $\lambda_X(\gamma([x])) = 1$ when $X$ is irreducible, i.e., | |
| the composition of the cycle class map | |
| $\gamma : \CH^d(X) \to H_{dR}^{2d}(X/k)$ with $\lambda_X$ | |
| is the degree map. | |
| \medskip\noindent | |
| Axiom (A9). Let $Y \subset X$ be a nonempty smooth divisor on a | |
| nonempty smooth equidimensional projective scheme $X$ over $k$ | |
| of dimension $d$. We have to show that the diagram | |
| $$ | |
| \xymatrix{ | |
| H_{dR}^{2d - 2}(X/k) | |
| \ar[rrr]_{c^{dR}_1(\mathcal{O}_X(Y)) \cap -} \ar[d]_{restriction} & & & | |
| H_{dR}^{2d}(X) \ar[d]^{\lambda_X} \\ | |
| H_{dR}^{2d - 2}(Y/k) \ar[rrr]^-{\lambda_Y} & & & k | |
| } | |
| $$ | |
| commutes where $\lambda_X$ and $\lambda_Y$ are as in axiom (A6). | |
| Above we have seen that if we decompose $X = \coprod X_i$ into connected | |
| (equivalently irreducible) components, then | |
| we have correspondingly $\lambda_X = \sum \lambda_{X_i}$. | |
| Similarly, if we decompoese $Y = \coprod Y_j$ into connected (equivalently | |
| irreducible) components, then we have $\lambda_Y = \sum \lambda_{Y_j}$. | |
| Moreover, in this case we have | |
| $\mathcal{O}_X(Y) = \otimes_j \mathcal{O}_X(Y_j)$ and hence | |
| $$ | |
| c_1^{dR}(\mathcal{O}_X(Y)) = \sum\nolimits_j | |
| c^{dR}_1(\mathcal{O}_X(Y_j)) | |
| $$ | |
| in $H_{dR}^2(X/k)$. A straightforward diagram chase shows that it suffices | |
| to prove the commutativity of the diagram in case $X$ and $Y$ are both | |
| irreducible. Then $H_{dR}^{2d - 2}(Y/k)$ is $1$-dimensional as | |
| we have Poincar'e duality for $Y$ by | |
| Weil Cohomology Theories, Lemma \ref{weil-lemma-poincare-duality}. | |
| By axiom (A4) the kernel of restriction (left vertical arrow) | |
| is contained in the kernel of cupping with $c^{dR}_1(\mathcal{O}_X(Y))$. | |
| This means it suffices to find one cohomology class | |
| $a \in H_{dR}^{2d - 2}(X)$ whose restriction to $Y$ is nonzero | |
| such that we have commutativity in the diagram for $a$. | |
| Take any ample invertible module $\mathcal{L}$ and set | |
| $$ | |
| a = c^{dR}_1(\mathcal{L})^{d - 1} | |
| $$ | |
| Then we know that $a|_Y = c^{dR}_1(\mathcal{L}|_Y)^{d - 1}$ | |
| and hence | |
| $$ | |
| \lambda_Y(a|_Y) = \deg(c_1(\mathcal{L}|_Y)^{d - 1} \cap [Y]) | |
| $$ | |
| by our description of $\lambda_Y$ above. This is a positive integer | |
| by Chow Homology, Lemma | |
| \ref{chow-lemma-degrees-and-numerical-intersections} combined with | |
| Varieties, Lemma \ref{varieties-lemma-ample-positive}. | |
| Similarly, we find | |
| $$ | |
| \lambda_X(c^{dR}_1(\mathcal{O}_X(Y)) \cap a) = | |
| \deg(c_1(\mathcal{O}_X(Y)) \cap c_1(\mathcal{L})^{d - 1} \cap [X]) | |
| $$ | |
| Since we know that $c_1(\mathcal{O}_X(Y)) \cap [X] = [Y]$ more or | |
| less by definition we have an equality of zero cycles | |
| $$ | |
| (Y \to X)_*\left(c_1(\mathcal{L}|_Y)^{d - 1} \cap [Y]\right) = | |
| c_1(\mathcal{O}_X(Y)) \cap c_1(\mathcal{L})^{d - 1} \cap [X] | |
| $$ | |
| on $X$. Thus these cycles have the same degree and the proof is complete. | |
| \begin{proposition} | |
| \label{proposition-de-rham-is-weil} | |
| Let $k$ be a field of characteristic zero. The functor that | |
| sends a smooth projective scheme $X$ over $k$ to $H_{dR}^*(X/k)$ | |
| is a Weil cohomology theory in the sense of | |
| Weil Cohomology Theories, Definition | |
| \ref{weil-definition-weil-cohomology-theory}. | |
| \end{proposition} | |
| \begin{proof} | |
| In the discussion above we showed that our data (D0), (D1), (D2') | |
| satisfies axioms (A1) -- (A9) of Weil Cohomology Theories, Section | |
| \ref{weil-section-c1}. Hence we conclude by | |
| Weil Cohomology Theories, Proposition \ref{weil-proposition-get-weil}. | |
| \medskip\noindent | |
| Please don't read what follows. In the proof of the assertions we also used | |
| Lemmas \ref{lemma-proper-smooth-de-Rham}, | |
| \ref{lemma-pullback-c1}, | |
| \ref{lemma-log-complex-consequence}, | |
| \ref{lemma-kunneth-de-rham}, | |
| \ref{lemma-bottom-part-degenerates}, and | |
| \ref{lemma-de-rham-cohomology-projective-space}, | |
| Propositions | |
| \ref{proposition-projective-space-bundle-formula}, | |
| \ref{proposition-blowup-split}, and | |
| \ref{proposition-Garel}, | |
| Weil Cohomology Theories, Lemmas | |
| \ref{weil-lemma-check-over-extension}, | |
| \ref{weil-lemma-chern-classes}, | |
| \ref{weil-lemma-cycle-classes}, and | |
| \ref{weil-lemma-poincare-duality}, | |
| Weil Cohomology Theories, Remark \ref{weil-remark-trace}, | |
| Varieties, Lemmas | |
| \ref{varieties-lemma-proper-geometrically-reduced-global-sections} and | |
| \ref{varieties-lemma-ample-positive}, | |
| Intersection Theory, Section \ref{intersection-section-projection} and | |
| Lemma \ref{intersection-lemma-projection-generically-finite}, | |
| More on Morphisms, Lemma \ref{more-morphisms-lemma-lci-permanence}, | |
| Algebra, Lemma \ref{algebra-lemma-CM-over-regular-flat}, and | |
| Chow Homology, Lemma | |
| \ref{chow-lemma-degrees-and-numerical-intersections}. | |
| \end{proof} | |
| \begin{remark} | |
| \label{remark-hodge-cohomology-is-weil} | |
| In exactly the same manner as above one can show that | |
| Hodge cohomology $X \mapsto H_{Hodge}^*(X/k)$ equipped | |
| with $c_1^{Hodge}$ determines a Weil | |
| cohomology theory. If we ever need this, we will precisely | |
| formulate and prove this here. This leads to the following | |
| amusing consequence: If the betti numbers of a Weil cohomology | |
| theory are independent of the chosen Weil cohomology theory | |
| (over our field $k$ of characteristic $0$), then | |
| the Hodge-to-de Rham spectral sequence | |
| degenerates at $E_1$! Of course, the degeneration of | |
| the Hodge-to-de Rham spectral sequence is known | |
| (see for example \cite{Deligne-Illusie} for a marvelous algebraic proof), | |
| but it is by no means an easy result! This suggests that proving | |
| the independence of betti numbers is a hard problem as well | |
| and as far as we know is still an open problem. See | |
| Weil Cohomology Theories, Remark | |
| \ref{weil-remark-betti-numbers-in-some-sense} for a related question. | |
| \end{remark} | |
| \section{Gysin maps for closed immersions} | |
| \label{section-gysin} | |
| \noindent | |
| In this section we define the gysin map for closed immersions. | |
| \begin{remark} | |
| \label{remark-gysin-equations} | |
| Let $X \to S$ be a morphism of schemes. Let | |
| $f_1, \ldots, f_c \in \Gamma(X, \mathcal{O}_X)$. Let $Z \subset X$ | |
| be the closed subscheme cut out by $f_1, \ldots, f_c$. Below we will | |
| study the {\it gysin map} | |
| \begin{equation} | |
| \label{equation-gysin} | |
| \gamma^p_{f_1, \ldots, f_c} : | |
| \Omega^p_{Z/S} | |
| \longrightarrow | |
| \mathcal{H}_Z^c(\Omega^{p + c}_{X/S}) | |
| \end{equation} | |
| defined as follows. Given a local section $\omega$ of $\Omega^p_{Z/S}$ | |
| which is the restriction of a section $\tilde \omega$ of $\Omega^p_{X/S}$ | |
| we set | |
| $$ | |
| \gamma^p_{f_1, \ldots, f_c}(\omega) = | |
| c_{f_1, \ldots, f_c}(\tilde \omega|_Z) \wedge | |
| \text{d}f_1 \wedge \ldots \wedge \text{d}f_c | |
| $$ | |
| where $c_{f_1, \ldots, f_c} : \Omega^p_{X/S} \otimes \mathcal{O}_Z \to | |
| \mathcal{H}_Z^c(\Omega^p_{X/S})$ is the map constructed in | |
| Derived Categories of Schemes, Remark | |
| \ref{perfect-remark-supported-map-c-equations}. | |
| This is well defined: given $\omega$ we can change our choice of | |
| $\tilde \omega$ by elements of the form | |
| $\sum f_i \omega'_i + \sum \text{d}(f_i) \wedge \omega''_i$ | |
| which are mapped to zero by the construction. | |
| \end{remark} | |
| \begin{lemma} | |
| \label{lemma-gysin-differential} | |
| The gysin map (\ref{equation-gysin}) is compatible with the de Rham | |
| differentials on $\Omega^\bullet_{X/S}$ and $\Omega^\bullet_{Z/S}$. | |
| \end{lemma} | |
| \begin{proof} | |
| This follows from an almost trivial calculation once | |
| we correctly interpret this. First, we recall that the functor | |
| $\mathcal{H}^c_Z$ computed on the category of $\mathcal{O}_X$-modules | |
| agrees with the similarly defined functor on the category of abelian | |
| sheaves on $X$, see | |
| Cohomology, Lemma \ref{cohomology-lemma-sections-support-abelian-unbounded}. | |
| Hence, the differential $\text{d} : \Omega^p_{X/S} \to \Omega^{p + 1}_{X/S}$ | |
| induces a map | |
| $\mathcal{H}^c_Z(\Omega^p_{X/S}) \to \mathcal{H}^c_Z(\Omega^{p + 1}_{X/S})$. | |
| Moreover, the formation of the extended alternating {\v C}ech complex in | |
| Derived Categories of Schemes, Remark \ref{perfect-remark-support-c-equations} | |
| works on the category of abelian sheaves. The map | |
| $$ | |
| \Coker\left(\bigoplus \mathcal{F}_{1 \ldots \hat i \ldots c} \to | |
| \mathcal{F}_{1 \ldots c}\right) | |
| \longrightarrow | |
| i_*\mathcal{H}^c_Z(\mathcal{F}) | |
| $$ | |
| used in the construction of $c_{f_1, \ldots, f_c}$ in | |
| Derived Categories of Schemes, Remark | |
| \ref{perfect-remark-supported-map-c-equations} | |
| is well defined and | |
| functorial on the category of all abelian sheaves on $X$. | |
| Hence we see that the lemma follows from the equality | |
| $$ | |
| \text{d}\left( | |
| \frac{\tilde \omega \wedge \text{d}f_1 \wedge \ldots \wedge | |
| \text{d}f_c}{f_1 \ldots f_c}\right) = | |
| \frac{\text{d}(\tilde \omega) \wedge | |
| \text{d}f_1 \wedge \ldots \wedge \text{d}f_c}{f_1 \ldots f_c} | |
| $$ | |
| which is clear. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-gysin-global} | |
| Let $X \to S$ be a morphism of schemes. Let $Z \to X$ be a closed immersion | |
| of finite presentation whose conormal sheaf $\mathcal{C}_{Z/X}$ is | |
| locally free of rank $c$. Then there is a canonical map | |
| $$ | |
| \gamma^p : \Omega^p_{Z/S} \to \mathcal{H}^c_Z(\Omega^{p + c}_{X/S}) | |
| $$ | |
| which is locally given by the maps $\gamma^p_{f_1, \ldots, f_c}$ | |
| of Remark \ref{remark-gysin-equations}. | |
| \end{lemma} | |
| \begin{proof} | |
| The assumptions imply that given $x \in Z \subset X$ there exists an | |
| open neighbourhood $U$ of $x$ such that $Z$ is cut out by $c$ | |
| elements $f_1, \ldots, f_c \in \mathcal{O}_X(U)$. Thus | |
| it suffices to show that given $f_1, \ldots, f_c$ and | |
| $g_1, \ldots, g_c$ in $\mathcal{O}_X(U)$ cutting out $Z \cap U$, | |
| the maps $\gamma^p_{f_1, \ldots, f_c}$ | |
| and $\gamma^p_{g_1, \ldots, g_c}$ are the same. To do this, after shrinking | |
| $U$ we may assume $g_j = \sum a_{ji} f_i$ for some | |
| $a_{ji} \in \mathcal{O}_X(U)$. Then we have | |
| $c_{f_1, \ldots, f_c} = \det(a_{ji}) c_{g_1, \ldots, g_c}$ by | |
| Derived Categories of Schemes, Lemma | |
| \ref{perfect-lemma-supported-map-determinant}. | |
| On the other hand we have | |
| $$ | |
| \text{d}(g_1) \wedge \ldots \wedge \text{d}(g_c) \equiv | |
| \det(a_{ji}) \text{d}(f_1) \wedge \ldots \wedge \text{d}(f_c) | |
| \bmod (f_1, \ldots, f_c)\Omega^c_{X/S} | |
| $$ | |
| Combining these relations, a straightforward calculation gives the | |
| desired equality. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-gysin-differential-global} | |
| Let $X \to S$ and $i : Z \to X$ be as in Lemma \ref{lemma-gysin-global}. | |
| The gysin map $\gamma^p$ is compatible with the de Rham | |
| differentials on $\Omega^\bullet_{X/S}$ and $\Omega^\bullet_{Z/S}$. | |
| \end{lemma} | |
| \begin{proof} | |
| We may check this locally and then it follows from | |
| Lemma \ref{lemma-gysin-differential}. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-gysin-projection} | |
| Let $X \to S$ and $i : Z \to X$ be as in Lemma \ref{lemma-gysin-global}. | |
| Given $\alpha \in H^q(X, \Omega^p_{X/S})$ we have | |
| $\gamma^p(\alpha|_Z) = i^{-1}\alpha \wedge \gamma^0(1)$ in | |
| $H^q(Z, \mathcal{H}^c_Z(\Omega^{p + c}_{X/S}))$. | |
| Please see proof for notation. | |
| \end{lemma} | |
| \begin{proof} | |
| The restriction $\alpha|_Z$ is the element of $H^q(Z, \Omega^p_{Z/S})$ | |
| given by functoriality for Hodge cohomology. Applying functoriality | |
| for cohomology using | |
| $\gamma^p : \Omega^p_{Z/S} \to \mathcal{H}^c_Z(\Omega^{p + c}_{X/S})$ | |
| we get get $\gamma^p(\alpha|_Z)$ in | |
| $H^q(Z, \mathcal{H}^c_Z(\Omega^{p + c}_{X/S}))$. | |
| This explains the left hand side of the formula. | |
| \medskip\noindent | |
| To explain the right hand side, we first pullback by the map | |
| of ringed spaces $i : (Z, i^{-1}\mathcal{O}_X) \to (X, \mathcal{O}_X)$ | |
| to get the element $i^{-1}\alpha \in H^q(Z, i^{-1}\Omega^p_{X/S})$. | |
| Let $\gamma^0(1) \in H^0(Z, \mathcal{H}_Z^c(\Omega^c_{X/S}))$ | |
| be the image of $1 \in H^0(Z, \mathcal{O}_Z) = H^0(Z, \Omega^0_{Z/S})$ | |
| by $\gamma^0$. Using cup product we obtain an element | |
| $$ | |
| i^{-1}\alpha \cup \gamma^0(1) | |
| \in | |
| H^{q + c}(Z, | |
| i^{-1}\Omega^p_{X/S} \otimes_{i^{-1}\mathcal{O}_X} | |
| \mathcal{H}^c_Z(\Omega^c_{X/S})) | |
| $$ | |
| Using Cohomology, Remark \ref{cohomology-remark-support-cup-product} | |
| and wedge product there are canonical maps | |
| $$ | |
| i^{-1}\Omega^p_{X/S} \otimes_{i^{-1}\mathcal{O}_X}^\mathbf{L} | |
| R\mathcal{H}_Z(\Omega^c_{X/S}) \to | |
| R\mathcal{H}_Z(\Omega^p_{X/S} \otimes_{\mathcal{O}_X}^\mathbf{L} | |
| \Omega^c_{X/S}) \to | |
| R\mathcal{H}_Z(\Omega^{p + c}_{X/S}) | |
| $$ | |
| By Derived Categories of Schemes, Lemma | |
| \ref{perfect-lemma-supported-trivial-vanishing} | |
| the objects $R\mathcal{H}_Z(\Omega^j_{X/S})$ have vanishing | |
| cohomology sheaves in degrees $> c$. Hence on cohomology | |
| sheaves in degree $c$ we obtain a map | |
| $$ | |
| i^{-1}\Omega^p_{X/S} \otimes_{i^{-1}\mathcal{O}_X} | |
| \mathcal{H}^c_Z(\Omega^c_{X/S}) \longrightarrow | |
| \mathcal{H}^c_Z(\Omega^{p + c}_{X/S}) | |
| $$ | |
| The expression $i^{-1}\alpha \wedge \gamma^0(1)$ is the image | |
| of the cup product $i^{-1}\alpha \cup \gamma^0(1)$ by the | |
| functoriality of cohomology. | |
| \medskip\noindent | |
| Having explained the content of the formula in this manner, by | |
| general properties of cup products | |
| (Cohomology, Section \ref{cohomology-section-cup-product}), | |
| it now suffices to prove that the diagram | |
| $$ | |
| \xymatrix{ | |
| i^{-1}\Omega^p_X \otimes \Omega^0_Z \ar[rr]_{\text{id} \otimes \gamma^0} | |
| \ar[d] & & | |
| i^{-1}\Omega^p_X \otimes \mathcal{H}^c_Z(\Omega^c_X) \ar[d]^\wedge \\ | |
| \Omega^p_Z \otimes \Omega^0_Z \ar[r]^\wedge & | |
| \Omega^p_Z \ar[r]^{\gamma^p} & | |
| \mathcal{H}^c_Z(\Omega^{p + c}_X) | |
| } | |
| $$ | |
| is commutative in the category of sheaves on $Z$ (with obvious abuse of | |
| notation). This boils down to a simple computation for the maps | |
| $\gamma^j_{f_1, \ldots, f_c}$ which we omit; in fact these maps | |
| are chosen exactly such that this works and such that $1$ maps to | |
| $\frac{\text{d}f_1 \wedge \ldots \wedge \text{d}f_c}{f_1 \ldots f_c}$. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-gysin-transverse} | |
| Let $c \geq 0$ be a integer. Let | |
| $$ | |
| \xymatrix{ | |
| Z' \ar[d]_h \ar[r] & X' \ar[d]_g \ar[r] & S' \ar[d] \\ | |
| Z \ar[r] & X \ar[r] & S | |
| } | |
| $$ | |
| be a commutative diagram of schemes. | |
| Assume | |
| \begin{enumerate} | |
| \item $Z \to X$ and $Z' \to X'$ | |
| satisfy the assumptions of Lemma \ref{lemma-gysin-global}, | |
| \item the left square in the diagram is cartesian, and | |
| \item $h^*\mathcal{C}_{Z/X} \to \mathcal{C}_{Z'/X'}$ | |
| (Morphisms, Lemma \ref{morphisms-lemma-conormal-functorial}) | |
| is an isomorphism. | |
| \end{enumerate} | |
| Then the diagram | |
| $$ | |
| \xymatrix{ | |
| h^*\Omega^p_{Z/S} \ar[rr]_-{h^{-1}\gamma^p} \ar[d] & & | |
| \mathcal{O}_{X'}|_{Z'} \otimes_{h^{-1}\mathcal{O}_X|_Z} | |
| h^{-1}\mathcal{H}^c_Z(\Omega^{p + c}_{X/S}) \ar[d] \\ | |
| \Omega^p_{Z'/S'} \ar[rr]^{\gamma^p} & & | |
| \mathcal{H}^c_{Z'}(\Omega^{p + c}_{X'/S'}) | |
| } | |
| $$ | |
| is commutative. The left vertical arrow is functoriality of modules of | |
| differentials and the right vertical arrow uses | |
| Cohomology, Remark \ref{cohomology-remark-support-functorial}. | |
| \end{lemma} | |
| \begin{proof} | |
| More precisely, consider the composition | |
| \begin{align*} | |
| \mathcal{O}_{X'}|_{Z'} \otimes_{h^{-1}\mathcal{O}_X|_Z}^\mathbf{L} | |
| h^{-1}R\mathcal{H}_Z(\Omega^{p + c}_{X/S}) | |
| & \to | |
| R\mathcal{H}_{Z'}(Lg^*\Omega^{p + c}_{X/S}) \\ | |
| & \to | |
| R\mathcal{H}_{Z'}(g^*\Omega^{p + c}_{X/S}) \\ | |
| & \to | |
| R\mathcal{H}_{Z'}(\Omega^{p + c}_{X'/S'}) | |
| \end{align*} | |
| where the first arrow is given by | |
| Cohomology, Remark \ref{cohomology-remark-support-functorial} | |
| and the last one by functoriality of differentials. | |
| Since we have the vanishing of cohomology sheaves in degrees $> c$ | |
| by Derived Categories of Schemes, Lemma | |
| \ref{perfect-lemma-supported-trivial-vanishing} | |
| this induces the right vertical arrow. | |
| We can check the commutativity locally. | |
| Thus we may assume $Z$ is cut out by | |
| $f_1, \ldots, f_c \in \Gamma(X, \mathcal{O}_X)$. | |
| Then $Z'$ is cut out by $f'_i = g^\sharp(f_i)$. | |
| The maps $c_{f_1, \ldots, f_c}$ and $c_{f'_1, \ldots, f'_c}$ | |
| fit into the commutative diagram | |
| $$ | |
| \xymatrix{ | |
| h^*i^*\Omega^p_{X/S} \ar[rr]_-{h^{-1}c_{f_1, \ldots, f_c}} \ar[d] & & | |
| \mathcal{O}_{X'}|_{Z'} \otimes_{h^{-1}\mathcal{O}_X|_Z} | |
| h^{-1}\mathcal{H}^c_Z(\Omega^p_{X/S}) \ar[d] \\ | |
| (i')^*\Omega^p_{X'/S'} \ar[rr]^{c_{f'_1, \ldots, f'_c}} & & | |
| \mathcal{H}^c_{Z'}(\Omega^p_{X'/S'}) | |
| } | |
| $$ | |
| See Derived Categories of Schemes, Remark | |
| \ref{perfect-remark-supported-functorial}. | |
| Recall given a $p$-form $\omega$ on $Z$ we define | |
| $\gamma^p(\omega)$ by choosing (locally on $X$ and $Z$) | |
| a $p$-form $\tilde \omega$ on $X$ lifting $\omega$ and taking | |
| $\gamma^p(\omega) = | |
| c_{f_1, \ldots, f_c}(\tilde \omega) \wedge | |
| \text{d}f_1 \wedge \ldots \wedge \text{d}f_c$. | |
| Since the form $\text{d}f_1 \wedge \ldots \wedge \text{d}f_c$ | |
| pulls back to | |
| $\text{d}f'_1 \wedge \ldots \wedge \text{d}f'_c$ we conclude. | |
| \end{proof} | |
| \begin{remark} | |
| \label{remark-how-to-use} | |
| Let $X \to S$, $i : Z \to X$, and $c \geq 0$ be as in | |
| Lemma \ref{lemma-gysin-global}. | |
| Let $p \geq 0$ and assume that $\mathcal{H}^i_Z(\Omega^{p + c}_{X/S}) = 0$ | |
| for $i = 0, \ldots, c - 1$. This vanishing holds if $X \to S$ is smooth | |
| and $Z \to X$ is a Koszul regular immersion, see | |
| Derived Categories of Schemes, Lemma \ref{perfect-lemma-supported-vanishing}. | |
| Then we obtain a map | |
| $$ | |
| \gamma^{p, q} : | |
| H^q(Z, \Omega^p_{Z/S}) | |
| \longrightarrow | |
| H^{q + c}(X, \Omega^{p + c}_{X/S}) | |
| $$ | |
| by first using | |
| $\gamma^p : \Omega^p_{Z/S} \to \mathcal{H}^c_Z(\Omega^{p + c}_{X/S})$ | |
| to map into | |
| $$ | |
| H^q(Z, \mathcal{H}^c_Z(\Omega^{p + c}_{X/S})) = | |
| H^q(Z, R\mathcal{H}_Z(\Omega^{p + c}_{X/S})[c]) = | |
| H^q(X, i_*R\mathcal{H}_Z(\Omega^{p + c}_{X/S})[c]) | |
| $$ | |
| and then using the adjunction map | |
| $i_*R\mathcal{H}_Z(\Omega^{p + c}_{X/S}) \to \Omega^{p + c}_{X/S}$ | |
| to continue on to the desired Hodge cohomology module. | |
| \end{remark} | |
| \begin{lemma} | |
| \label{lemma-gysin-differential-hodge} | |
| Let $X \to S$ and $i : Z \to X$ be as in Lemma \ref{lemma-gysin-global}. | |
| Assume $X \to S$ is smooth and $Z \to X$ Koszul regular. | |
| The gysin maps $\gamma^{p, q}$ are compatible with the de Rham | |
| differentials on $\Omega^\bullet_{X/S}$ and $\Omega^\bullet_{Z/S}$. | |
| \end{lemma} | |
| \begin{proof} | |
| This follows immediately from | |
| Lemma \ref{lemma-gysin-differential-global}. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-gysin-projection-global} | |
| Let $X \to S$, $i : Z \to X$, and $c \geq 0$ be as in | |
| Lemma \ref{lemma-gysin-global}. Assume $X \to S$ smooth and | |
| $Z \to X$ Koszul regular. Given $\alpha \in H^q(X, \Omega^p_{X/S})$ we have | |
| $\gamma^{p, q}(\alpha|_Z) = \alpha \cup \gamma^{0, 0}(1)$ in | |
| $H^{q + c}(X, \Omega^{p + c}_{X/S})$ with $\gamma^{a, b}$ as in | |
| Remark \ref{remark-how-to-use}. | |
| \end{lemma} | |
| \begin{proof} | |
| This lemma follows from Lemma \ref{lemma-gysin-projection} | |
| and Cohomology, Lemma \ref{cohomology-lemma-support-cup-product}. | |
| We suggest the reader skip over the more detailed discussion below. | |
| \medskip\noindent | |
| We will use without further mention that | |
| $R\mathcal{H}_Z(\Omega^j_{X/S}) = \mathcal{H}^c_Z(\Omega^j_{X/S})[-c]$ | |
| for all $j$ as pointed out in Remark \ref{remark-how-to-use}. | |
| We will also silently use the identifications | |
| $H^{q + c}_Z(X, \Omega^j_{X/S}) = H^{q + c}(Z, R\mathcal{H}_Z(\Omega^j_{X/S}) = | |
| H^q(Z, \mathcal{H}^c_Z(\Omega^j_{X/S}))$, see | |
| Cohomology, Lemma \ref{cohomology-lemma-local-to-global-sections-with-support} | |
| for the first one. With these identifications | |
| \begin{enumerate} | |
| \item $\gamma^0(1) \in H^c_Z(X, \Omega^c_{X/S})$ maps to $\gamma^{0, 0}(1)$ | |
| in $H^c(X, \Omega^c_{X/S})$, | |
| \item the right hand side $i^{-1}\alpha \wedge \gamma^0(1)$ | |
| of the equality in Lemma \ref{lemma-gysin-projection} | |
| is the (image by wedge product of the) cup product of | |
| Cohomology, Remark \ref{cohomology-remark-support-cup-product-global} | |
| of the elements $\alpha$ and $\gamma^0(1)$, in other words, the constructions | |
| in the proof of Lemma \ref{lemma-gysin-projection} and in | |
| Cohomology, Remark \ref{cohomology-remark-support-cup-product-global} match, | |
| \item by Cohomology, Lemma \ref{cohomology-lemma-support-cup-product} | |
| this maps to $\alpha \cup \gamma^{0, 0}(1)$ in | |
| $H^{q + c}(X, \Omega^p_{X/S} \otimes \Omega^c_{X/S})$, and | |
| \item the left hand side $\gamma^p(\alpha|_Z)$ of the equality in | |
| Lemma \ref{lemma-gysin-projection} maps to | |
| $\gamma^{p, q}(\alpha|_Z)$. | |
| \end{enumerate} | |
| This finishes the proof. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-gysin-transverse-global} | |
| Let $c \geq 0$ and | |
| $$ | |
| \xymatrix{ | |
| Z' \ar[d]_h \ar[r] & X' \ar[d]_g \ar[r] & S' \ar[d] \\ | |
| Z \ar[r] & X \ar[r] & S | |
| } | |
| $$ | |
| satisfy the assumptions of Lemma \ref{lemma-gysin-transverse} and assume | |
| in addition that $X \to S$ and $X' \to S'$ are smooth and that | |
| $Z \to X$ and $Z' \to X'$ are Koszul regular immersions. | |
| Then the diagram | |
| $$ | |
| \xymatrix{ | |
| H^q(Z, \Omega^p_{Z/S}) \ar[rr]_-{\gamma^{p, q}} \ar[d] & & | |
| H^{q + c}(X, \Omega^{p + c}_{X/S}) \ar[d] \\ | |
| H^q(Z', \Omega^p_{Z'/S'}) \ar[rr]^{\gamma^{p, q}} & & | |
| H^{q + c}(X', \Omega^{p + c}_{X'/S'}) | |
| } | |
| $$ | |
| is commutative where $\gamma^{p, q}$ is as in Remark \ref{remark-how-to-use}. | |
| \end{lemma} | |
| \begin{proof} | |
| This follows on combining Lemma \ref{lemma-gysin-transverse} | |
| and Cohomology, Lemma \ref{cohomology-lemma-support-functorial}. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-class-of-a-point} | |
| Let $k$ be a field. Let $X$ be an irreducible smooth proper scheme over $k$ | |
| of dimension $d$. Let $Z \subset X$ be the reduced closed subscheme consisting | |
| of a single $k$-rational point $x$. Then the image of | |
| $1 \in k = H^0(Z, \mathcal{O}_Z) = H^0(Z, \Omega^0_{Z/k})$ | |
| by the map $H^0(Z, \Omega^0_{Z/k}) \to H^d(X, \Omega^d_{X/k})$ | |
| of Remark \ref{remark-how-to-use} is nonzero. | |
| \end{lemma} | |
| \begin{proof} | |
| The map $\gamma^0 : \mathcal{O}_Z \to | |
| \mathcal{H}^d_Z(\Omega^d_{X/k}) = R\mathcal{H}_Z(\Omega^d_{X/k})[d]$ | |
| is adjoint to a map | |
| $$ | |
| g^0 : i_*\mathcal{O}_Z \longrightarrow \Omega^d_{X/k}[d] | |
| $$ | |
| in $D(\mathcal{O}_X)$. Recall that $\Omega^d_{X/k} = \omega_X$ is a | |
| dualizing sheaf for $X/k$, see | |
| Duality for Schemes, Lemma \ref{duality-lemma-duality-proper-over-field}. | |
| Hence the $k$-linear dual of the map in the statement | |
| of the lemma is the map | |
| $$ | |
| H^0(X, \mathcal{O}_X) \to \Ext^d_X(i_*\mathcal{O}_Z, \omega_X) | |
| $$ | |
| which sends $1$ to $g^0$. Thus it suffices to show that $g^0$ is nonzero. | |
| This we may do in any neighbourhood $U$ of the point $x$. Choose $U$ | |
| such that there exist $f_1, \ldots, f_d \in \mathcal{O}_X(U)$ | |
| vanishing only at $x$ and generating the maximal ideal | |
| $\mathfrak m_x \subset \mathcal{O}_{X, x}$. We may assume | |
| assume $U = \Spec(R)$ is affine. Looking over the | |
| construction of $\gamma^0$ we find that our extension is given by | |
| $$ | |
| k \to | |
| (R \to \bigoplus\nolimits_{i_0} R_{f_{i_0}} \to | |
| \bigoplus\nolimits_{i_0 < i_1} R_{f_{i_0}f_{i_1}} \to | |
| \ldots \to R_{f_1\ldots f_r})[d] \to R[d] | |
| $$ | |
| where $1$ maps to $1/f_1 \ldots f_c$ under the first map. | |
| This is nonzero because $1/f_1 \ldots f_c$ is a nonzero element | |
| of local cohomology group $H^d_{(f_1, \ldots, f_d)}(R)$ in this case, | |
| \end{proof} | |
| \section{Relative Poincar\'e duality} | |
| \label{section-relative-poincare-duality} | |
| \noindent | |
| In this section we prove Poincar'e duality for the relative de Rham cohomology | |
| of a proper smooth scheme over a base. We strongly urge the reader to | |
| look at Section \ref{section-poincare-duality} first. | |
| \begin{situation} | |
| \label{situation-relative-duality} | |
| Here $S$ is a quasi-compact and quasi-separated scheme and | |
| $f : X \to S$ is a proper smooth morphism of schemes all of whose | |
| fibres are nonempty and equidimensional of dimension $n$. | |
| \end{situation} | |
| \begin{lemma} | |
| \label{lemma-relative-bottom-part-degenerates} | |
| In Situation \ref{situation-relative-duality} the psuhforward | |
| $f_*\mathcal{O}_X$ is a finite \'etale $\mathcal{O}_S$-algebra | |
| and locally on $S$ we have $Rf_*\mathcal{O}_X = f_*\mathcal{O}_X \oplus P$ | |
| in $D(\mathcal{O}_S)$ with $P$ perfect of tor amplitude in $[1, \infty)$. | |
| The map $\text{d} : f_*\mathcal{O}_X \to f_*\Omega_{X/S}$ is zero. | |
| \end{lemma} | |
| \begin{proof} | |
| The first part of the statement follows from | |
| Derived Categories of Schemes, Lemma \ref{perfect-lemma-proper-flat-geom-red}. | |
| Setting $S' = \underline{\Spec}_S(f_*\mathcal{O}_X)$ we get a factorization | |
| $X \to S' \to S$ (this is the Stein factorization, see | |
| More on Morphisms, Section \ref{more-morphisms-section-stein-factorization}, | |
| although we don't need this) | |
| and we see that $\Omega_{X/S} = \Omega_{X/S'}$ for example by | |
| Morphisms, Lemma \ref{morphisms-lemma-triangle-differentials} and | |
| \ref{morphisms-lemma-etale-at-point}. This of course implies that | |
| $\text{d} : f_*\mathcal{O}_X \to f_*\Omega_{X/S}$ is zero. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-relative-duality-hodge} | |
| In Situation \ref{situation-relative-duality} there exists an | |
| $\mathcal{O}_S$-module map | |
| $$ | |
| t : Rf_*\Omega^n_{X/S}[n] \longrightarrow \mathcal{O}_S | |
| $$ | |
| unique up to precomposing by multiplication by a unit of | |
| $H^0(X, \mathcal{O}_X)$ with the following property: for all $p$ the pairing | |
| $$ | |
| Rf_*\Omega^p_{X/S} | |
| \otimes_{\mathcal{O}_S}^\mathbf{L} | |
| Rf_*\Omega^{n - p}_{X/S}[n] | |
| \longrightarrow | |
| \mathcal{O}_S | |
| $$ | |
| given by the relative cup product composed with $t$ | |
| is a perfect pairing of perfect complexes on $S$. | |
| \end{lemma} | |
| \begin{proof} | |
| Let $\omega^\bullet_{X/S}$ be the relative dualizing complex of $X$ over $S$ as | |
| in Duality for Schemes, Remark \ref{duality-remark-relative-dualizing-complex} | |
| and let $Rf_*\omega_{X/S}^\bullet \to \mathcal{O}_S$ be its trace map. By | |
| Duality for Schemes, Lemma \ref{duality-lemma-smooth-proper} | |
| there exists an isomorphism $\omega^\bullet_{X/S} \cong \Omega^n_{X/S}[n]$ | |
| and using this isomorphism we obtain $t$. The complexes $Rf_*\Omega^p_{X/S}$ | |
| are perfect by Lemma \ref{lemma-proper-smooth-de-Rham}. | |
| Since $\Omega^p_{X/S}$ is locally free and since | |
| $\Omega^p_{X/S} \otimes_{\mathcal{O}_X} \Omega^{n - p}_{X/S} \to | |
| \Omega^n_{X/S}$ exhibits an isomorphism $\Omega^p_{X/S} \cong | |
| \SheafHom_{\mathcal{O}_X}(\Omega^{n - p}_{X/S}, \Omega^n_{X/S})$ | |
| we see that the pairing induced by the relative cup product is perfect by | |
| Duality for Schemes, Remark | |
| \ref{duality-remark-relative-dualizing-complex-relative-cup-product}. | |
| \medskip\noindent | |
| Uniqueness of $t$. Choose a distinguished triangle | |
| $f_*\mathcal{O}_X \to Rf_*\mathcal{O}_X \to P \to f_*\mathcal{O}_X[1]$. | |
| By Lemma \ref{lemma-relative-bottom-part-degenerates} | |
| the object $P$ is perfect of tor amplitude in $[1, \infty)$ | |
| and the triangle is locally on $S$ split. | |
| Thus $R\SheafHom_{\mathcal{O}_X}(P, \mathcal{O}_X)$ is perfect | |
| of tor amplitude in $(-\infty, -1]$. Hence duality (above) shows that | |
| locally on $S$ we have | |
| $$ | |
| Rf_*\Omega^n_{X/S}[n] \cong | |
| R\SheafHom_{\mathcal{O}_S}(f_*\mathcal{O}_X, \mathcal{O}_S) | |
| \oplus R\SheafHom_{\mathcal{O}_X}(P, \mathcal{O}_X) | |
| $$ | |
| This shows that $R^nf_*\Omega^n_{X/S}$ is finite locally free and | |
| that we obtain a perfect $\mathcal{O}_S$-bilinear pairing | |
| $$ | |
| f_*\mathcal{O}_X \times R^nf_*\Omega^n_{X/S} \longrightarrow \mathcal{O}_S | |
| $$ | |
| using $t$. | |
| This implies that any $\mathcal{O}_S$-linear map | |
| $t' : R^nf_*\Omega^n_{X/S} \to \mathcal{O}_S$ is of the form | |
| $t' = t \circ g$ for some | |
| $g \in \Gamma(S, f_*\mathcal{O}_X) = \Gamma(X, \mathcal{O}_X)$. | |
| In order for $t'$ to still determine a perfect pairing $g$ will have | |
| to be a unit. This finishes the proof. | |
| \end{proof} | |
| \begin{lemma} | |
| \label{lemma-relative-top-part-degenerates} | |
| In Situation \ref{situation-relative-duality} the map | |
| $\text{d} : R^nf_*\Omega^{n - 1}_{X/S} \to R^nf_*\Omega^n_{X/S}$ | |
| is zero. | |
| \end{lemma} | |
| \noindent | |
| As we mentioned in the proof of Lemma \ref{lemma-top-part-degenerates} | |
| this lemma is not an easy consequence of Lemmas | |
| \ref{lemma-relative-duality-hodge} and | |
| \ref{lemma-relative-bottom-part-degenerates}. | |
| \begin{proof}[Proof in case $S$ is reduced] | |
| Assume $S$ is reduced. Observe that | |
| $\text{d} : R^nf_*\Omega^{n - 1}_{X/S} \to R^nf_*\Omega^n_{X/S}$ | |
| is an $\mathcal{O}_S$-linear map of (quasi-coherent) $\mathcal{O}_S$-modules. | |
| The $\mathcal{O}_S$-module $R^nf_*\Omega^n_{X/S}$ is finite locally free | |
| (as the dual of the finite locally free $\mathcal{O}_S$-module | |
| $f_*\mathcal{O}_X$ by Lemmas | |
| \ref{lemma-relative-duality-hodge} and | |
| \ref{lemma-relative-bottom-part-degenerates}). | |
| Since $S$ is reduced it suffices to show that | |
| the stalk of $\text{d}$ in every generic point $\eta \in S$ | |
| is zero; this follows by looking at sections over affine opens, | |
| using that the target of $\text{d}$ is locally free, and | |
| Algebra, Lemma \ref{algebra-lemma-reduced-ring-sub-product-fields} part (2). | |
| Since $S$ is reduced we have $\mathcal{O}_{S, \eta} = \kappa(\eta)$, see | |
| Algebra, Lemma \ref{algebra-lemma-minimal-prime-reduced-ring}. | |
| Thus $\text{d}_\eta$ is identified with the map | |
| $$ | |
| \text{d} : | |
| H^n(X_\eta, \Omega^{n - 1}_{X_\eta/\kappa(\eta)}) | |
| \longrightarrow | |
| H^n(X_\eta, \Omega^n_{X_\eta/\kappa(\eta)}) | |
| $$ | |
| which is zero by Lemma \ref{lemma-top-part-degenerates}. | |
| \end{proof} | |
| \begin{proof}[Proof in the general case] | |
| Observe that the question is flat local on $S$: if $S' \to S$ is a surjective | |
| flat morphism of schemes and the map is zero after pullback to $S'$, | |
| then the map is zero. Also, formation of the map commutes with base change | |
| by flat morphisms by flat base change (Cohomology of Schemes, Lemma | |
| \ref{coherent-lemma-flat-base-change-cohomology}). | |
| \medskip\noindent | |
| Consider the Stein factorization $X \to S' \to S$ as in | |
| More on Morphisms, Theorem | |
| \ref{more-morphisms-theorem-stein-factorization-general}. | |
| By Lemma \ref{lemma-relative-bottom-part-degenerates} the morphism | |
| $\pi : S' \to S$ is finite \'etale. | |
| The morphism $f : X \to S'$ is proper (by the theorem), | |
| smooth (by More on Morphisms, Lemma | |
| \ref{more-morphisms-lemma-smooth-etale-permanence}) with geometrically | |
| connected fibres by the theorem on Stein factorization. | |
| In the proof of Lemma \ref{lemma-relative-bottom-part-degenerates} | |
| we saw that $\Omega_{X/S} = \Omega_{X/S'}$ because $S' \to S$ is \'etale. | |
| Hence $\Omega^\bullet_{X/S} = \Omega^\bullet_{X/S'}$. | |
| We have | |
| $$ | |
| R^qf_*\Omega^p_{X/S} = \pi_*R^qf'_*\Omega^p_{X/S'} | |
| $$ | |
| for all $p, q$ by the Leray spectral sequence | |
| (Cohomology, Lemma \ref{cohomology-lemma-relative-Leray}), | |
| the fact that $\pi$ is finite hence affine, and | |
| Cohomology of Schemes, Lemma \ref{coherent-lemma-relative-affine-vanishing} | |
| (of course we also use that $R^qf'_*\Omega^p_{X'/S}$ is | |
| quasi-coherent). | |
| Thus the map of the lemma is $\pi_*$ applied to | |
| $\text{d} : R^nf'_*\Omega^{n - 1}_{X/S'} \to R^nf'_*\Omega^n_{X/S'}$. | |
| In other words, in order to prove the lemma we may replace | |
| $f : X \to S$ by $f' : X \to S'$ to reduce to the case discussed | |
| in the next pargraph. | |
| \medskip\noindent | |
| Assume $f$ has geometrically connected fibres and | |
| $f_*\mathcal{O}_X = \mathcal{O}_S$. | |
| For every $s \in S$ we can choose an \'etale neighbourhood | |
| $(S', s') \to (S, s)$ such that the base change $X' \to S'$ of $S$ | |
| has a section. See More on Morphisms, Lemma | |
| \ref{more-morphisms-lemma-etale-nbhd-dominates-smooth}. | |
| By the initial remarks of the proof this reduces us to the case | |
| discussed in the next paragraph. | |
| \medskip\noindent | |
| Assume $f$ has geometrically connected fibres, | |
| $f_*\mathcal{O}_X = \mathcal{O}_S$, and we have | |
| a section $s : S \to X$ of $f$. We may and do assume $S = \Spec(A)$ | |
| is affine. The map | |
| $s^* : R\Gamma(X, \mathcal{O}_X) \to R\Gamma(S, \mathcal{O}_S) = A$ | |
| is a splitting of the map $A \to R\Gamma(X, \mathcal{O}_X)$. Thus we can write | |
| $$ | |
| R\Gamma(X, \mathcal{O}_X) = A \oplus P | |
| $$ | |
| where $P$ is the ``kernel'' of $s^*$. By | |
| Lemma \ref{lemma-relative-bottom-part-degenerates} the object $P$ | |
| of $D(A)$ is perfect of tor amplitude in $[1, n]$. As in the proof | |
| of Lemma \ref{lemma-relative-duality-hodge} we see that | |
| $H^n(X, \Omega^n_{X/S})$ is a locally free $A$-module of rank $1$ | |
| (and in fact dual to $A$ so free of rank $1$ -- we will soon choose | |
| a generator but we don't want to check it is the same generator | |
| nor will it be necessary to do so). | |
| \medskip\noindent | |
| Denote $Z \subset X$ the image of $s$ which is a closed subscheme of $X$ by | |
| Schemes, Lemma \ref{schemes-lemma-section-immersion}. | |
| Observe that $Z \to X$ is a regular (and a fortiori Koszul regular by | |
| Divisors, Lemma \ref{divisors-lemma-regular-quasi-regular-immersion}) | |
| closed immersion by | |
| Divisors, Lemma \ref{divisors-lemma-section-smooth-regular-immersion}. | |
| Of course $Z \to X$ has codimension $n$. Thus by | |
| Remark \ref{remark-how-to-use} | |
| we can consider the map | |
| $$ | |
| \gamma^{0, 0} : H^0(Z, \Omega^0_{Z/S}) \longrightarrow H^n(X, \Omega^n_{X/S}) | |
| $$ | |
| and we set $\xi = \gamma^{0, 0}(1) \in H^n(X, \Omega^n_{X/S})$. | |
| \medskip\noindent | |
| We claim $\xi$ is a basis element. Namely, since we have base change in | |
| top degree (see for example Limits, Lemma | |
| \ref{limits-lemma-higher-direct-images-zero-above-dimension-fibre}) | |
| we see that | |
| $H^n(X, \Omega^n_{X/S}) \otimes_A k = H^n(X_k, \Omega^n_{X_k/k})$ | |
| for any ring map $A \to k$. By the compatibility of | |
| the construction of $\xi$ with base change, | |
| see Lemma \ref{lemma-gysin-transverse-global}, | |
| we see that the image of $\xi$ in $H^n(X_k, \Omega^n_{X_k/k})$ | |
| is nonzero by Lemma \ref{lemma-class-of-a-point} if $k$ is a field. | |
| Thus $\xi$ is a nowhere vanishing section of an invertible module | |
| and hence a generator. | |
| \medskip\noindent | |
| Let $\theta \in H^n(X, \Omega^{n - 1}_{X/S})$. We have to show that | |
| $\text{d}(\theta)$ is zero in $H^n(X, \Omega^n_{X/S})$. | |
| We may write $\text{d}(\theta) = a \xi$ for some $a \in A$ | |
| as $\xi$ is a basis element. Then we have to show $a = 0$. | |
| \medskip\noindent | |
| Consider the closed immersion | |
| $$ | |
| \Delta : X \to X \times_S X | |
| $$ | |
| This is also a section of a smooth morphism (namely either projection) | |
| and hence a regular and Koszul immersion of codimension $n$ as well. | |
| Thus we can consider the maps | |
| $$ | |
| \gamma^{p, q} : | |
| H^q(X, \Omega^p_{X/S}) | |
| \longrightarrow | |
| H^{q + n}(X \times_S X, \Omega^{p + n}_{X \times_S X/S}) | |
| $$ | |
| of Remark \ref{remark-how-to-use}. Consider the image | |
| $$ | |
| \gamma^{n - 1, n}(\theta) \in | |
| H^{2n}(X \times_S X, \Omega^{2n - 1}_{X \times_S X}) | |
| $$ | |
| By Lemma \ref{lemma-de-rham-complex-product} we have | |
| $$ | |
| \Omega^{2n - 1}_{X \times_S X} = | |
| \Omega^{n - 1}_{X/S} \boxtimes \Omega^n_{X/S} \oplus | |
| \Omega^n_{X/S} \boxtimes \Omega^{n - 1}_{X/S} | |
| $$ | |
| By the K\"unneth formula (either | |
| Derived Categories of Schemes, Lemma \ref{perfect-lemma-kunneth} or | |
| Derived Categories of Schemes, Lemma \ref{perfect-lemma-kunneth-single-sheaf}) | |
| we see that | |
| $$ | |
| H^{2n}(X \times_S X, \Omega^{n - 1}_{X/S} \boxtimes \Omega^n_{X/S}) = | |
| H^n(X, \Omega^{n - 1}_{X/S}) \otimes_A H^n(X, \Omega^n_{X/S}) | |
| $$ | |
| and | |
| $$ | |
| H^{2n}(X \times_S X, \Omega^n_{X/S} \boxtimes \Omega^{n - 1}_{X/S}) = | |
| H^n(X, \Omega^n_{X/S}) \otimes_A H^n(X, \Omega^{n - 1}_{X/S}) | |
| $$ | |
| Namely, since we are looking in top degree there no higher tor groups | |
| that intervene. Combined with the fact that $\xi$ is a generator this means | |
| we can write | |
| $$ | |
| \gamma^{n - 1, n}(\theta) = \theta_1 \otimes \xi + \xi \otimes \theta_2 | |
| $$ | |
| with $\theta_1, \theta_2 \in H^n(X, \Omega^{n - 1}_{X/S})$. | |
| Arguing in exactly the same manner we can write | |
| $$ | |
| \gamma^{n, n}(\xi) = b \xi \otimes \xi | |
| $$ | |
| in | |
| $H^{2n}(X \times_S X, \Omega^{2n}_{X \times_S X/S}) = | |
| H^n(X, \Omega^n_{X/S}) \otimes_A H^n(X, \Omega^n_{X/S})$ | |
| for some $b \in H^0(S, \mathcal{O}_S)$. | |
| \medskip\noindent | |
| {\bf Claim:} $\theta_1 = \theta$, $\theta_2 = \theta$, and $b = 1$. | |
| Let us show that the claim implies the desired result $a = 0$. | |
| Namely, by Lemma \ref{lemma-gysin-differential-hodge} | |
| we have | |
| $$ | |
| \gamma^{n, n}(\text{d}(\theta)) = \text{d}(\gamma^{n - 1, n}(\theta)) | |
| $$ | |
| By our choices above this gives | |
| $$ | |
| a \xi \otimes \xi = | |
| \gamma^{n, n}(a\xi) = | |
| \text{d}(\theta \otimes \xi + \xi \otimes \theta) = | |
| a \xi \otimes \xi + (-1)^n a \xi \otimes \xi | |
| $$ | |
| The right most equality comes from the fact that the map | |
| $\text{d} : \Omega^{2n - 1}_{X \otimes_S X/S} \to \Omega^{2n}_{X \times_S X/S}$ | |
| by Lemma \ref{lemma-de-rham-complex-product} | |
| is the sum of the differential | |
| $\text{d} \boxtimes 1 : \Omega^{n - 1}_{X/S} \boxtimes \Omega^n_{X/S} | |
| \to \Omega^n_{X/S} \boxtimes \Omega^n_{X/S}$ | |
| and the differential | |
| $(-1)^n 1 \boxtimes \text{d} : \Omega^n_{X/S} \boxtimes \Omega^{n - 1}_{X/S} | |
| \to \Omega^n_{X/S} \boxtimes \Omega^n_{X/S}$. Please see discussion in | |
| Section \ref{section-kunneth} and | |
| Derived Categories of Schemes, Section | |
| \ref{perfect-section-kunneth-complexes} for more information. | |
| Since $\xi \otimes \xi$ is a basis for the rank $1$ free $A$-module | |
| $H^n(X, \Omega^n_{X/S}) \otimes_A H^n(X, \Omega^n_{X/S})$ | |
| we conclude | |
| $$ | |
| a = a + (-1)^n a \Rightarrow a = 0 | |
| $$ | |
| as desired. | |
| \medskip\noindent | |
| In the rest of the proof we prove the claim above. Let us denote | |
| $\eta = \gamma^{0, 0}(1) \in H^n(X \times_S X, \Omega^n_{X \times_S X/S})$. | |
| Since $\Omega^n_{X \times_S X/S} = | |
| \bigoplus_{p + p' = n} \Omega^p_{X/S} \boxtimes \Omega^{p'}_{X/S}$ | |
| we may write | |
| $$ | |
| \eta = \eta_0 + \eta_1 + \ldots + \eta_n | |
| $$ | |
| where $\eta_p$ is in | |
| $H^n(X \times_S X, \Omega^p_{X/S} \boxtimes \Omega^{n - p}_{X/S})$. | |
| For $p = 0$ we can write | |
| \begin{align*} | |
| H^n(X \times_S X, \mathcal{O}_X \boxtimes \Omega^n_{X/S}) | |
| & = | |
| H^n(R\Gamma(X, \mathcal{O}_X) \otimes_A^\mathbf{L} | |
| R\Gamma(X, \Omega^n_{X/S})) \\ | |
| & = | |
| A \otimes_A H^n(X, \Omega^n_{X/S}) \oplus | |
| H^n(P \otimes_A^\mathbf{L} R\Gamma(X, \Omega^n_{X/S})) | |
| \end{align*} | |
| by our previously given decomposition $R\Gamma(X, \mathcal{O}_X) = A \oplus P$. | |
| Consider the morphism $(s, \text{id}) : X \to X \times_S X$. | |
| Then $(s, \text{id})^{-1}(\Delta) = Z$ scheme theoretically. | |
| Hence we see that $(s, \text{id})^*\eta = \xi$ by | |
| Lemma \ref{lemma-gysin-transverse-global}. This means that | |
| $$ | |
| \xi = (s, \text{id})^*\eta = (s^* \otimes \text{id})(\eta_0) | |
| $$ | |
| This means exactly that the first component of $\eta_0$ | |
| in the direct sum decomposition above is $\xi$. In other words, we can write | |
| $$ | |
| \eta_0 = 1 \otimes \xi + \eta'_0 | |
| $$ | |
| with $\eta'_0 \in H^n(P \otimes_A^\mathbf{L} R\Gamma(X, \Omega^n_{X/S}))$. | |
| In exactly the same manner for $p = n$ we can write | |
| \begin{align*} | |
| H^n(X \times_S X, \Omega^n_{X/S} \boxtimes \mathcal{O}_X) | |
| & = | |
| H^n(R\Gamma(X, \Omega^n_{X/S}) \otimes_A^\mathbf{L} | |
| R\Gamma(X, \mathcal{O}_X)) \\ | |
| & = | |
| H^n(X, \Omega^n_{X/S}) \otimes_A A \oplus | |
| H^n(R\Gamma(X, \Omega^n_{X/S}) \otimes_A^\mathbf{L} P) | |
| \end{align*} | |
| and we can write | |
| $$ | |
| \eta_n = \xi \otimes 1 + \eta'_n | |
| $$ | |
| with $\eta'_n \in H^n(R\Gamma(X, \Omega^n_{X/S}) \otimes_A^\mathbf{L} P)$. | |
| \medskip\noindent | |
| Observe that $\text{pr}_1^*\theta = \theta \otimes 1$ | |
| and $\text{pr}_2^*\theta = 1 \otimes \theta$ are | |
| Hodge cohomology classes on | |
| $X \times_S X$ which pull back to $\theta$ by $\Delta$. | |
| Hence by Lemma \ref{lemma-gysin-projection-global} we have | |
| $$ | |
| \theta_1 \otimes \xi + \xi \otimes \theta_2 = | |
| \gamma^{n - 1, n}(\theta) = | |
| (\theta \otimes 1) \cup \eta = | |
| (1 \otimes \theta) \cup \eta | |
| $$ | |
| in the Hodge cohomology ring of $X \times_S X$ over $S$. | |
| In terms of the direct sum decomposition on the modules | |
| of differentials of $X \times_S X/S$ we obtain | |
| $$ | |
| \theta_1 \otimes \xi = | |
| (\theta \otimes 1) \cup \eta_0 | |
| \quad\text{and}\quad | |
| \xi \otimes \theta_2 = | |
| (1 \otimes \theta) \cup \eta_n | |
| $$ | |
| Looking at the formula $\eta_0 = 1 \otimes \xi + \eta'_0$ we found above, | |
| we see that to show that $\theta_1 = \theta$ it suffices to prove that | |
| $$ | |
| (\theta \otimes 1) \cup \eta'_0 = 0 | |
| $$ | |
| To do this, observe that cupping with $\theta \otimes 1$ is given | |
| by the action on cohomology of the map | |
| $$ | |
| (P \otimes_A^\mathbf{L} R\Gamma(X, \Omega^n_{X/S}))[-n] | |
| \xrightarrow{\theta \otimes 1} | |
| R\Gamma(X, \Omega^{n - 1}_{X/S}) \otimes_A^\mathbf{L} | |
| R\Gamma(X, \Omega^n_{X/S}) | |
| $$ | |
| in the derived category, see Cohomology, Remark | |
| \ref{cohomology-remark-cup-with-element-map-total-cohomology}. | |
| This map is the derived tensor product of the two maps | |
| $$ | |
| \theta : P[-n] \to R\Gamma(X, \Omega^{n - 1}_{X/S}) | |
| \quad\text{and}\quad | |
| 1 : R\Gamma(X, \Omega^n_{X/S}) \to R\Gamma(X, \Omega^n_{X/S}) | |
| $$ | |
| by Derived Categories of Schemes, Remark | |
| \ref{perfect-remark-annoying-compatibility}. | |
| However, the first of these is zero in $D(A)$ because it is a map from | |
| a perfect complex of tor amplitude in $[n + 1, 2n]$ to a complex | |
| with cohomology only in degrees $0, 1, \ldots, n$, see | |
| More on Algebra, Lemma \ref{more-algebra-lemma-splitting-unique}. | |
| A similar argument works to show the vanishing of | |
| $(1 \otimes \theta) \cup \eta'_n$. Finally, | |
| in exactly the same manner we obtain | |
| $$ | |
| b \xi \otimes \xi = \gamma^{n, n}(\xi) = (\xi \otimes 1) \cup \eta_0 | |
| $$ | |
| and we conclude as before by showing that | |
| $(\xi \otimes 1) \cup \eta'_0 = 0$ in the same manner as above. | |
| This finishes the proof. | |
| \end{proof} | |
| \begin{proposition} | |
| \label{proposition-relative-poincare-duality} | |
| Let $S$ be a quasi-compact and quasi-separated scheme. Let $f : X \to S$ | |
| be a proper smooth morphism of schemes all of whose fibres are nonempty | |
| and equidimensional of dimension $n$. There exists an | |
| $\mathcal{O}_S$-module map | |
| $$ | |
| t : R^{2n}f_*\Omega^\bullet_{X/S} \longrightarrow \mathcal{O}_S | |
| $$ | |
| unique up to precomposing by multiplication by a unit of | |
| $H^0(X, \mathcal{O}_X)$ with the following property: the pairing | |
| $$ | |
| Rf_*\Omega^\bullet_{X/S} | |
| \otimes_{\mathcal{O}_S}^\mathbf{L} | |
| Rf_*\Omega^\bullet_{X/S}[2n] | |
| \longrightarrow | |
| \mathcal{O}_S, \quad | |
| (\xi, \xi') \longmapsto t(\xi \cup \xi') | |
| $$ | |
| is a perfect pairing of perfect complexes on $S$. | |
| \end{proposition} | |
| \begin{proof} | |
| The proof is exactly the same as the proof of | |
| Proposition \ref{proposition-poincare-duality}. | |
| \medskip\noindent | |
| By the relative Hodge-to-de Rham spectral sequence | |
| $$ | |
| E_1^{p, q} = R^qf_*\Omega^p_{X/S} \Rightarrow R^{p + q}f_*\Omega^\bullet_{X/S} | |
| $$ | |
| (Section \ref{section-hodge-to-de-rham}), the vanishing | |
| of $\Omega^i_{X/S}$ for $i > n$, the vanishing in for example Limits, Lemma | |
| \ref{limits-lemma-higher-direct-images-zero-above-dimension-fibre} | |
| and the results of Lemmas \ref{lemma-relative-bottom-part-degenerates} and | |
| \ref{lemma-relative-top-part-degenerates} | |
| we see that $R^0f_*\Omega_{X/S} = R^0f_*\mathcal{O}_X$ | |
| and $R^nf_*\Omega^n_{X/S} = R^{2n}f_*\Omega^\bullet_{X/S}$. | |
| More precisesly, these identifications come from the maps | |
| of complexes | |
| $$ | |
| \Omega^\bullet_{X/S} \to \mathcal{O}_X[0] | |
| \quad\text{and}\quad | |
| \Omega^n_{X/S}[-n] \to \Omega^\bullet_{X/S} | |
| $$ | |
| Let us choose $t : R^{2n}f_*\Omega_{X/S} \to \mathcal{O}_S$ | |
| which via this identification corresponds to a $t$ as in | |
| Lemma \ref{lemma-relative-duality-hodge}. | |
| \medskip\noindent | |
| Let us abbreviate $\Omega^\bullet = \Omega^\bullet_{X/S}$. | |
| Consider the map (\ref{equation-wedge}) which in our situation reads | |
| $$ | |
| \wedge : | |
| \text{Tot}(\Omega^\bullet \otimes_{f^{-1}\mathcal{O}_S} \Omega^\bullet) | |
| \longrightarrow | |
| \Omega^\bullet | |
| $$ | |
| For every integer $p = 0, 1, \ldots, n$ this map annihilates the subcomplex | |
| $\text{Tot}(\sigma_{> p} \Omega^\bullet \otimes_{f^{-1}\mathcal{O}_S} | |
| \sigma_{\geq n - p} \Omega^\bullet)$ for degree reasons. | |
| Hence we find that the restriction of $\wedge$ to the subcomplex | |
| $\text{Tot}(\Omega^\bullet \otimes_{f^{-1}\mathcal{O}_S} | |
| \geq_{n - p}\Omega^\bullet)$ factors through a map of complexes | |
| $$ | |
| \gamma_p : | |
| \text{Tot}(\sigma_{\leq p} \Omega^\bullet \otimes_{f^{-1}\mathcal{O}_S} | |
| \sigma_{\geq n - p} \Omega^\bullet) | |
| \longrightarrow | |
| \Omega^\bullet | |
| $$ | |
| Using the same procedure as in Section \ref{section-cup-product} we obtain | |
| relative cup products | |
| $$ | |
| Rf_*\sigma_{\leq p} \Omega^\bullet | |
| \otimes_{\mathcal{O}_S}^\mathbf{L} | |
| Rf_*\sigma_{\geq n - p}\Omega^\bullet | |
| \longrightarrow | |
| Rf_*\Omega^\bullet | |
| $$ | |
| We will prove by induction on $p$ that these cup products via $t$ | |
| induce perfect pairings between $Rf_*\sigma_{\leq p} \Omega^\bullet$ | |
| and $Rf_*\sigma_{\geq n - p}\Omega^\bullet[2n]$. For $p = n$ | |
| this is the assertion of the proposition. | |
| \medskip\noindent | |
| The base case is $p = 0$. In this case we have | |
| $$ | |
| Rf_*\sigma_{\leq p}\Omega^\bullet = Rf_*\mathcal{O}_X | |
| \quad\text{and}\quad | |
| Rf_*\sigma_{\geq n - p}\Omega^\bullet[2n] = Rf_*(\Omega^n[-n])[2n] = | |
| Rf_*\Omega^n[n] | |
| $$ | |
| In this case we simply obtain the pairing | |
| between $Rf_*\mathcal{O}_X$ and $Rf_*\Omega^n[n]$ of | |
| Lemma \ref{lemma-relative-duality-hodge} and the result is true. | |
| \medskip\noindent | |
| Induction step. Say we know the result is true for $p$. Then | |
| we consider the distinguished triangle | |
| $$ | |
| \Omega^{p + 1}[-p - 1] \to | |
| \sigma_{\leq p + 1}\Omega^\bullet \to | |
| \sigma_{\leq p}\Omega^\bullet \to | |
| \Omega^{p + 1}[-p] | |
| $$ | |
| and the distinguished triangle | |
| $$ | |
| \sigma_{\geq n - p}\Omega^\bullet \to | |
| \sigma_{\geq n - p - 1}\Omega^\bullet \to | |
| \Omega^{n - p - 1}[-n + p + 1] \to | |
| (\sigma_{\geq n - p}\Omega^\bullet)[1] | |
| $$ | |
| Observe that both are distinguished triangles in the homotopy category | |
| of complexes of sheaves of $f^{-1}\mathcal{O}_S$-modules; in particular the | |
| maps $\sigma_{\leq p}\Omega^\bullet \to \Omega^{p + 1}[-p]$ and | |
| $\Omega^{n - p - 1}[-d + p + 1] \to (\sigma_{\geq n - p}\Omega^\bullet)[1]$ | |
| are given by actual maps of complexes, namely using the differential | |
| $\Omega^p \to \Omega^{p + 1}$ and the differential | |
| $\Omega^{n - p - 1} \to \Omega^{n - p}$. | |
| Consider the distinguished triangles associated gotten from these | |
| distinguished triangles by applying $Rf_*$ | |
| $$ | |
| \xymatrix{ | |
| Rf_*\sigma_{\leq p}\Omega^\bullet \ar[d]_a \\ | |
| Rf_*\Omega^{p + 1}[-p - 1] \ar[d]_b \\ | |
| Rf_*\sigma_{\leq p + 1}\Omega^\bullet \ar[d]_c \\ | |
| Rf_*\sigma_{\leq p}\Omega^\bullet \ar[d]_d \\ | |
| Rf_*\Omega^{p + 1}[-p - 1] | |
| } | |
| \quad\quad | |
| \xymatrix{ | |
| Rf_*\sigma_{\geq n - p}\Omega^\bullet \\ | |
| Rf_*\Omega^{n - p - 1}[-n + p + 1] \ar[u]_{a'} \\ | |
| Rf_*\sigma_{\geq n - p - 1}\Omega^\bullet \ar[u]_{b'} \\ | |
| Rf_*\sigma_{\geq n - p}\Omega^\bullet \ar[u]_{c'} \\ | |
| Rf_*\Omega^{n - p - 1}[-n + p + 1] \ar[u]_{d'} | |
| } | |
| $$ | |
| We will show below that the pairs $(a, a')$, $(b, b')$, $(c, c')$, and | |
| $(d, d')$ are compatible with the given pairings. This means we obtain a | |
| map from the distinguished triangle on the left to the distuiguished triangle | |
| obtained by applying $R\SheafHom(-, \mathcal{O}_S)$ to the distinguished | |
| triangle on the right. By induction and Lemma \ref{lemma-duality-hodge} | |
| we know that the pairings constructed above between the | |
| complexes on the first, second, fourth, and fifth | |
| rows are perfect, i.e., determine isomorphisms after taking duals. | |
| By Derived Categories, Lemma \ref{derived-lemma-third-isomorphism-triangle} | |
| we conclude the pairing between the complexes in the middle row | |
| is perfect as desired. | |
| \medskip\noindent | |
| Let $e : K \to K'$ and $e' : M' \to M$ be maps of objects | |
| of $D(\mathcal{O}_S)$ and let | |
| $K \otimes_{\mathcal{O}_S}^\mathbf{L} M \to \mathcal{O}_S$ and | |
| $K' \otimes_{\mathcal{O}_S}^\mathbf{L} M' \to \mathcal{O}_S$ | |
| be pairings. Then we say these pairings are compatible if the | |
| diagram | |
| $$ | |
| \xymatrix{ | |
| K' \otimes_{\mathcal{O}_S}^\mathbf{L} M' \ar[d] & | |
| K \otimes_{\mathcal{O}_S}^\mathbf{L} M' | |
| \ar[l]^{e \otimes 1} \ar[d]^{1 \otimes e'} \\ | |
| \mathcal{O}_S & | |
| K \otimes_{\mathcal{O}_S}^\mathbf{L} M \ar[l] | |
| } | |
| $$ | |
| commutes. This indeed means that the diagram | |
| $$ | |
| \xymatrix{ | |
| K \ar[r] \ar[d]_e & R\SheafHom(M, \mathcal{O}_S) \ar[d]^{R\SheafHom(e', -)} \\ | |
| K' \ar[r] & R\SheafHom(M', \mathcal{O}_S) | |
| } | |
| $$ | |
| commutes and hence is sufficient for our purposes. | |
| \medskip\noindent | |
| Let us prove this for the pair $(c, c')$. Here we observe simply | |
| that we have a commutative diagram | |
| $$ | |
| \xymatrix{ | |
| \text{Tot}(\sigma_{\leq p} \Omega^\bullet \otimes_{f^{-1}\mathcal{O}_S} | |
| \sigma_{\geq n - p} \Omega^\bullet) \ar[d]_{\gamma_p} & | |
| \text{Tot}(\sigma_{\leq p + 1} \Omega^\bullet \otimes_{f^{-1}\mathcal{O}_S} | |
| \sigma_{\geq n - p} \Omega^\bullet) \ar[l] \ar[d] \\ | |
| \Omega^\bullet & | |
| \text{Tot}(\sigma_{\leq p + 1} \Omega^\bullet \otimes_{f^{-1}\mathcal{O}_S} | |
| \sigma_{\geq n - p - 1} \Omega^\bullet) \ar[l]_-{\gamma_{p + 1}} | |
| } | |
| $$ | |
| By functoriality of the cup product we obtain commutativity of the | |
| desired diagram. | |
| \medskip\noindent | |
| Similarly for the pair $(b, b')$ we use the commutative diagram | |
| $$ | |
| \xymatrix{ | |
| \text{Tot}(\sigma_{\leq p + 1} \Omega^\bullet \otimes_{f^{-1}\mathcal{O}_S} | |
| \sigma_{\geq n - p - 1} \Omega^\bullet) \ar[d]_{\gamma_{p + 1}} & | |
| \text{Tot}(\Omega^{p + 1}[-p - 1] \otimes_{f^{-1}\mathcal{O}_S} | |
| \sigma_{\geq n - p - 1} \Omega^\bullet) \ar[l] \ar[d] \\ | |
| \Omega^\bullet & | |
| \Omega^{p + 1}[-p - 1] | |
| \otimes_{f^{-1}\mathcal{O}_S} | |
| \Omega^{n - p - 1}[-n + p + 1] \ar[l]_-\wedge | |
| } | |
| $$ | |
| \medskip\noindent | |
| For the pairs $(d, d')$ and $(a, a')$ we use the commutative diagram | |
| $$ | |
| \xymatrix{ | |
| \Omega^{p + 1}[-p] \otimes_{f^{-1}\mathcal{O}_S} | |
| \Omega^{n - p - 1}[-n + p] \ar[d] & | |
| \text{Tot}(\sigma_{\leq p}\Omega^\bullet \otimes_{f^{-1}\mathcal{O}_S} | |
| \Omega^{n - p - 1}[-n + p]) \ar[l] \ar[d] \\ | |
| \Omega^\bullet & | |
| \text{Tot}(\sigma_{\leq p}\Omega^\bullet \otimes_{f^{-1}\mathcal{O}_S} | |
| \sigma_{\geq n - p}\Omega^\bullet) \ar[l] | |
| } | |
| $$ | |
| \medskip\noindent | |
| We omit the argument showing the uniqueness of $t$ up to | |
| precomposing by multiplication by a unit in $H^0(X, \mathcal{O}_X)$. | |
| \end{proof} | |
| \input{chapters} | |
| \bibliography{my} | |
| \bibliographystyle{amsalpha} | |
| \end{document} | |