(* Author: René Thiemann Akihisa Yamada Contributors: Manuel Eberl (algebraic integers) License: BSD *) section \Algebraic Numbers: Addition and Multiplication\ text \This theory contains the remaining field operations for algebraic numbers, namely addition and multiplication.\ theory Algebraic_Numbers imports Algebraic_Numbers_Prelim Resultant Polynomial_Factorization.Polynomial_Divisibility begin interpretation coeff_hom: monoid_add_hom "\p. coeff p i" by (unfold_locales, auto) interpretation coeff_hom: comm_monoid_add_hom "\p. coeff p i".. interpretation coeff_hom: group_add_hom "\p. coeff p i".. interpretation coeff_hom: ab_group_add_hom "\p. coeff p i".. interpretation coeff_0_hom: monoid_mult_hom "\p. coeff p 0" by (unfold_locales, auto simp: coeff_mult) interpretation coeff_0_hom: semiring_hom "\p. coeff p 0".. interpretation coeff_0_hom: comm_monoid_mult_hom "\p. coeff p 0".. interpretation coeff_0_hom: comm_semiring_hom "\p. coeff p 0".. subsection \Addition of Algebraic Numbers\ definition "x_y \ [: [: 0, 1 :], -1 :]" definition "poly_x_minus_y p = poly_lift p \\<^sub>p x_y" lemma coeff_xy_power: assumes "k \ n" shows "coeff (x_y ^ n :: 'a :: comm_ring_1 poly poly) k = monom (of_nat (n choose (n - k)) * (- 1) ^ k) (n - k)" proof - define X :: "'a poly poly" where "X = monom (monom 1 1) 0" define Y :: "'a poly poly" where "Y = monom (-1) 1" have [simp]: "monom 1 b * (-1) ^ k = monom ((-1)^k :: 'a) b" for b k by (auto simp: monom_altdef minus_one_power_iff) have "(X + Y) ^ n = (\i\n. of_nat (n choose i) * X ^ i * Y ^ (n - i))" by (subst binomial_ring) auto also have "\ = (\i\n. of_nat (n choose i) * monom (monom ((-1) ^ (n - i)) i) (n - i))" by (simp add: X_def Y_def monom_power mult_monom mult.assoc) also have "\ = (\i\n. monom (monom (of_nat (n choose i) * (-1) ^ (n - i)) i) (n - i))" by (simp add: of_nat_poly smult_monom) also have "coeff \ k = (\i\n. if n - i = k then monom (of_nat (n choose i) * (- 1) ^ (n - i)) i else 0)" by (simp add: of_nat_poly coeff_sum) also have "\ = (\i\{n-k}. monom (of_nat (n choose i) * (- 1) ^ (n - i)) i)" using \k \ n\ by (intro sum.mono_neutral_cong_right) auto also have "X + Y = x_y" by (simp add: X_def Y_def x_y_def monom_altdef) finally show ?thesis using \k \ n\ by simp qed text \The following polynomial represents the sum of two algebraic numbers.\ definition poly_add :: "'a :: comm_ring_1 poly \ 'a poly \ 'a poly" where "poly_add p q = resultant (poly_x_minus_y p) (poly_lift q)" subsubsection \@{term poly_add} has desired root\ interpretation poly_x_minus_y_hom: comm_ring_hom poly_x_minus_y by (unfold_locales; simp add: poly_x_minus_y_def hom_distribs) lemma poly2_x_y[simp]: fixes x :: "'a :: comm_ring_1" shows "poly2 x_y x y = x - y" unfolding poly2_def by (simp add: x_y_def) lemma degree_poly_x_minus_y[simp]: fixes p :: "'a::idom poly" shows "degree (poly_x_minus_y p) = degree p" unfolding poly_x_minus_y_def x_y_def by auto lemma poly_x_minus_y_pCons[simp]: "poly_x_minus_y (pCons a p) = [:[: a :]:] + poly_x_minus_y p * x_y" unfolding poly_x_minus_y_def x_y_def by simp lemma poly_poly_poly_x_minus_y[simp]: fixes p :: "'a :: comm_ring_1 poly" shows "poly (poly (poly_x_minus_y p) q) x = poly p (x - poly q x)" by (induct p; simp add: ring_distribs x_y_def) lemma poly2_poly_x_minus_y[simp]: fixes p :: "'a :: comm_ring_1 poly" shows "poly2 (poly_x_minus_y p) x y = poly p (x-y)" unfolding poly2_def by simp interpretation x_y_mult_hom: zero_hom_0 "\p :: 'a :: comm_ring_1 poly poly. x_y * p" proof (unfold_locales) fix p :: "'a poly poly" assume "x_y * p = 0" then show "p = 0" apply (simp add: x_y_def) by (metis eq_neg_iff_add_eq_0 minus_equation_iff minus_pCons synthetic_div_unique_lemma) qed lemma x_y_nonzero[simp]: "x_y \ 0" by (simp add: x_y_def) lemma degree_x_y[simp]: "degree x_y = 1" by (simp add: x_y_def) interpretation x_y_mult_hom: inj_comm_monoid_add_hom "\p :: 'a :: idom poly poly. x_y * p" proof (unfold_locales) show "x_y * p = x_y * q \ p = q" for p q :: "'a poly poly" proof (induct p arbitrary:q) case 0 then show ?case by simp next case p: (pCons a p) from p(3)[unfolded mult_pCons_right] have "x_y * (monom a 0 + pCons 0 1 * p) = x_y * q" apply (subst(asm) pCons_0_as_mult) apply (subst(asm) smult_prod) by (simp only: field_simps distrib_left) then have "monom a 0 + pCons 0 1 * p = q" by simp then show "pCons a p = q" using pCons_as_add by (simp add: monom_0 monom_Suc) qed qed interpretation poly_x_minus_y_hom: inj_idom_hom poly_x_minus_y proof fix p :: "'a poly" assume 0: "poly_x_minus_y p = 0" then have "poly_lift p \\<^sub>p x_y = 0" by (simp add: poly_x_minus_y_def) then show "p = 0" proof (induct p) case 0 then show ?case by simp next case (pCons a p) note p = this[unfolded poly_lift_pCons pcompose_pCons] show ?case proof (cases "a=0") case a0: True with p have "x_y * poly_lift p \\<^sub>p x_y = 0" by simp then have "poly_lift p \\<^sub>p x_y = 0" by simp then show ?thesis using p by simp next case a0: False with p have p0: "p \ 0" by auto from p have "[:[:a:]:] = - x_y * poly_lift p \\<^sub>p x_y" by (simp add: eq_neg_iff_add_eq_0) then have "degree [:[:a:]:] = degree (x_y * poly_lift p \\<^sub>p x_y)" by simp also have "... = degree (x_y::'a poly poly) + degree (poly_lift p \\<^sub>p x_y)" apply (subst degree_mult_eq) apply simp apply (subst pcompose_eq_0) apply (simp add: x_y_def) apply (simp add: p0) apply simp done finally have False by simp then show ?thesis.. qed qed qed lemma poly_add: fixes p q :: "'a ::comm_ring_1 poly" assumes q0: "q \ 0" and x: "poly p x = 0" and y: "poly q y = 0" shows "poly (poly_add p q) (x+y) = 0" proof (unfold poly_add_def, rule poly_resultant_zero[OF disjI2]) have "degree q > 0" using poly_zero q0 y by auto thus degq: "degree (poly_lift q) > 0" by auto qed (insert x y, simp_all) subsubsection \@{const poly_add} is nonzero\ text \ We first prove that @{const poly_lift} preserves factorization. The result will be essential also in the next section for division of algebraic numbers. \ interpretation poly_lift_hom: unit_preserving_hom "poly_lift :: 'a :: {comm_semiring_1,semiring_no_zero_divisors} poly \ _" proof fix x :: "'a poly" assume "poly_lift x dvd 1" then have "poly_y_x (poly_lift x) dvd poly_y_x 1" by simp then show "x dvd 1" by (auto simp add: poly_y_x_poly_lift) qed interpretation poly_lift_hom: factor_preserving_hom "poly_lift::'a::idom poly \ 'a poly poly" proof unfold_locales fix p :: "'a poly" assume p: "irreducible p" show "irreducible (poly_lift p)" proof(rule ccontr) from p have p0: "p \ 0" and "\ p dvd 1" by (auto dest: irreducible_not_unit) with poly_lift_hom.hom_dvd[of p 1] have p1: "\ poly_lift p dvd 1" by auto assume "\ irreducible (poly_lift p)" from this[unfolded irreducible_altdef,simplified] p0 p1 obtain q where "q dvd poly_lift p" and pq: "\ poly_lift p dvd q" and q: "\ q dvd 1" by auto then obtain r where "q * r = poly_lift p" by (elim dvdE, auto) then have "poly_y_x (q * r) = poly_y_x (poly_lift p)" by auto also have "... = [:p:]" by (auto simp: poly_y_x_poly_lift monom_0) also have "poly_y_x (q * r) = poly_y_x q * poly_y_x r" by (auto simp: hom_distribs) finally have "... = [:p:]" by auto then have qp: "poly_y_x q dvd [:p:]" by (metis dvdI) from dvd_const[OF this] p0 have "degree (poly_y_x q) = 0" by auto from degree_0_id[OF this,symmetric] obtain s where qs: "poly_y_x q = [:s:]" by auto have "poly_lift s = poly_y_x (poly_y_x (poly_lift s))" by auto also have "... = poly_y_x [:s:]" by (auto simp: poly_y_x_poly_lift monom_0) also have "... = q" by (auto simp: qs[symmetric]) finally have sq: "poly_lift s = q" by auto from qp[unfolded qs] have sp: "s dvd p" by (auto simp: const_poly_dvd) from irreducibleD'[OF p this] sq q pq show False by auto qed qed text \ We now show that @{const poly_x_minus_y} is a factor-preserving homomorphism. This is essential for this section. This is easy since @{const poly_x_minus_y} can be represented as the composition of two factor-preserving homomorphisms. \ lemma poly_x_minus_y_as_comp: "poly_x_minus_y = (\p. p \\<^sub>p x_y) \ poly_lift" by (intro ext, unfold poly_x_minus_y_def, auto) context idom_isom begin sublocale comm_semiring_isom.. end interpretation poly_x_minus_y_hom: factor_preserving_hom "poly_x_minus_y :: 'a :: idom poly \ 'a poly poly" proof - have \p \\<^sub>p x_y \\<^sub>p x_y = p\ for p :: \'a poly poly\ proof (induction p) case 0 show ?case by simp next case (pCons a p) then show ?case by (unfold x_y_def hom_distribs pcompose_pCons) simp qed then interpret x_y_hom: bijective "\p :: 'a poly poly. p \\<^sub>p x_y" by (unfold bijective_eq_bij) (rule involuntory_imp_bij) interpret x_y_hom: idom_isom "\p :: 'a poly poly. p \\<^sub>p x_y" by standard simp_all have \factor_preserving_hom (\p :: 'a poly poly. p \\<^sub>p x_y)\ and \factor_preserving_hom (poly_lift :: 'a poly \ 'a poly poly)\ .. then show "factor_preserving_hom (poly_x_minus_y :: 'a poly \ _)" by (unfold poly_x_minus_y_as_comp) (rule factor_preserving_hom_comp) qed text \ Now we show that results of @{const poly_x_minus_y} and @{const poly_lift} are coprime. \ lemma poly_y_x_const[simp]: "poly_y_x [:[:a:]:] = [:[:a:]:]" by (simp add: poly_y_x_def monom_0) context begin private abbreviation "y_x == [: [: 0, -1 :], 1 :]" lemma poly_y_x_x_y[simp]: "poly_y_x x_y = y_x" by (simp add: x_y_def poly_y_x_def monom_Suc monom_0) private lemma y_x[simp]: fixes x :: "'a :: comm_ring_1" shows "poly2 y_x x y = y - x" unfolding poly2_def by simp private definition "poly_y_minus_x p \ poly_lift p \\<^sub>p y_x" private lemma poly_y_minus_x_0[simp]: "poly_y_minus_x 0 = 0" by (simp add: poly_y_minus_x_def) private lemma poly_y_minus_x_pCons[simp]: "poly_y_minus_x (pCons a p) = [:[: a :]:] + poly_y_minus_x p * y_x" by (simp add: poly_y_minus_x_def) private lemma poly_y_x_poly_x_minus_y: fixes p :: "'a :: idom poly" shows "poly_y_x (poly_x_minus_y p) = poly_y_minus_x p" apply (induct p, simp) apply (unfold poly_x_minus_y_pCons hom_distribs) by simp lemma degree_poly_y_minus_x[simp]: fixes p :: "'a :: idom poly" shows "degree (poly_y_x (poly_x_minus_y p)) = degree p" by (simp add: poly_y_minus_x_def poly_y_x_poly_x_minus_y) end lemma dvd_all_coeffs_iff: fixes x :: "'a :: comm_semiring_1" (* No addition needed! *) shows "(\pi \ set (coeffs p). x dvd pi) \ (\i. x dvd coeff p i)" (is "?l = ?r") proof- have "?r = (\i\{..degree p} \ {Suc (degree p)..}. x dvd coeff p i)" by auto also have "... = (\i\degree p. x dvd coeff p i)" by (auto simp add: ball_Un coeff_eq_0) also have "... = ?l" by (auto simp: coeffs_def) finally show ?thesis.. qed lemma primitive_imp_no_constant_factor: fixes p :: "'a :: {comm_semiring_1, semiring_no_zero_divisors} poly" assumes pr: "primitive p" and F: "mset_factors F p" and fF: "f \# F" shows "degree f \ 0" proof from F fF have irr: "irreducible f" and fp: "f dvd p" by (auto dest: mset_factors_imp_dvd) assume deg: "degree f = 0" then obtain f0 where f0: "f = [:f0:]" by (auto dest: degree0_coeffs) with fp have "[:f0:] dvd p" by simp then have "f0 dvd coeff p i" for i by (simp add: const_poly_dvd_iff) with primitiveD[OF pr] dvd_all_coeffs_iff have "f0 dvd 1" by (auto simp: coeffs_def) with f0 irr show False by auto qed lemma coprime_poly_x_minus_y_poly_lift: fixes p q :: "'a :: ufd poly" assumes degp: "degree p > 0" and degq: "degree q > 0" and pr: "primitive p" shows "coprime (poly_x_minus_y p) (poly_lift q)" proof(rule ccontr) from degp have p: "\ p dvd 1" by (auto simp: dvd_const) from degp have p0: "p \ 0" by auto from mset_factors_exist[of p, OF p0 p] obtain F where F: "mset_factors F p" by auto with poly_x_minus_y_hom.hom_mset_factors have pF: "mset_factors (image_mset poly_x_minus_y F) (poly_x_minus_y p)" by auto from degq have q: "\ q dvd 1" by (auto simp: dvd_const) from degq have q0: "q \ 0" by auto from mset_factors_exist[OF q0 q] obtain G where G: "mset_factors G q" by auto with poly_lift_hom.hom_mset_factors have pG: "mset_factors (image_mset poly_lift G) (poly_lift q)" by auto assume "\ coprime (poly_x_minus_y p) (poly_lift q)" from this[unfolded not_coprime_iff_common_factor] obtain r where rp: "r dvd (poly_x_minus_y p)" and rq: "r dvd (poly_lift q)" and rU: "\ r dvd 1" by auto note poly_lift_hom.hom_dvd from rp p0 have r0: "r \ 0" by auto from mset_factors_exist[OF r0 rU] obtain H where H: "mset_factors H r" by auto then have "H \ {#}" by auto then obtain h where hH: "h \# H" by fastforce with H mset_factors_imp_dvd have hr: "h dvd r" and h: "irreducible h" by auto from irreducible_not_unit[OF h] have hU: "\ h dvd 1" by auto from hr rp have "h dvd (poly_x_minus_y p)" by (rule dvd_trans) from irreducible_dvd_imp_factor[OF this h pF] p0 obtain f where f: "f \# F" and fh: "poly_x_minus_y f ddvd h" by auto from hr rq have "h dvd (poly_lift q)" by (rule dvd_trans) from irreducible_dvd_imp_factor[OF this h pG] q0 obtain g where g: "g \# G" and gh: "poly_lift g ddvd h" by auto from fh gh have "poly_x_minus_y f ddvd poly_lift g" using ddvd_trans by auto then have "poly_y_x (poly_x_minus_y f) ddvd poly_y_x (poly_lift g)" by simp also have "poly_y_x (poly_lift g) = [:g:]" unfolding poly_y_x_poly_lift monom_0 by auto finally have ddvd: "poly_y_x (poly_x_minus_y f) ddvd [:g:]" by auto then have "degree (poly_y_x (poly_x_minus_y f)) = 0" by (metis degree_pCons_0 dvd_0_left_iff dvd_const) then have "degree f = 0" by simp with primitive_imp_no_constant_factor[OF pr F f] show False by auto qed lemma poly_add_nonzero: fixes p q :: "'a :: ufd poly" assumes p0: "p \ 0" and q0: "q \ 0" and x: "poly p x = 0" and y: "poly q y = 0" and pr: "primitive p" shows "poly_add p q \ 0" proof have degp: "degree p > 0" using le_0_eq order_degree order_root p0 x by (metis gr0I) have degq: "degree q > 0" using le_0_eq order_degree order_root q0 y by (metis gr0I) assume 0: "poly_add p q = 0" from resultant_zero_imp_common_factor[OF _ this[unfolded poly_add_def]] degp and coprime_poly_x_minus_y_poly_lift[OF degp degq pr] show False by auto qed subsubsection \Summary for addition\ text \Now we lift the results to one that uses @{const ipoly}, by showing some homomorphism lemmas.\ lemma (in comm_ring_hom) map_poly_x_minus_y: "map_poly (map_poly hom) (poly_x_minus_y p) = poly_x_minus_y (map_poly hom p)" proof- interpret mp: map_poly_comm_ring_hom hom.. interpret mmp: map_poly_comm_ring_hom "map_poly hom".. show ?thesis apply (induct p, simp) apply(unfold x_y_def hom_distribs poly_x_minus_y_pCons, simp) done qed lemma (in comm_ring_hom) hom_poly_lift[simp]: "map_poly (map_poly hom) (poly_lift q) = poly_lift (map_poly hom q)" proof - show ?thesis unfolding poly_lift_def unfolding map_poly_map_poly[of coeff_lift,OF coeff_lift_hom.hom_zero] unfolding map_poly_coeff_lift_hom by simp qed lemma lead_coeff_poly_x_minus_y: fixes p :: "'a::idom poly" shows "lead_coeff (poly_x_minus_y p) = [:lead_coeff p * ((- 1) ^ degree p):]" (is "?l = ?r") proof- have "?l = Polynomial.smult (lead_coeff p) ((- 1) ^ degree p)" by (unfold poly_x_minus_y_def, subst lead_coeff_comp; simp add: x_y_def) also have "... = ?r" by (unfold hom_distribs, simp add: smult_as_map_poly[symmetric]) finally show ?thesis. qed lemma degree_coeff_poly_x_minus_y: fixes p q :: "'a :: {idom, semiring_char_0} poly" shows "degree (coeff (poly_x_minus_y p) i) = degree p - i" proof - consider "i = degree p" | "i > degree p" | "i < degree p" by force thus ?thesis proof cases assume "i > degree p" thus ?thesis by (subst coeff_eq_0) auto next assume "i = degree p" thus ?thesis using lead_coeff_poly_x_minus_y[of p] by (simp add: lead_coeff_poly_x_minus_y) next assume "i < degree p" define n where "n = degree p" have "degree (coeff (poly_x_minus_y p) i) = degree (\j\n. [:coeff p j:] * coeff (x_y ^ j) i)" (is "_ = degree (sum ?f _)") by (simp add: poly_x_minus_y_def pcompose_conv_poly poly_altdef coeff_sum n_def) also have "{..n} = insert n {.. = ?f n + sum ?f {.. = n - i" proof - have "degree (?f n) = n - i" using \i < degree p\ by (simp add: n_def coeff_xy_power degree_monom_eq) moreover have "degree (sum ?f {.. {.. j - i" proof (cases "i \ j") case True thus ?thesis by (auto simp: n_def coeff_xy_power degree_monom_eq) next case False hence "coeff (x_y ^ j :: 'a poly poly) i = 0" by (subst coeff_eq_0) (auto simp: degree_power_eq) thus ?thesis by simp qed also have "\ < n - i" using \j \ {.. \i < degree p\ by (auto simp: n_def) finally show "degree ([:coeff p j:] * coeff (x_y ^ j) i) < n - i" . qed (use \i < degree p\ in \auto simp: n_def\) ultimately show ?thesis by (subst degree_add_eq_left) auto qed finally show ?thesis by (simp add: n_def) qed qed lemma coeff_0_poly_x_minus_y [simp]: "coeff (poly_x_minus_y p) 0 = p" by (induction p) (auto simp: poly_x_minus_y_def x_y_def) lemma (in idom_hom) poly_add_hom: assumes p0: "hom (lead_coeff p) \ 0" and q0: "hom (lead_coeff q) \ 0" shows "map_poly hom (poly_add p q) = poly_add (map_poly hom p) (map_poly hom q)" proof - interpret mh: map_poly_idom_hom.. show ?thesis unfolding poly_add_def apply (subst mh.resultant_map_poly(1)[symmetric]) apply (subst degree_map_poly_2) apply (unfold lead_coeff_poly_x_minus_y, unfold hom_distribs, simp add: p0) apply simp apply (subst degree_map_poly_2) apply (simp_all add: q0 map_poly_x_minus_y) done qed lemma(in zero_hom) hom_lead_coeff_nonzero_imp_map_poly_hom: assumes "hom (lead_coeff p) \ 0" shows "map_poly hom p \ 0" proof assume "map_poly hom p = 0" then have "coeff (map_poly hom p) (degree p) = 0" by simp with assms show False by simp qed lemma ipoly_poly_add: fixes x y :: "'a :: idom" assumes p0: "(of_int (lead_coeff p) :: 'a) \ 0" and q0: "(of_int (lead_coeff q) :: 'a) \ 0" and x: "ipoly p x = 0" and y: "ipoly q y = 0" shows "ipoly (poly_add p q) (x+y) = 0" using assms of_int_hom.hom_lead_coeff_nonzero_imp_map_poly_hom[OF q0] by (auto intro: poly_add simp: of_int_hom.poly_add_hom[OF p0 q0]) lemma (in comm_monoid_gcd) gcd_list_eq_0_iff[simp]: "listgcd xs = 0 \ (\x \ set xs. x = 0)" by (induct xs, auto) lemma primitive_field_poly[simp]: "primitive (p :: 'a :: field poly) \ p \ 0" by (unfold primitive_iff_some_content_dvd_1,auto simp: dvd_field_iff coeffs_def) lemma ipoly_poly_add_nonzero: fixes x y :: "'a :: field" assumes "p \ 0" and "q \ 0" and "ipoly p x = 0" and "ipoly q y = 0" and "(of_int (lead_coeff p) :: 'a) \ 0" and "(of_int (lead_coeff q) :: 'a) \ 0" shows "poly_add p q \ 0" proof- from assms have "(of_int_poly (poly_add p q) :: 'a poly) \ 0" apply (subst of_int_hom.poly_add_hom,simp,simp) by (rule poly_add_nonzero, auto dest:of_int_hom.hom_lead_coeff_nonzero_imp_map_poly_hom) then show ?thesis by auto qed lemma represents_add: assumes x: "p represents x" and y: "q represents y" shows "(poly_add p q) represents (x + y)" using assms by (intro representsI ipoly_poly_add ipoly_poly_add_nonzero, auto) subsection \Division of Algebraic Numbers\ definition poly_x_mult_y where [code del]: "poly_x_mult_y p \ (\ i \ degree p. monom (monom (coeff p i) i) i)" lemma coeff_poly_x_mult_y: shows "coeff (poly_x_mult_y p) i = monom (coeff p i) i" (is "?l = ?r") proof(cases "degree p < i") case i: False have "?l = sum (\j. if j = i then (monom (coeff p j) j) else 0) {..degree p}" (is "_ = sum ?f ?A") by (simp add: poly_x_mult_y_def coeff_sum) also have "... = sum ?f {i}" using i by (intro sum.mono_neutral_right, auto) also have "... = ?f i" by simp also have "... = ?r" by auto finally show ?thesis. next case True then show ?thesis by (auto simp: poly_x_mult_y_def coeff_eq_0 coeff_sum) qed lemma poly_x_mult_y_code[code]: "poly_x_mult_y p = (let cs = coeffs p in poly_of_list (map (\ (i, ai). monom ai i) (zip [0 ..< length cs] cs)))" unfolding Let_def poly_of_list_def proof (rule poly_eqI, unfold coeff_poly_x_mult_y) fix n let ?xs = "zip [0.. degree p \ p = 0" unfolding degree_eq_length_coeffs by (cases n, auto) hence "monom (coeff p n) n = 0" using coeff_eq_0[of p n] by auto thus ?thesis unfolding id by simp qed qed definition poly_div :: "'a :: comm_ring_1 poly \ 'a poly \ 'a poly" where "poly_div p q = resultant (poly_x_mult_y p) (poly_lift q)" text \@{const poly_div} has desired roots.\ lemma poly2_poly_x_mult_y: fixes p :: "'a :: comm_ring_1 poly" shows "poly2 (poly_x_mult_y p) x y = poly p (x * y)" apply (subst(3) poly_as_sum_of_monoms[symmetric]) apply (unfold poly_x_mult_y_def hom_distribs) by (auto simp: poly2_monom poly_monom power_mult_distrib ac_simps) lemma poly_div: fixes p q :: "'a ::field poly" assumes q0: "q \ 0" and x: "poly p x = 0" and y: "poly q y = 0" and y0: "y \ 0" shows "poly (poly_div p q) (x/y) = 0" proof (unfold poly_div_def, rule poly_resultant_zero[OF disjI2]) have "degree q > 0" using poly_zero q0 y by auto thus degq: "degree (poly_lift q) > 0" by auto qed (insert x y y0, simp_all add: poly2_poly_x_mult_y) text \@{const poly_div} is nonzero.\ interpretation poly_x_mult_y_hom: ring_hom "poly_x_mult_y :: 'a :: {idom,ring_char_0} poly \ _" by (unfold_locales, auto intro: poly2_ext simp: poly2_poly_x_mult_y hom_distribs) interpretation poly_x_mult_y_hom: inj_ring_hom "poly_x_mult_y :: 'a :: {idom,ring_char_0} poly \ _" proof let ?h = poly_x_mult_y fix f :: "'a poly" assume "?h f = 0" then have "poly2 (?h f) x 1 = 0" for x by simp from this[unfolded poly2_poly_x_mult_y] show "f = 0" by auto qed lemma degree_poly_x_mult_y[simp]: fixes p :: "'a :: {idom, ring_char_0} poly" shows "degree (poly_x_mult_y p) = degree p" (is "?l = ?r") proof(rule antisym) show "?r \ ?l" by (cases "p=0", auto intro: le_degree simp: coeff_poly_x_mult_y) show "?l \ ?r" unfolding poly_x_mult_y_def by (auto intro: degree_sum_le le_trans[OF degree_monom_le]) qed interpretation poly_x_mult_y_hom: unit_preserving_hom "poly_x_mult_y :: 'a :: field_char_0 poly \ _" proof(unfold_locales) let ?h = "poly_x_mult_y :: 'a poly \ _" fix f :: "'a poly" assume unit: "?h f dvd 1" then have "degree (?h f) = 0" and "coeff (?h f) 0 dvd 1" unfolding poly_dvd_1 by auto then have deg: "degree f = 0" by (auto simp add: degree_monom_eq) with unit show "f dvd 1" by(cases "f = 0", auto) qed lemmas poly_y_x_o_poly_lift = o_def[of poly_y_x poly_lift, unfolded poly_y_x_poly_lift] lemma irreducible_dvd_degree: assumes "(f::'a::field poly) dvd g" "irreducible g" "degree f > 0" shows "degree f = degree g" using assms by (metis irreducible_altdef degree_0 dvd_refl is_unit_field_poly linorder_neqE_nat poly_divides_conv0) lemma coprime_poly_x_mult_y_poly_lift: fixes p q :: "'a :: field_char_0 poly" assumes degp: "degree p > 0" and degq: "degree q > 0" and nz: "poly p 0 \ 0 \ poly q 0 \ 0" shows "coprime (poly_x_mult_y p) (poly_lift q)" proof(rule ccontr) from degp have p: "\ p dvd 1" by (auto simp: dvd_const) from degp have p0: "p \ 0" by auto from mset_factors_exist[of p, OF p0 p] obtain F where F: "mset_factors F p" by auto then have pF: "prod_mset (image_mset poly_x_mult_y F) = poly_x_mult_y p" by (auto simp: hom_distribs) from degq have q: "\ is_unit q" by (auto simp: dvd_const) from degq have q0: "q \ 0" by auto from mset_factors_exist[OF q0 q] obtain G where G: "mset_factors G q" by auto with poly_lift_hom.hom_mset_factors have pG: "mset_factors (image_mset poly_lift G) (poly_lift q)" by auto from poly_y_x_hom.hom_mset_factors[OF this] have pG: "mset_factors (image_mset coeff_lift G) [:q:]" by (auto simp: poly_y_x_poly_lift monom_0 image_mset.compositionality poly_y_x_o_poly_lift) assume "\ coprime (poly_x_mult_y p) (poly_lift q)" then have "\ coprime (poly_y_x (poly_x_mult_y p)) (poly_y_x (poly_lift q))" by (simp del: coprime_iff_coprime) from this[unfolded not_coprime_iff_common_factor] obtain r where rp: "r dvd poly_y_x (poly_x_mult_y p)" and rq: "r dvd poly_y_x (poly_lift q)" and rU: "\ r dvd 1" by auto from rp p0 have r0: "r \ 0" by auto from mset_factors_exist[OF r0 rU] obtain H where H: "mset_factors H r" by auto then have "H \ {#}" by auto then obtain h where hH: "h \# H" by fastforce with H mset_factors_imp_dvd have hr: "h dvd r" and h: "irreducible h" by auto from irreducible_not_unit[OF h] have hU: "\ h dvd 1" by auto from hr rp have "h dvd poly_y_x (poly_x_mult_y p)" by (rule dvd_trans) note this[folded pF,unfolded poly_y_x_hom.hom_prod_mset image_mset.compositionality] from prime_elem_dvd_prod_mset[OF h[folded prime_elem_iff_irreducible] this] obtain f where f: "f \# F" and hf: "h dvd poly_y_x (poly_x_mult_y f)" by auto have irrF: "irreducible f" using f F by blast from dvd_trans[OF hr rq] have "h dvd [:q:]" by (simp add: poly_y_x_poly_lift monom_0) from irreducible_dvd_imp_factor[OF this h pG] q0 obtain g where g: "g \# G" and gh: "[:g:] dvd h" by auto from dvd_trans[OF gh hf] have *: "[:g:] dvd poly_y_x (poly_x_mult_y f)" using dvd_trans by auto show False proof (cases "poly f 0 = 0") case f_0: False from poly_hom.hom_dvd[OF *] have "g dvd poly (poly_y_x (poly_x_mult_y f)) [:0:]" by simp also have "... = [:poly f 0:]" by (intro poly_ext, fold poly2_def, simp add: poly2_poly_x_mult_y) also have "... dvd 1" using f_0 by auto finally have "g dvd 1". with g G show False by (auto elim!: mset_factorsE dest!: irreducible_not_unit) next case True hence "[:0,1:] dvd f" by (unfold dvd_iff_poly_eq_0, simp) from irreducible_dvd_degree[OF this irrF] have "degree f = 1" by auto from degree1_coeffs[OF this] True obtain c where c: "c \ 0" and f: "f = [:0,c:]" by auto from g G have irrG: "irreducible g" by auto from poly_hom.hom_dvd[OF *] have "g dvd poly (poly_y_x (poly_x_mult_y f)) 1" by simp also have "\ = f" by (auto simp: f poly_x_mult_y_code Let_def c poly_y_x_pCons map_poly_monom poly_monom poly_lift_def) also have "\ dvd [:0,1:]" unfolding f dvd_def using c by (intro exI[of _ "[: inverse c :]"], auto) finally have g01: "g dvd [:0,1:]" . from divides_degree[OF this] irrG have "degree g = 1" by auto from degree1_coeffs[OF this] obtain a b where g: "g = [:b,a:]" and a: "a \ 0" by auto from g01[unfolded dvd_def] g obtain k where id: "[:0,1:] = g * k" by auto from id have 0: "g \ 0" "k \ 0" by auto from arg_cong[OF id, of degree] have "degree k = 0" unfolding degree_mult_eq[OF 0] unfolding g using a by auto from degree0_coeffs[OF this] obtain kk where k: "k = [:kk:]" by auto from id[unfolded g k] a have "b = 0" by auto hence "poly g 0 = 0" by (auto simp: g) from True this nz \f \# F\ \g \# G\ F G show False by (auto dest!:mset_factors_imp_dvd elim:dvdE) qed qed lemma poly_div_nonzero: fixes p q :: "'a :: field_char_0 poly" assumes p0: "p \ 0" and q0: "q \ 0" and x: "poly p x = 0" and y: "poly q y = 0" and p_0: "poly p 0 \ 0 \ poly q 0 \ 0" shows "poly_div p q \ 0" proof have degp: "degree p > 0" using le_0_eq order_degree order_root p0 x by (metis gr0I) have degq: "degree q > 0" using le_0_eq order_degree order_root q0 y by (metis gr0I) assume 0: "poly_div p q = 0" from resultant_zero_imp_common_factor[OF _ this[unfolded poly_div_def]] degp and coprime_poly_x_mult_y_poly_lift[OF degp degq] p_0 show False by auto qed subsubsection \Summary for division\ text \Now we lift the results to one that uses @{const ipoly}, by showing some homomorphism lemmas.\ lemma (in inj_comm_ring_hom) poly_x_mult_y_hom: "poly_x_mult_y (map_poly hom p) = map_poly (map_poly hom) (poly_x_mult_y p)" proof - interpret mh: map_poly_inj_comm_ring_hom.. interpret mmh: map_poly_inj_comm_ring_hom "map_poly hom".. show ?thesis unfolding poly_x_mult_y_def by (simp add: hom_distribs) qed lemma (in inj_comm_ring_hom) poly_div_hom: "map_poly hom (poly_div p q) = poly_div (map_poly hom p) (map_poly hom q)" proof - have zero: "\x. hom x = 0 \ x = 0" by simp interpret mh: map_poly_inj_comm_ring_hom.. show ?thesis unfolding poly_div_def mh.resultant_hom[symmetric] by (simp add: poly_x_mult_y_hom) qed lemma ipoly_poly_div: fixes x y :: "'a :: field_char_0" assumes "q \ 0" and "ipoly p x = 0" and "ipoly q y = 0" and "y \ 0" shows "ipoly (poly_div p q) (x/y) = 0" by (unfold of_int_hom.poly_div_hom, rule poly_div, insert assms, auto) lemma ipoly_poly_div_nonzero: fixes x y :: "'a :: field_char_0" assumes "p \ 0" and "q \ 0" and "ipoly p x = 0" and "ipoly q y = 0" and "poly p 0 \ 0 \ poly q 0 \ 0" shows "poly_div p q \ 0" proof- from assms have "(of_int_poly (poly_div p q) :: 'a poly) \ 0" using of_int_hom.poly_map_poly[of p] by (subst of_int_hom.poly_div_hom, subst poly_div_nonzero, auto) then show ?thesis by auto qed lemma represents_div: fixes x y :: "'a :: field_char_0" assumes "p represents x" and "q represents y" and "poly q 0 \ 0" shows "(poly_div p q) represents (x / y)" using assms by (intro representsI ipoly_poly_div ipoly_poly_div_nonzero, auto) subsection \Multiplication of Algebraic Numbers\ definition poly_mult where "poly_mult p q \ poly_div p (reflect_poly q)" lemma represents_mult: assumes px: "p represents x" and qy: "q represents y" and q_0: "poly q 0 \ 0" shows "(poly_mult p q) represents (x * y)" proof- from q_0 qy have y0: "y \ 0" by auto from represents_inverse[OF y0 qy] y0 px q_0 have "poly_mult p q represents x / (inverse y)" unfolding poly_mult_def by (intro represents_div, auto) with y0 show ?thesis by (simp add: field_simps) qed subsection \Summary: Closure Properties of Algebraic Numbers\ lemma algebraic_representsI: "p represents x \ algebraic x" unfolding represents_def algebraic_altdef_ipoly by auto lemma algebraic_of_rat: "algebraic (of_rat x)" by (rule algebraic_representsI[OF poly_rat_represents_of_rat]) lemma algebraic_uminus: "algebraic x \ algebraic (-x)" by (auto dest: algebraic_imp_represents_irreducible intro: algebraic_representsI represents_uminus) lemma algebraic_inverse: "algebraic x \ algebraic (inverse x)" using algebraic_of_rat[of 0] by (cases "x = 0", auto dest: algebraic_imp_represents_irreducible intro: algebraic_representsI represents_inverse) lemma algebraic_plus: "algebraic x \ algebraic y \ algebraic (x + y)" by (auto dest!: algebraic_imp_represents_irreducible_cf_pos intro!: algebraic_representsI[OF represents_add]) lemma algebraic_div: assumes x: "algebraic x" and y: "algebraic y" shows "algebraic (x/y)" proof(cases "y = 0 \ x = 0") case True then show ?thesis using algebraic_of_rat[of 0] by auto next case False then have x0: "x \ 0" and y0: "y \ 0" by auto from x y obtain p q where px: "p represents x" and irr: "irreducible q" and qy: "q represents y" by (auto dest!: algebraic_imp_represents_irreducible) show ?thesis using False px represents_irr_non_0[OF irr qy] by (auto intro!: algebraic_representsI[OF represents_div] qy) qed lemma algebraic_times: "algebraic x \ algebraic y \ algebraic (x * y)" using algebraic_div[OF _ algebraic_inverse, of x y] by (simp add: field_simps) lemma algebraic_root: "algebraic x \ algebraic (root n x)" proof - assume "algebraic x" then obtain p where p: "p represents x" by (auto dest: algebraic_imp_represents_irreducible_cf_pos) from algebraic_representsI[OF represents_nth_root_neg_real[OF _ this, of n]] algebraic_representsI[OF represents_nth_root_pos_real[OF _ this, of n]] algebraic_of_rat[of 0] show ?thesis by (cases "n = 0", force, cases "n > 0", force, cases "n < 0", auto) qed lemma algebraic_nth_root: "n \ 0 \ algebraic x \ y^n = x \ algebraic y" by (auto dest: algebraic_imp_represents_irreducible_cf_pos intro: algebraic_representsI represents_nth_root) subsection \More on algebraic integers\ (* TODO: this is actually equal to @{term "(-1)^(m*n)"}, but we need a bit more theory on permutations to show this with a reasonable amount of effort. *) definition poly_add_sign :: "nat \ nat \ 'a :: comm_ring_1" where "poly_add_sign m n = signof (\i. if i < n then m + i else if i < m + n then i - n else i)" lemma lead_coeff_poly_add: fixes p q :: "'a :: {idom, semiring_char_0} poly" defines "m \ degree p" and "n \ degree q" assumes "lead_coeff p = 1" "lead_coeff q = 1" "m > 0" "n > 0" shows "lead_coeff (poly_add p q :: 'a poly) = poly_add_sign m n" proof - from assms have [simp]: "p \ 0" "q \ 0" by auto define M where "M = sylvester_mat (poly_x_minus_y p) (poly_lift q)" define \ :: "nat \ nat" where "\ = (\i. if i < n then m + i else if i < m + n then i - n else i)" have \: "\ permutes {0.._def inj_on_def) have nz: "M $$ (i, \ i) \ 0" if "i < m + n" for i using that by (auto simp: M_def \_def sylvester_index_mat m_def n_def) (* have "{(i,j). i \ {.. j \ {.. i < j \ \ i > \ j} = {.. {n.. ?lhs" thus "ij \ ?rhs" by (simp add: \_def split: prod.splits if_splits) auto qed (auto simp: \_def) hence "inversions_on {.. = n * m" by (simp add: inversions_on_def) hence "signof \ = (-1)^(m*n)" using \ by (simp add: signof_def sign_def evenperm_iff_even_inversions) *) have indices_eq: "{0.. (+) n ` {.. \. signof \ * (\i=0.. i)))" have "degree (f \) = degree (\i=0.. i))" using nz by (auto simp: f_def degree_mult_eq sign_def) also have "\ = (\i=0.. i)))" using nz by (subst degree_prod_eq_sum_degree) auto also have "\ = (\i i))) + (\i (n + i))))" by (subst indices_eq, subst sum.union_disjoint) (auto simp: sum.reindex) also have "(\i i))) = (\i_def m_def n_def) also have "(\i (n + i)))) = (\i_def m_def n_def) finally have deg_f1: "degree (f \) = m * n" by simp have deg_f2: "degree (f \) < m * n" if "\ permutes {0.. \ \" for \ proof (cases "\i\{0.. i) = 0") case True hence *: "(\i = 0.. i)) = 0" by auto show ?thesis using \m > 0\ \n > 0\ by (simp add: f_def *) next case False note nz = this from that have \_less: "\ i < m + n" if "i < m + n" for i using permutes_in_image[OF \\ permutes _\] that by auto have "degree (f \) = degree (\i=0.. i))" using nz by (auto simp: f_def degree_mult_eq sign_def) also have "\ = (\i=0.. i)))" using nz by (subst degree_prod_eq_sum_degree) auto also have "\ = (\i i))) + (\i (n + i))))" by (subst indices_eq, subst sum.union_disjoint) (auto simp: sum.reindex) also have "(\i (n + i)))) = (\i_less by (intro sum.cong) (auto simp: M_def sylvester_index_mat \_def m_def n_def) also have "(\i i))) < (\ix\{.. x)) \ m" using \_less by (auto simp: M_def sylvester_index_mat \_def m_def n_def degree_coeff_poly_x_minus_y) next have "\i i \ \ i" proof (rule ccontr) assume nex: "~(\i i \ \ i)" have "\i\m+n-k. \ i = \ i" if "k \ m" for k using that proof (induction k) case 0 thus ?case using \\ permutes _\ \\ permutes _\ by (fastforce simp: permutes_def) next case (Suc k) have IH: "\ i = \ i" if "i \ m+n-k" for i using Suc.prems Suc.IH that by auto from nz have "M $$ (m + n - Suc k, \ (m + n - Suc k)) \ 0" using Suc.prems by auto moreover have "m + n - Suc k \ n" using Suc.prems by auto ultimately have "\ (m+n-Suc k) \ m-Suc k" using assms \_less[of "m+n-Suc k"] Suc.prems by (auto simp: M_def sylvester_index_mat m_def n_def split: if_splits) have "\(\ (m+n-Suc k) > m - Suc k)" proof assume *: "\ (m+n-Suc k) > m - Suc k" have less: "\ (m+n-Suc k) < m" proof (rule ccontr) assume *: "\\ (m + n - Suc k) < m" define j where "j = \ (m + n - Suc k) - m" have "\ (m + n - Suc k) = m + j" using * by (simp add: j_def) moreover { have "j < n" using \_less[of "m+n-Suc k"] \m > 0\ \n > 0\ by (simp add: j_def) hence "\ j = \ j" using nex by auto with \j < n\ have "\ j = m + j" by (auto simp: \_def) } ultimately have "\ (m + n - Suc k) = \ j" by simp hence "m + n - Suc k = j" using permutes_inj[OF \\ permutes _\] unfolding inj_def by blast thus False using \n \ m + n - Suc k\ \_less[of "m+n-Suc k"] \n > 0\ unfolding j_def by linarith qed define j where "j = \ (m+n-Suc k) - (m - Suc k)" from * have j: "\ (m+n-Suc k) = m - Suc k + j" "j > 0" by (auto simp: j_def) have "\ (m+n-Suc k + j) = \ (m+n - Suc k + j)" using * by (intro IH) (auto simp: j_def) also { have "j < Suc k" using less by (auto simp: j_def algebra_simps) hence "m + n - Suc k + j < m + n" using \m > 0\ \n > 0\ Suc.prems by linarith hence "\ (m +n - Suc k + j) = m - Suc k + j" unfolding \_def using Suc.prems by (simp add: \_def) } finally have "\ (m + n - Suc k + j) = \ (m + n - Suc k)" using j by simp hence "m + n - Suc k + j = m + n - Suc k" using permutes_inj[OF \\ permutes _\] unfolding inj_def by blast thus False using \j > 0\ by simp qed with \\ (m+n-Suc k) \ m-Suc k\ have eq: "\ (m+n-Suc k) = m - Suc k" by linarith show ?case proof safe fix i :: nat assume i: "i \ m + n - Suc k" show "\ i = \ i" using eq Suc.prems \m > 0\ IH i proof (cases "i = m + n - Suc k") case True thus ?thesis using eq Suc.prems \m > 0\ by (auto simp: \_def) qed (use IH i in auto) qed qed from this[of m] and nex have "\ i = \ i" for i by (cases "i \ n") auto hence "\ = \" by force thus False using \\ \ \\ by contradiction qed then obtain i where i: "i < n" "\ i \ \ i" by auto have "\ i < m + n" using i by (intro \_less) auto moreover have "\ i = m + i" using i by (auto simp: \_def) ultimately have "degree (M $$ (i, \ i)) < m" using i \m > 0\ by (auto simp: M_def m_def n_def sylvester_index_mat degree_coeff_poly_x_minus_y) thus "\i\{.. i)) < m" using i by blast qed auto finally show "degree (f \) < m * n" by (simp add: mult_ac) qed have "lead_coeff (f \) = poly_add_sign m n" proof - have "lead_coeff (f \) = signof \ * (\i=0.. i)))" by (simp add: f_def sign_def lead_coeff_prod) also have "(\i=0.. i))) = (\i i))) * (\i (n + i))))" by (subst indices_eq, subst prod.union_disjoint) (auto simp: prod.reindex) also have "(\i i))) = (\i_def sylvester_index_mat) also have "(\i (n + i)))) = (\i_def sylvester_index_mat) also have "signof \ = poly_add_sign m n" by (simp add: \_def poly_add_sign_def m_def n_def cong: if_cong) finally show ?thesis using assms by simp qed have "lead_coeff (poly_add p q) = lead_coeff (det (sylvester_mat (poly_x_minus_y p) (poly_lift q)))" by (simp add: poly_add_def resultant_def) also have "det (sylvester_mat (poly_x_minus_y p) (poly_lift q)) = (\\ | \ permutes {0..)" by (simp add: det_def m_def n_def M_def f_def) also have "{\. \ permutes {0.. ({\. \ permutes {0..})" using \ by auto also have "(\\\\. f \) = (\\\{\. \ permutes {0..}. f \) + f \" by (subst sum.insert) (auto simp: finite_permutations) also have "lead_coeff \ = lead_coeff (f \)" proof - have "degree (\\\{\. \ permutes {0..}. f \) < m * n" using assms by (intro degree_sum_smaller deg_f2) (auto simp: m_def n_def finite_permutations) with deg_f1 show ?thesis by (subst lead_coeff_add_le) auto qed finally show ?thesis using \lead_coeff (f \) = _\ by simp qed lemma lead_coeff_poly_mult: fixes p q :: "'a :: {idom, ring_char_0} poly" defines "m \ degree p" and "n \ degree q" assumes "lead_coeff p = 1" "lead_coeff q = 1" "m > 0" "n > 0" assumes "coeff q 0 \ 0" shows "lead_coeff (poly_mult p q :: 'a poly) = 1" proof - from assms have [simp]: "p \ 0" "q \ 0" by auto have [simp]: "degree (reflect_poly q) = n" using assms by (subst degree_reflect_poly_eq) (auto simp: n_def) define M where "M = sylvester_mat (poly_x_mult_y p) (poly_lift (reflect_poly q))" have nz: "M $$ (i, i) \ 0" if "i < m + n" for i using that by (auto simp: M_def sylvester_index_mat m_def n_def coeff_poly_x_mult_y) have indices_eq: "{0.. (+) n ` {.. \. signof \ * (\i=0.. i)))" have "degree (f id) = degree (\i=0.. = (\i=0.. = (\iiiiii) < m * n" if "\ permutes {0.. \ id" for \ proof (cases "\i\{0.. i) = 0") case True hence *: "(\i = 0.. i)) = 0" by auto show ?thesis using \m > 0\ \n > 0\ by (simp add: f_def *) next case False note nz = this from that have \_less: "\ i < m + n" if "i < m + n" for i using permutes_in_image[OF \\ permutes _\] that by auto have "degree (f \) = degree (\i=0.. i))" using nz by (auto simp: f_def degree_mult_eq sign_def) also have "\ = (\i=0.. i)))" using nz by (subst degree_prod_eq_sum_degree) auto also have "\ = (\i i))) + (\i (n + i))))" by (subst indices_eq, subst sum.union_disjoint) (auto simp: sum.reindex) also have "(\i (n + i)))) = (\i_less by (intro sum.cong) (auto simp: M_def sylvester_index_mat m_def n_def) also have "(\i i))) < (\ix\{.. x)) \ m" using \_less by (auto simp: M_def sylvester_index_mat m_def n_def degree_coeff_poly_x_minus_y coeff_poly_x_mult_y intro: order.trans[OF degree_monom_le]) next have "\i i \ i" proof (rule ccontr) assume nex: "\(\i i \ i)" have "\ i = i" for i using that proof (induction i rule: less_induct) case (less i) consider "i < n" | "i \ {n.. m + n" by force thus ?case proof cases assume "i < n" thus ?thesis using nex by auto next assume "i \ m + n" thus ?thesis using \\ permutes _\ by (auto simp: permutes_def) next assume i: "i \ {n.. j = j" if "j < i" for j using that less.prems by (intro less.IH) auto from nz have "M $$ (i, \ i) \ 0" using i by auto hence "\ i \ i" using i \_less[of i] by (auto simp: M_def sylvester_index_mat m_def n_def) moreover have "\ i \ i" proof (rule ccontr) assume *: "\\ i \ i" from * have "\ (\ i) = \ i" by (subst IH) auto hence "\ i = i" using permutes_inj[OF \\ permutes _\] unfolding inj_def by blast with * show False by simp qed ultimately show ?case by simp qed qed hence "\ = id" by force with \\ \ id\ show False by contradiction qed then obtain i where i: "i < n" "\ i \ i" by auto have "\ i < m + n" using i by (intro \_less) auto hence "degree (M $$ (i, \ i)) < m" using i \m > 0\ by (auto simp: M_def m_def n_def sylvester_index_mat degree_coeff_poly_x_minus_y coeff_poly_x_mult_y intro: le_less_trans[OF degree_monom_le]) thus "\i\{.. i)) < m" using i by blast qed auto finally show "degree (f \) < m * n" by (simp add: mult_ac) qed have "lead_coeff (f id) = 1" proof - have "lead_coeff (f id) = (\i=0..i=0..iiiiii\ | \ permutes {0..)" by (simp add: det_def m_def n_def M_def f_def) also have "{\. \ permutes {0... \ permutes {0..\\\. f \) = (\\\{\. \ permutes {0..) + f id" by (subst sum.insert) (auto simp: finite_permutations) also have "lead_coeff \ = lead_coeff (f id)" proof - have "degree (\\\{\. \ permutes {0..) < m * n" using assms by (intro degree_sum_smaller deg_f2) (auto simp: m_def n_def finite_permutations) with deg_f1 show ?thesis by (subst lead_coeff_add_le) auto qed finally show ?thesis using \lead_coeff (f id) = 1\ by simp qed lemma algebraic_int_plus [intro]: fixes x y :: "'a :: field_char_0" assumes "algebraic_int x" "algebraic_int y" shows "algebraic_int (x + y)" proof - from assms(1) obtain p where p: "lead_coeff p = 1" "ipoly p x = 0" by (auto simp: algebraic_int_altdef_ipoly) from assms(2) obtain q where q: "lead_coeff q = 1" "ipoly q y = 0" by (auto simp: algebraic_int_altdef_ipoly) have deg_pos: "degree p > 0" "degree q > 0" using p q by (auto intro!: Nat.gr0I elim!: degree_eq_zeroE) define r where "r = poly_add_sign (degree p) (degree q) * poly_add p q" have "lead_coeff r = 1" using p q deg_pos by (simp add: r_def lead_coeff_mult poly_add_sign_def sign_def lead_coeff_poly_add) moreover have "ipoly r (x + y) = 0" using p q by (simp add: ipoly_poly_add r_def of_int_poly_hom.hom_mult) ultimately show ?thesis by (auto simp: algebraic_int_altdef_ipoly) qed lemma algebraic_int_times [intro]: fixes x y :: "'a :: field_char_0" assumes "algebraic_int x" "algebraic_int y" shows "algebraic_int (x * y)" proof (cases "y = 0") case [simp]: False from assms(1) obtain p where p: "lead_coeff p = 1" "ipoly p x = 0" by (auto simp: algebraic_int_altdef_ipoly) from assms(2) obtain q where q: "lead_coeff q = 1" "ipoly q y = 0" by (auto simp: algebraic_int_altdef_ipoly) have deg_pos: "degree p > 0" "degree q > 0" using p q by (auto intro!: Nat.gr0I elim!: degree_eq_zeroE) have [simp]: "q \ 0" using q by auto define n where "n = Polynomial.order 0 q" have "monom 1 n dvd q" by (simp add: n_def monom_1_dvd_iff) then obtain q' where q_split: "q = q' * monom 1 n" by auto have "Polynomial.order 0 q = Polynomial.order 0 q' + n" using \q \ 0\ unfolding q_split by (subst order_mult) auto hence "poly q' 0 \ 0" unfolding n_def using \q \ 0\ by (simp add: q_split order_root) have q': "ipoly q' y = 0" "lead_coeff q' = 1" using q_split q by (auto simp: of_int_poly_hom.hom_mult poly_monom lead_coeff_mult degree_monom_eq) from this have deg_pos': "degree q' > 0" by (intro Nat.gr0I) (auto elim!: degree_eq_zeroE) from \poly q' 0 \ 0\ have [simp]: "coeff q' 0 \ 0" by (auto simp: monom_1_dvd_iff' poly_0_coeff_0) have "p represents x" "q' represents y" using p q' by (auto simp: represents_def) hence "poly_mult p q' represents x * y" by (rule represents_mult) (simp add: poly_0_coeff_0) moreover have "lead_coeff (poly_mult p q') = 1" using p deg_pos q' deg_pos' by (simp add: lead_coeff_mult lead_coeff_poly_mult) ultimately show ?thesis by (auto simp: algebraic_int_altdef_ipoly represents_def) qed auto lemma algebraic_int_power [intro]: "algebraic_int (x :: 'a :: field_char_0) \ algebraic_int (x ^ n)" by (induction n) auto lemma algebraic_int_diff [intro]: fixes x y :: "'a :: field_char_0" assumes "algebraic_int x" "algebraic_int y" shows "algebraic_int (x - y)" using algebraic_int_plus[OF assms(1) algebraic_int_minus[OF assms(2)]] by simp lemma algebraic_int_sum [intro]: "(\x. x \ A \ algebraic_int (f x :: 'a :: field_char_0)) \ algebraic_int (sum f A)" by (induction A rule: infinite_finite_induct) auto lemma algebraic_int_prod [intro]: "(\x. x \ A \ algebraic_int (f x :: 'a :: field_char_0)) \ algebraic_int (prod f A)" by (induction A rule: infinite_finite_induct) auto lemma algebraic_int_nth_root_real_iff: "algebraic_int (root n x) \ n = 0 \ algebraic_int x" proof - have "algebraic_int x" if "algebraic_int (root n x)" "n \ 0" proof - from that(1) have "algebraic_int (root n x ^ n)" by auto also have "root n x ^ n = (if even n then \x\ else x)" using sgn_power_root[of n x] that(2) by (auto simp: sgn_if split: if_splits) finally show ?thesis by (auto split: if_splits) qed thus ?thesis by auto qed lemma algebraic_int_power_iff: "algebraic_int (x ^ n :: 'a :: field_char_0) \ n = 0 \ algebraic_int x" proof - have "algebraic_int x" if "algebraic_int (x ^ n)" "n > 0" proof (rule algebraic_int_root) show "poly (monom 1 n) x = x ^ n" by (auto simp: poly_monom) qed (use that in \auto simp: degree_monom_eq\) thus ?thesis by auto qed lemma algebraic_int_power_iff' [simp]: "n > 0 \ algebraic_int (x ^ n :: 'a :: field_char_0) \ algebraic_int x" by (subst algebraic_int_power_iff) auto lemma algebraic_int_sqrt_iff [simp]: "algebraic_int (sqrt x) \ algebraic_int x" by (simp add: sqrt_def algebraic_int_nth_root_real_iff) lemma algebraic_int_csqrt_iff [simp]: "algebraic_int (csqrt x) \ algebraic_int x" proof assume "algebraic_int (csqrt x)" hence "algebraic_int (csqrt x ^ 2)" by (rule algebraic_int_power) thus "algebraic_int x" by simp qed auto lemma algebraic_int_norm_complex [intro]: assumes "algebraic_int (z :: complex)" shows "algebraic_int (norm z)" proof - from assms have "algebraic_int (z * cnj z)" by auto also have "z * cnj z = of_real (norm z ^ 2)" by (rule complex_norm_square [symmetric]) finally show ?thesis by simp qed hide_const (open) x_y end