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| /- | |
| Copyright (c) 2022 Scott Morrison. All rights reserved. | |
| Released under Apache 2.0 license as described in the file LICENSE. | |
| Authors: Scott Morrison | |
| -/ | |
| import algebra.star.basic | |
| import algebra.algebra.subalgebra.basic | |
| /-! | |
| A *-subalgebra is a subalgebra of a *-algebra which is closed under *. | |
| The centralizer of a *-closed set is a *-subalgebra. | |
| -/ | |
| universes u v | |
| set_option old_structure_cmd true | |
| /-- A *-subalgebra is a subalgebra of a *-algebra which is closed under *. -/ | |
| structure star_subalgebra (R : Type u) (A : Type v) [comm_semiring R] [star_ring R] | |
| [semiring A] [star_ring A] [algebra R A] [star_module R A] extends subalgebra R A : Type v := | |
| (star_mem' {a} : a β carrier β star a β carrier) | |
| namespace star_subalgebra | |
| /-- | |
| Forgetting that a *-subalgebra is closed under *. | |
| -/ | |
| add_decl_doc star_subalgebra.to_subalgebra | |
| variables (R : Type u) (A : Type v) [comm_semiring R] [star_ring R] | |
| [semiring A] [star_ring A] [algebra R A] [star_module R A] | |
| instance : set_like (star_subalgebra R A) A := | |
| β¨star_subalgebra.carrier, Ξ» p q h, by cases p; cases q; congr'β© | |
| instance : has_top (star_subalgebra R A) := | |
| β¨{ star_mem' := by tidy, ..(β€ : subalgebra R A) }β© | |
| instance : inhabited (star_subalgebra R A) := β¨β€β© | |
| section centralizer | |
| variables {A} | |
| /-- The centralizer, or commutant, of a *-closed set as star subalgebra. -/ | |
| def centralizer | |
| (s : set A) (w : β (a : A), a β s β star a β s) : star_subalgebra R A := | |
| { star_mem' := Ξ» x xm y hy, by simpa using congr_arg star (xm _ (w _ hy)).symm, | |
| ..subalgebra.centralizer R s, } | |
| @[simp] | |
| lemma coe_centralizer (s : set A) (w : β (a : A), a β s β star a β s) : | |
| (centralizer R s w : set A) = s.centralizer := rfl | |
| lemma mem_centralizer_iff {s : set A} {w} {z : A} : | |
| z β centralizer R s w β β g β s, g * z = z * g := | |
| iff.rfl | |
| lemma centralizer_le (s t : set A) | |
| (ws : β (a : A), a β s β star a β s) (wt : β (a : A), a β t β star a β t) (h : s β t) : | |
| centralizer R t wt β€ centralizer R s ws := | |
| set.centralizer_subset h | |
| end centralizer | |
| end star_subalgebra | |