/- Copyright (c) 2016 Floris van Doorn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Floris van Doorn Reduced cohomology of spectra and cohomology theories -/ import .spectrum ..algebra.arrow_group .fwedge ..choice .pushout ..algebra.product_group open eq spectrum int trunc pointed EM group algebra circle sphere nat EM.ops equiv susp is_trunc function fwedge cofiber bool lift sigma is_equiv choice pushout algebra unit pi namespace cohomology /- The cohomology of X with coefficients in Y is trunc 0 (A →* Ω[2] (Y (n+2))) In the file arrow_group (in algebra) we construct the group structor on this type. -/ definition cohomology (X : Type*) (Y : spectrum) (n : ℤ) : AbGroup := AbGroup_trunc_pmap X (Y (n+2)) definition parametrized_cohomology {X : Type*} (Y : X → spectrum) (n : ℤ) : AbGroup := AbGroup_trunc_ppi (λx, Y x (n+2)) definition ordinary_cohomology [reducible] (X : Type*) (G : AbGroup) (n : ℤ) : AbGroup := cohomology X (EM_spectrum G) n definition ordinary_cohomology_Z [reducible] (X : Type*) (n : ℤ) : AbGroup := ordinary_cohomology X agℤ n notation `H^` n `[`:0 X:0 `, ` Y:0 `]`:0 := cohomology X Y n notation `H^` n `[`:0 X:0 `]`:0 := ordinary_cohomology_Z X n notation `pH^` n `[`:0 binders `, ` r:(scoped Y, parametrized_cohomology Y n) `]`:0 := r -- check H^3[S¹*,EM_spectrum agℤ] -- check H^3[S¹*] -- check pH^3[(x : S¹*), EM_spectrum agℤ] /- an alternate definition of cohomology -/ definition cohomology_equiv_shomotopy_group_cotensor (X : Type*) (Y : spectrum) (n : ℤ) : H^n[X, Y] ≃ πₛ[-n] (sp_cotensor X Y) := trunc_equiv_trunc 0 (!pfunext ⬝e loop_pequiv_loop !pfunext ⬝e loopn_pequiv_loopn 2 (pequiv_of_eq (ap (λn, ppmap X (Y n)) (add.comm n 2 ⬝ ap (add 2) !neg_neg⁻¹)))) definition unpointed_cohomology (X : Type) (Y : spectrum) (n : ℤ) : AbGroup := cohomology X₊ Y n /- functoriality -/ definition cohomology_functor [constructor] {X X' : Type*} (f : X' →* X) (Y : spectrum) (n : ℤ) : cohomology X Y n →g cohomology X' Y n := Group_trunc_pmap_homomorphism f definition cohomology_functor_pid (X : Type*) (Y : spectrum) (n : ℤ) (f : H^n[X, Y]) : cohomology_functor (pid X) Y n f = f := !Group_trunc_pmap_pid definition cohomology_functor_pcompose {X X' X'' : Type*} (f : X' →* X) (g : X'' →* X') (Y : spectrum) (n : ℤ) (h : H^n[X, Y]) : cohomology_functor (f ∘* g) Y n h = cohomology_functor g Y n (cohomology_functor f Y n h) := !Group_trunc_pmap_pcompose definition cohomology_functor_phomotopy {X X' : Type*} {f g : X' →* X} (p : f ~* g) (Y : spectrum) (n : ℤ) : cohomology_functor f Y n ~ cohomology_functor g Y n := Group_trunc_pmap_phomotopy p definition cohomology_functor_phomotopy_refl {X X' : Type*} (f : X' →* X) (Y : spectrum) (n : ℤ) (x : H^n[X, Y]) : cohomology_functor_phomotopy (phomotopy.refl f) Y n x = idp := Group_trunc_pmap_phomotopy_refl f x definition cohomology_functor_pconst {X X' : Type*} (Y : spectrum) (n : ℤ) (f : H^n[X, Y]) : cohomology_functor (pconst X' X) Y n f = 1 := !Group_trunc_pmap_pconst definition cohomology_isomorphism {X X' : Type*} (f : X' ≃* X) (Y : spectrum) (n : ℤ) : H^n[X, Y] ≃g H^n[X', Y] := Group_trunc_pmap_isomorphism f definition cohomology_isomorphism_refl (X : Type*) (Y : spectrum) (n : ℤ) (x : H^n[X,Y]) : cohomology_isomorphism (pequiv.refl X) Y n x = x := !Group_trunc_pmap_isomorphism_refl /- suspension axiom -/ definition cohomology_psusp_2 (Y : spectrum) (n : ℤ) : Ω (Ω[2] (Y ((n+1)+2))) ≃* Ω[2] (Y (n+2)) := begin apply loopn_pequiv_loopn 2, exact loop_pequiv_loop (pequiv_of_eq (ap Y (add_comm_right n 1 2))) ⬝e* !equiv_glue⁻¹ᵉ* end definition cohomology_psusp_1 (X : Type*) (Y : spectrum) (n : ℤ) : psusp X →* Ω (Ω (Y (n + 1 + 2))) ≃ X →* Ω (Ω (Y (n+2))) := calc psusp X →* Ω[2] (Y (n + 1 + 2)) ≃ X →* Ω (Ω[2] (Y (n + 1 + 2))) : psusp_adjoint_loop_unpointed ... ≃ X →* Ω[2] (Y (n+2)) : equiv_of_pequiv (pequiv_ppcompose_left (cohomology_psusp_2 Y n)) definition cohomology_psusp_1_pmap_mul {X : Type*} {Y : spectrum} {n : ℤ} (f g : psusp X →* Ω (Ω (Y (n + 1 + 2)))) : cohomology_psusp_1 X Y n (pmap_mul f g) ~* pmap_mul (cohomology_psusp_1 X Y n f) (cohomology_psusp_1 X Y n g) := begin unfold [cohomology_psusp_1], refine pwhisker_left _ !loop_psusp_intro_pmap_mul ⬝* _, apply pcompose_pmap_mul end definition cohomology_psusp_equiv (X : Type*) (Y : spectrum) (n : ℤ) : H^n+1[psusp X, Y] ≃ H^n[X, Y] := trunc_equiv_trunc _ (cohomology_psusp_1 X Y n) definition cohomology_psusp (X : Type*) (Y : spectrum) (n : ℤ) : H^n+1[psusp X, Y] ≃g H^n[X, Y] := isomorphism_of_equiv (cohomology_psusp_equiv X Y n) begin intro f₁ f₂, induction f₁ with f₁, induction f₂ with f₂, apply ap tr, apply eq_of_phomotopy, exact cohomology_psusp_1_pmap_mul f₁ f₂ end definition cohomology_psusp_natural {X X' : Type*} (f : X →* X') (Y : spectrum) (n : ℤ) : cohomology_psusp X Y n ∘ cohomology_functor (psusp_functor f) Y (n+1) ~ cohomology_functor f Y n ∘ cohomology_psusp X' Y n := begin refine (trunc_functor_compose _ _ _)⁻¹ʰᵗʸ ⬝hty _ ⬝hty trunc_functor_compose _ _ _, apply trunc_functor_homotopy, intro g, apply eq_of_phomotopy, refine _ ⬝* !passoc⁻¹*, apply pwhisker_left, apply loop_psusp_intro_natural end /- exactness -/ definition cohomology_exact {X X' : Type*} (f : X →* X') (Y : spectrum) (n : ℤ) : is_exact_g (cohomology_functor (pcod f) Y n) (cohomology_functor f Y n) := is_exact_trunc_functor (cofiber_exact f) /- additivity -/ definition additive_hom [constructor] {I : Type} (X : I → Type*) (Y : spectrum) (n : ℤ) : H^n[⋁X, Y] →g Πᵍ i, H^n[X i, Y] := Group_pi_intro (λi, cohomology_functor (pinl i) Y n) definition additive_equiv.{u} {I : Type.{u}} (H : has_choice 0 I) (X : I → Type*) (Y : spectrum) (n : ℤ) : H^n[⋁X, Y] ≃ Πᵍ i, H^n[X i, Y] := trunc_fwedge_pmap_equiv H X (Ω[2] (Y (n+2))) definition spectrum_additive {I : Type} (H : has_choice 0 I) (X : I → Type*) (Y : spectrum) (n : ℤ) : is_equiv (additive_hom X Y n) := is_equiv_of_equiv_of_homotopy (additive_equiv H X Y n) begin intro f, induction f, reflexivity end /- dimension axiom for ordinary cohomology -/ open is_conn trunc_index theorem EM_dimension' (G : AbGroup) (n : ℤ) (H : n ≠ 0) : is_contr (ordinary_cohomology pbool G n) := begin apply is_conn_equiv_closed 0 !pmap_pbool_equiv⁻¹ᵉ, apply is_conn_equiv_closed 0 !equiv_glue2⁻¹ᵉ, cases n with n n, { cases n with n, { exfalso, apply H, reflexivity }, { apply is_conn_of_le, apply zero_le_of_nat n, exact is_conn_EMadd1 G n, }}, { apply is_trunc_trunc_of_is_trunc, apply @is_contr_loop_of_is_trunc (n+1) (K G 0), apply is_trunc_of_le _ (zero_le_of_nat n) } end theorem EM_dimension (G : AbGroup) (n : ℤ) (H : n ≠ 0) : is_contr (ordinary_cohomology (plift pbool) G n) := @(is_trunc_equiv_closed_rev -2 (equiv_of_isomorphism (cohomology_isomorphism (pequiv_plift pbool) _ _))) (EM_dimension' G n H) /- cohomology theory -/ structure cohomology_theory.{u} : Type.{u+1} := (HH : ℤ → pType.{u} → AbGroup.{u}) (Hiso : Π(n : ℤ) {X Y : Type*} (f : X ≃* Y), HH n Y ≃g HH n X) (Hiso_refl : Π(n : ℤ) (X : Type*) (x : HH n X), Hiso n pequiv.rfl x = x) (Hh : Π(n : ℤ) {X Y : Type*} (f : X →* Y), HH n Y →g HH n X) (Hhomotopy : Π(n : ℤ) {X Y : Type*} {f g : X →* Y} (p : f ~* g), Hh n f ~ Hh n g) (Hhomotopy_refl : Π(n : ℤ) {X Y : Type*} (f : X →* Y) (x : HH n Y), Hhomotopy n (phomotopy.refl f) x = idp) (Hid : Π(n : ℤ) {X : Type*} (x : HH n X), Hh n (pid X) x = x) (Hcompose : Π(n : ℤ) {X Y Z : Type*} (g : Y →* Z) (f : X →* Y) (z : HH n Z), Hh n (g ∘* f) z = Hh n f (Hh n g z)) (Hsusp : Π(n : ℤ) (X : Type*), HH (succ n) (psusp X) ≃g HH n X) (Hsusp_natural : Π(n : ℤ) {X Y : Type*} (f : X →* Y), Hsusp n X ∘ Hh (succ n) (psusp_functor f) ~ Hh n f ∘ Hsusp n Y) (Hexact : Π(n : ℤ) {X Y : Type*} (f : X →* Y), is_exact_g (Hh n (pcod f)) (Hh n f)) (Hadditive : Π(n : ℤ) {I : Type.{u}} (X : I → Type*), has_choice 0 I → is_equiv (Group_pi_intro (λi, Hh n (pinl i)) : HH n (⋁ X) → Πᵍ i, HH n (X i))) structure ordinary_theory.{u} extends cohomology_theory.{u} : Type.{u+1} := (Hdimension : Π(n : ℤ), n ≠ 0 → is_contr (HH n (plift pbool))) attribute cohomology_theory.HH [coercion] postfix `^→`:90 := cohomology_theory.Hh open cohomology_theory definition Hequiv (H : cohomology_theory) (n : ℤ) {X Y : Type*} (f : X ≃* Y) : H n Y ≃ H n X := equiv_of_isomorphism (Hiso H n f) definition Hsusp_neg (H : cohomology_theory) (n : ℤ) (X : Type*) : H n (psusp X) ≃g H (pred n) X := isomorphism_of_eq (ap (λn, H n _) proof (sub_add_cancel n 1)⁻¹ qed) ⬝g cohomology_theory.Hsusp H (pred n) X definition Hsusp_neg_natural (H : cohomology_theory) (n : ℤ) {X Y : Type*} (f : X →* Y) : Hsusp_neg H n X ∘ H ^→ n (psusp_functor f) ~ H ^→ (pred n) f ∘ Hsusp_neg H n Y := sorry definition Hsusp_inv_natural (H : cohomology_theory) (n : ℤ) {X Y : Type*} (f : X →* Y) : H ^→ (succ n) (psusp_functor f) ∘g (Hsusp H n Y)⁻¹ᵍ ~ (Hsusp H n X)⁻¹ᵍ ∘ H ^→ n f := sorry definition Hsusp_neg_inv_natural (H : cohomology_theory) (n : ℤ) {X Y : Type*} (f : X →* Y) : H ^→ n (psusp_functor f) ∘g (Hsusp_neg H n Y)⁻¹ᵍ ~ (Hsusp_neg H n X)⁻¹ᵍ ∘ H ^→ (pred n) f := sorry definition Hadditive_equiv (H : cohomology_theory) (n : ℤ) {I : Type} (X : I → Type*) (H2 : has_choice 0 I) : H n (⋁ X) ≃g Πᵍ i, H n (X i) := isomorphism.mk _ (Hadditive H n X H2) definition Hlift_empty.{u} (H : cohomology_theory.{u}) (n : ℤ) : is_contr (H n (plift punit)) := let P : lift empty → Type* := lift.rec empty.elim in let x := Hadditive H n P _ in begin note z := equiv.mk _ x, refine @(is_trunc_equiv_closed_rev -2 (_ ⬝e z ⬝e _)) !is_contr_unit, refine Hequiv H n (pequiv_punit_of_is_contr _ _ ⬝e* !pequiv_plift), apply is_contr_fwedge_of_neg, intro y, induction y with y, exact y, apply equiv_unit_of_is_contr, apply is_contr_pi_of_neg, intro y, induction y with y, exact y end definition Hempty (H : cohomology_theory.{0}) (n : ℤ) : is_contr (H n punit) := @(is_trunc_equiv_closed _ (Hequiv H n !pequiv_plift)) (Hlift_empty H n) definition Hconst (H : cohomology_theory) (n : ℤ) {X Y : Type*} (y : H n Y) : H ^→ n (pconst X Y) y = 1 := begin refine Hhomotopy H n (pconst_pcompose (pconst X (plift punit)))⁻¹* y ⬝ _, refine Hcompose H n _ _ y ⬝ _, refine ap (H ^→ n _) (@eq_of_is_contr _ (Hlift_empty H n) _ 1) ⬝ _, apply respect_one end -- definition Hwedge (H : cohomology_theory) (n : ℤ) (A B : Type*) : H n (A ∨ B) ≃g H n A ×ag H n B := -- begin -- refine Hiso H n (pwedge_pequiv_fwedge A B)⁻¹ᵉ* ⬝g _, -- refine Hadditive_equiv H n _ _ ⬝g _ -- end definition cohomology_theory_spectrum.{u} [constructor] (Y : spectrum.{u}) : cohomology_theory.{u} := cohomology_theory.mk (λn A, H^n[A, Y]) (λn A B f, cohomology_isomorphism f Y n) (λn A, cohomology_isomorphism_refl A Y n) (λn A B f, cohomology_functor f Y n) (λn A B f g p, cohomology_functor_phomotopy p Y n) (λn A B f x, cohomology_functor_phomotopy_refl f Y n x) (λn A x, cohomology_functor_pid A Y n x) (λn A B C g f x, cohomology_functor_pcompose g f Y n x) (λn A, cohomology_psusp A Y n) (λn A B f, cohomology_psusp_natural f Y n) (λn A B f, cohomology_exact f Y n) (λn I A H, spectrum_additive H A Y n) -- set_option pp.universes true -- set_option pp.abbreviations false -- print cohomology_theory_spectrum -- print EM_spectrum -- print has_choice_lift -- print equiv_lift -- print has_choice_equiv_closed definition ordinary_theory_EM [constructor] (G : AbGroup) : ordinary_theory := ⦃ordinary_theory, cohomology_theory_spectrum (EM_spectrum G), Hdimension := EM_dimension G ⦄ end cohomology