575 lines
23 KiB
Text
575 lines
23 KiB
Text
/-
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Copyright (c) 2015 Haitao Zhang. All rights reserved.
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Released under Apache 2.0 license as described in the file LICENSE.
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Author : Haitao Zhang
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-/
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import algebra.group data .hom .perm .finsubg
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namespace group_theory
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open finset function
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local attribute perm.f [coercion]
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private lemma and_left_true {a b : Prop} (Pa : a) : a ∧ b ↔ b :=
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by rewrite [iff_true_intro Pa, true_and]
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section def
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variables {G S : Type} [ambientG : group G] [finS : fintype S] [deceqS : decidable_eq S]
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include ambientG finS
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definition is_fixed_point (hom : G → perm S) (H : finset G) (a : S) : Prop :=
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∀ h, h ∈ H → hom h a = a
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include deceqS
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definition orbit (hom : G → perm S) (H : finset G) (a : S) : finset S :=
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image (move_by a) (image hom H)
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definition fixed_points [reducible] (hom : G → perm S) (H : finset G) : finset S :=
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{a ∈ univ | orbit hom H a = singleton a}
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variable [deceqG : decidable_eq G]
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include deceqG -- required by {x ∈ H |p x} filtering
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definition moverset (hom : G → perm S) (H : finset G) (a b : S) : finset G :=
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{f ∈ H | hom f a = b}
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definition stab (hom : G → perm S) (H : finset G) (a : S) : finset G :=
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{f ∈ H | hom f a = a}
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end def
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section orbit_stabilizer
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variables {G S : Type}
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variable [ambientG : group G]
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include ambientG
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variable [finS : fintype S]
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include finS
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variable [deceqS : decidable_eq S]
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include deceqS
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section
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variables {hom : G → perm S} {H : finset G} {a : S} [Hom : is_hom_class hom]
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include Hom
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lemma exists_of_orbit {b : S} : b ∈ orbit hom H a → ∃ h, h ∈ H ∧ hom h a = b :=
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assume Pb,
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obtain p (Pp₁ : p ∈ image hom H) (Pp₂ : move_by a p = b), from exists_of_mem_image Pb,
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obtain h (Ph₁ : h ∈ H) (Ph₂ : hom h = p), from exists_of_mem_image Pp₁,
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assert Phab : hom h a = b, from calc
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hom h a = p a : Ph₂
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... = b : Pp₂,
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exists.intro h (and.intro Ph₁ Phab)
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lemma orbit_of_exists {b : S} : (∃ h, h ∈ H ∧ hom h a = b) → b ∈ orbit hom H a :=
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assume Pex, obtain h PinH Phab, from Pex,
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mem_image (mem_image_of_mem hom PinH) Phab
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lemma is_fixed_point_of_mem_fixed_points :
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a ∈ fixed_points hom H → is_fixed_point hom H a :=
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assume Pain, take h, assume Phin,
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eq_of_mem_singleton
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(of_mem_sep Pain ▸ orbit_of_exists (exists.intro h (and.intro Phin rfl)))
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lemma mem_fixed_points_of_exists_of_is_fixed_point :
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(∃ h, h ∈ H) → is_fixed_point hom H a → a ∈ fixed_points hom H :=
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assume Pex Pfp, mem_sep_of_mem !mem_univ
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(ext take x, iff.intro
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(assume Porb, obtain h Phin Pha, from exists_of_orbit Porb,
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by rewrite [mem_singleton_eq, -Pha, Pfp h Phin])
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(obtain h Phin, from Pex,
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by rewrite mem_singleton_eq;
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intro Peq; rewrite Peq;
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apply orbit_of_exists;
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existsi h; apply and.intro Phin (Pfp h Phin)))
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lemma is_fixed_point_iff_mem_fixed_points_of_exists :
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(∃ h, h ∈ H) → (a ∈ fixed_points hom H ↔ is_fixed_point hom H a) :=
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assume Pex, iff.intro is_fixed_point_of_mem_fixed_points (mem_fixed_points_of_exists_of_is_fixed_point Pex)
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lemma is_fixed_point_iff_mem_fixed_points [finsubgH : is_finsubg H] :
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a ∈ fixed_points hom H ↔ is_fixed_point hom H a :=
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is_fixed_point_iff_mem_fixed_points_of_exists (exists.intro 1 !finsubg_has_one)
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lemma is_fixed_point_of_one : is_fixed_point hom (singleton 1) a :=
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take h, assume Ph, by rewrite [eq_of_mem_singleton Ph, hom_map_one]
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lemma fixed_points_of_one : fixed_points hom (singleton 1) = univ :=
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ext take s, iff.intro (assume Pl, mem_univ s)
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(assume Pr, mem_fixed_points_of_exists_of_is_fixed_point
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(exists.intro 1 !mem_singleton) is_fixed_point_of_one)
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open fintype
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lemma card_fixed_points_of_one : card (fixed_points hom (singleton 1)) = card S :=
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by rewrite [fixed_points_of_one]
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end
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variable [deceqG : decidable_eq G]
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include deceqG
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-- these are already specified by stab hom H a
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variables {hom : G → perm S} {H : finset G} {a : S}
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variable [Hom : is_hom_class hom]
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include Hom
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lemma perm_f_mul (f g : G): perm.f ((hom f) * (hom g)) a = ((hom f) ∘ (hom g)) a :=
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rfl
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lemma stab_lmul {f g : G} : g ∈ stab hom H a → hom (f*g) a = hom f a :=
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assume Pgstab,
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assert hom g a = a, from of_mem_sep Pgstab, calc
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hom (f*g) a = perm.f ((hom f) * (hom g)) a : is_hom hom
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... = ((hom f) ∘ (hom g)) a : by rewrite perm_f_mul
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... = (hom f) a : by unfold compose; rewrite this
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lemma stab_subset : stab hom H a ⊆ H :=
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begin
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apply subset_of_forall, intro f Pfstab, apply mem_of_mem_sep Pfstab
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end
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lemma reverse_move {h g : G} : g ∈ moverset hom H a (hom h a) → hom (h⁻¹*g) a = a :=
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assume Pg,
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assert hom g a = hom h a, from of_mem_sep Pg, calc
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hom (h⁻¹*g) a = perm.f ((hom h⁻¹) * (hom g)) a : by rewrite (is_hom hom)
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... = ((hom h⁻¹) ∘ hom g) a : by rewrite perm_f_mul
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... = perm.f ((hom h)⁻¹ * hom h) a : by unfold compose; rewrite [this, perm_f_mul, hom_map_inv hom h]
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... = perm.f (1 : perm S) a : by rewrite (mul.left_inv (hom h))
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... = a : by esimp
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lemma moverset_inj_on_orbit : set.inj_on (moverset hom H a) (ts (orbit hom H a)) :=
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take b1 b2,
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assume Pb1, obtain h1 Ph1₁ Ph1₂, from exists_of_orbit Pb1,
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assert Ph1b1 : h1 ∈ moverset hom H a b1,
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from mem_sep_of_mem Ph1₁ Ph1₂,
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assume Psetb2 Pmeq, begin
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subst b1,
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rewrite Pmeq at Ph1b1,
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apply of_mem_sep Ph1b1
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end
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variable [subgH : is_finsubg H]
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include subgH
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lemma subg_stab_of_move {h g : G} :
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h ∈ H → g ∈ moverset hom H a (hom h a) → h⁻¹*g ∈ stab hom H a :=
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assume Ph Pg,
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assert Phinvg : h⁻¹*g ∈ H, from begin
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apply finsubg_mul_closed H,
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apply finsubg_has_inv H, assumption,
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apply mem_of_mem_sep Pg
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end,
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mem_sep_of_mem Phinvg (reverse_move Pg)
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lemma subg_stab_closed : finset_mul_closed_on (stab hom H a) :=
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take f g, assume Pfstab, assert Pf : hom f a = a, from of_mem_sep Pfstab,
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assume Pgstab,
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assert Pfg : hom (f*g) a = a, from calc
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hom (f*g) a = (hom f) a : stab_lmul Pgstab
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... = a : Pf,
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assert PfginH : (f*g) ∈ H,
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from finsubg_mul_closed H (mem_of_mem_sep Pfstab) (mem_of_mem_sep Pgstab),
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mem_sep_of_mem PfginH Pfg
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lemma subg_stab_has_one : 1 ∈ stab hom H a :=
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assert P : hom 1 a = a, from calc
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hom 1 a = perm.f (1 : perm S) a : {hom_map_one hom}
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... = a : rfl,
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assert PoneinH : 1 ∈ H, from finsubg_has_one H,
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mem_sep_of_mem PoneinH P
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lemma subg_stab_has_inv : finset_has_inv (stab hom H a) :=
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take f, assume Pfstab, assert Pf : hom f a = a, from of_mem_sep Pfstab,
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assert Pfinv : hom f⁻¹ a = a, from calc
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hom f⁻¹ a = hom f⁻¹ ((hom f) a) : by rewrite Pf
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... = perm.f ((hom f⁻¹) * (hom f)) a : by rewrite perm_f_mul
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... = hom (f⁻¹ * f) a : by rewrite (is_hom hom)
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... = hom 1 a : by rewrite mul.left_inv
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... = perm.f (1 : perm S) a : by rewrite (hom_map_one hom),
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assert PfinvinH : f⁻¹ ∈ H, from finsubg_has_inv H (mem_of_mem_sep Pfstab),
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mem_sep_of_mem PfinvinH Pfinv
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definition subg_stab_is_finsubg [instance] :
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is_finsubg (stab hom H a) :=
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is_finsubg.mk subg_stab_has_one subg_stab_closed subg_stab_has_inv
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lemma subg_lcoset_eq_moverset {h : G} :
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h ∈ H → fin_lcoset (stab hom H a) h = moverset hom H a (hom h a) :=
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assume Ph, ext (take g, iff.intro
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(assume Pl, obtain f (Pf₁ : f ∈ stab hom H a) (Pf₂ : h*f = g), from exists_of_mem_image Pl,
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assert Pfstab : hom f a = a, from of_mem_sep Pf₁,
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assert PginH : g ∈ H, begin
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subst Pf₂,
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apply finsubg_mul_closed H,
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assumption,
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apply mem_of_mem_sep Pf₁
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end,
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assert Pga : hom g a = hom h a, from calc
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hom g a = hom (h*f) a : by subst g
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... = hom h a : stab_lmul Pf₁,
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mem_sep_of_mem PginH Pga)
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(assume Pr, begin
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rewrite [↑fin_lcoset, mem_image_iff],
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existsi h⁻¹*g,
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split,
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exact subg_stab_of_move Ph Pr,
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apply mul_inv_cancel_left
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end))
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lemma subg_moverset_of_orbit_is_lcoset_of_stab (b : S) :
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b ∈ orbit hom H a → ∃ h, h ∈ H ∧ fin_lcoset (stab hom H a) h = moverset hom H a b :=
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assume Porb,
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obtain p (Pp₁ : p ∈ image hom H) (Pp₂ : move_by a p = b), from exists_of_mem_image Porb,
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obtain h (Ph₁ : h ∈ H) (Ph₂ : hom h = p), from exists_of_mem_image Pp₁,
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assert Phab : hom h a = b, from by subst p; assumption,
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exists.intro h (and.intro Ph₁ (Phab ▸ subg_lcoset_eq_moverset Ph₁))
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lemma subg_lcoset_of_stab_is_moverset_of_orbit (h : G) :
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h ∈ H → ∃ b, b ∈ orbit hom H a ∧ moverset hom H a b = fin_lcoset (stab hom H a) h :=
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assume Ph,
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have Pha : (hom h a) ∈ orbit hom H a, by
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apply mem_image_of_mem; apply mem_image_of_mem; exact Ph,
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exists.intro (hom h a) (and.intro Pha (eq.symm (subg_lcoset_eq_moverset Ph)))
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lemma subg_moversets_of_orbit_eq_stab_lcosets :
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image (moverset hom H a) (orbit hom H a) = fin_lcosets (stab hom H a) H :=
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ext (take s, iff.intro
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(assume Pl, obtain b Pb₁ Pb₂, from exists_of_mem_image Pl,
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obtain h Ph, from subg_moverset_of_orbit_is_lcoset_of_stab b Pb₁, begin
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rewrite [↑fin_lcosets, mem_image_eq],
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existsi h, subst Pb₂, assumption
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end)
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(assume Pr, obtain h Ph₁ Ph₂, from exists_of_mem_image Pr,
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obtain b Pb, from @subg_lcoset_of_stab_is_moverset_of_orbit G S ambientG finS deceqS deceqG hom H a Hom subgH h Ph₁, begin
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rewrite [mem_image_eq],
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existsi b, subst Ph₂, assumption
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end))
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open nat
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theorem orbit_stabilizer_theorem : card H = card (orbit hom H a) * card (stab hom H a) :=
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calc card H = card (fin_lcosets (stab hom H a) H) * card (stab hom H a) : lagrange_theorem stab_subset
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... = card (image (moverset hom H a) (orbit hom H a)) * card (stab hom H a) : subg_moversets_of_orbit_eq_stab_lcosets
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... = card (orbit hom H a) * card (stab hom H a) : card_image_eq_of_inj_on moverset_inj_on_orbit
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end orbit_stabilizer
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section orbit_partition
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variables {G S : Type} [ambientG : group G] [finS : fintype S]
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variables [deceqS : decidable_eq S]
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include ambientG finS deceqS
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variables {hom : G → perm S} [Hom : is_hom_class hom] {H : finset G} [subgH : is_finsubg H]
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include Hom subgH
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lemma in_orbit_refl {a : S} : a ∈ orbit hom H a :=
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mem_image (mem_image (finsubg_has_one H) (hom_map_one hom)) rfl
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lemma in_orbit_trans {a b c : S} :
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a ∈ orbit hom H b → b ∈ orbit hom H c → a ∈ orbit hom H c :=
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assume Painb Pbinc,
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obtain h PhinH Phba, from exists_of_orbit Painb,
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obtain g PginH Pgcb, from exists_of_orbit Pbinc,
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orbit_of_exists (exists.intro (h*g) (and.intro
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(finsubg_mul_closed H PhinH PginH)
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(calc hom (h*g) c = perm.f ((hom h) * (hom g)) c : is_hom hom
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... = ((hom h) ∘ (hom g)) c : by rewrite perm_f_mul
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... = (hom h) b : Pgcb
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... = a : Phba)))
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lemma in_orbit_symm {a b : S} : a ∈ orbit hom H b → b ∈ orbit hom H a :=
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assume Painb, obtain h PhinH Phba, from exists_of_orbit Painb,
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assert perm.f (hom h)⁻¹ a = b, by rewrite [-Phba, -perm_f_mul, mul.left_inv],
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assert (hom h⁻¹) a = b, by rewrite [hom_map_inv, this],
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orbit_of_exists (exists.intro h⁻¹ (and.intro (finsubg_has_inv H PhinH) this))
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lemma orbit_is_partition : is_partition (orbit hom H) :=
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take a b, propext (iff.intro
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(assume Painb, obtain h PhinH Phba, from exists_of_orbit Painb,
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ext take c, iff.intro
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(assume Pcina, in_orbit_trans Pcina Painb)
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(assume Pcinb, obtain g PginH Pgbc, from exists_of_orbit Pcinb,
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in_orbit_trans Pcinb (in_orbit_symm Painb)))
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(assume Peq, Peq ▸ in_orbit_refl))
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variables (hom) (H)
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open nat finset.partition fintype
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definition orbit_partition : @partition S _ :=
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mk univ (orbit hom H) orbit_is_partition
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(restriction_imp_union (orbit hom H) orbit_is_partition (λ a Pa, !subset_univ))
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definition orbits : finset (finset S) := equiv_classes (orbit_partition hom H)
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definition fixed_point_orbits : finset (finset S) :=
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{cls ∈ orbits hom H | card cls = 1}
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variables {hom} {H}
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lemma exists_iff_mem_orbits (orb : finset S) :
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orb ∈ orbits hom H ↔ ∃ a : S, orbit hom H a = orb :=
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begin
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esimp [orbits, equiv_classes, orbit_partition],
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rewrite [mem_image_iff],
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apply iff.intro,
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intro Pl,
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cases Pl with a Pa,
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rewrite (and_left_true !mem_univ) at Pa,
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existsi a, exact Pa,
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intro Pr,
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cases Pr with a Pa,
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rewrite -true_and at Pa, rewrite -(iff_true_intro (mem_univ a)) at Pa,
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existsi a, exact Pa
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end
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lemma exists_of_mem_orbits {orb : finset S} :
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orb ∈ orbits hom H → ∃ a : S, orbit hom H a = orb :=
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iff.elim_left (exists_iff_mem_orbits orb)
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lemma fixed_point_orbits_eq : fixed_point_orbits hom H = image (orbit hom H) (fixed_points hom H) :=
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ext take s, iff.intro
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(assume Pin,
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obtain Psin Ps, from iff.elim_left !mem_sep_iff Pin,
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obtain a Pa, from exists_of_mem_orbits Psin,
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mem_image
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(mem_sep_of_mem !mem_univ (eq.symm
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(eq_of_card_eq_of_subset (by rewrite [card_singleton, Pa, Ps])
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(subset_of_forall
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take x, assume Pxin, eq_of_mem_singleton Pxin ▸ in_orbit_refl))))
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Pa)
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(assume Pin,
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obtain a Pain Porba, from exists_of_mem_image Pin,
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mem_sep_of_mem
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(begin esimp [orbits, equiv_classes, orbit_partition], rewrite [mem_image_iff],
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existsi a, exact and.intro !mem_univ Porba end)
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(begin substvars, rewrite [of_mem_sep Pain] end))
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lemma orbit_inj_on_fixed_points : set.inj_on (orbit hom H) (ts (fixed_points hom H)) :=
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take a₁ a₂, begin
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rewrite [-*mem_eq_mem_to_set, ↑fixed_points, *mem_sep_iff],
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intro Pa₁ Pa₂,
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rewrite [and.right Pa₁, and.right Pa₂],
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exact eq_of_singleton_eq
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end
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lemma card_fixed_point_orbits_eq : card (fixed_point_orbits hom H) = card (fixed_points hom H) :=
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by rewrite fixed_point_orbits_eq; apply card_image_eq_of_inj_on orbit_inj_on_fixed_points
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lemma orbit_class_equation : card S = Sum (orbits hom H) card :=
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class_equation (orbit_partition hom H)
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lemma card_fixed_point_orbits : Sum (fixed_point_orbits hom H) card = card (fixed_point_orbits hom H) :=
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calc Sum _ _ = Sum (fixed_point_orbits hom H) (λ x, 1) : Sum_ext (take c Pin, of_mem_sep Pin)
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... = card (fixed_point_orbits hom H) * 1 : Sum_const_eq_card_mul
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... = card (fixed_point_orbits hom H) : mul_one (card (fixed_point_orbits hom H))
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local attribute nat.comm_semiring [instance]
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lemma orbit_class_equation' : card S = card (fixed_points hom H) + Sum {cls ∈ orbits hom H | card cls ≠ 1} card :=
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calc card S = Sum (orbits hom H) finset.card : orbit_class_equation
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... = Sum (fixed_point_orbits hom H) finset.card + Sum {cls ∈ orbits hom H | card cls ≠ 1} card : Sum_binary_union
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... = card (fixed_point_orbits hom H) + Sum {cls ∈ orbits hom H | card cls ≠ 1} card : by rewrite -card_fixed_point_orbits
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... = card (fixed_points hom H) + Sum {cls ∈ orbits hom H | card cls ≠ 1} card : by rewrite card_fixed_point_orbits_eq
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end orbit_partition
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section cayley
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variables {G : Type}
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variable [ambientG : group G]
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include ambientG
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variable [finG : fintype G]
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include finG
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definition action_by_lmul : G → perm G :=
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take g, perm.mk (lmul_by g) (lmul_inj g)
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variable [deceqG : decidable_eq G]
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include deceqG
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lemma action_by_lmul_hom : homomorphic (@action_by_lmul G _ _) :=
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take g₁ (g₂ : G), eq.symm (calc
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action_by_lmul g₁ * action_by_lmul g₂
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= perm.mk ((lmul_by g₁)∘(lmul_by g₂)) _ : rfl
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... = perm.mk (lmul_by (g₁*g₂)) _ : by congruence; apply coset.lmul_compose)
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lemma action_by_lmul_inj : injective (@action_by_lmul G _ _) :=
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take g₁ g₂, assume Peq, perm.no_confusion Peq
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(λ Pfeq Pqeq,
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have Pappeq : g₁*1 = g₂*1, from congr_fun Pfeq _,
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calc g₁ = g₁ * 1 : mul_one
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... = g₂ * 1 : Pappeq
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... = g₂ : mul_one)
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definition action_by_lmul_is_iso [instance] : is_iso_class (@action_by_lmul G _ _) :=
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is_iso_class.mk action_by_lmul_hom action_by_lmul_inj
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end cayley
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section lcosets
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open fintype subtype
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variables {G : Type} [ambientG : group G] [finG : fintype G] [deceqG : decidable_eq G]
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include ambientG deceqG finG
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variables H : finset G
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definition action_on_lcoset : G → perm (lcoset_type univ H) :=
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take g, perm.mk (lcoset_lmul (mem_univ g)) lcoset_lmul_inj
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private definition lcoset_of (g : G) : lcoset_type univ H :=
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tag (fin_lcoset H g) (exists.intro g (and.intro !mem_univ rfl))
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variable {H}
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lemma action_on_lcoset_eq (g : G) (J : lcoset_type univ H)
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: elt_of (action_on_lcoset H g J) = fin_lcoset (elt_of J) g := rfl
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lemma action_on_lcoset_hom : homomorphic (action_on_lcoset H) :=
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take g₁ g₂, eq_of_feq (funext take S, subtype.eq
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(by rewrite [↑action_on_lcoset, ↑lcoset_lmul, -fin_lcoset_compose]))
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definition action_on_lcoset_is_hom [instance] : is_hom_class (action_on_lcoset H) :=
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is_hom_class.mk action_on_lcoset_hom
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variable [finsubgH : is_finsubg H]
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include finsubgH
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lemma aol_fixed_point_subset_normalizer (J : lcoset_type univ H) :
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is_fixed_point (action_on_lcoset H) H J → elt_of J ⊆ normalizer H :=
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obtain j Pjin Pj, from exists_of_lcoset_type J,
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assume Pfp,
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assert PH : ∀ {h}, h ∈ H → fin_lcoset (fin_lcoset H j) h = fin_lcoset H j,
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from take h, assume Ph, by rewrite [Pj, -action_on_lcoset_eq, Pfp h Ph],
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subset_of_forall take g, begin
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rewrite [-Pj, fin_lcoset_same, -inv_inv at {2}],
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intro Pg,
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rewrite -Pg at PH,
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apply finsubg_has_inv,
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apply mem_sep_of_mem !mem_univ,
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intro h Ph,
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assert Phg : fin_lcoset (fin_lcoset H g) h = fin_lcoset H g, exact PH Ph,
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revert Phg,
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rewrite [↑conj_by, inv_inv, mul.assoc, fin_lcoset_compose, -fin_lcoset_same, ↑fin_lcoset, mem_image_iff, ↑lmul_by],
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intro Pex, cases Pex with k Pand, cases Pand with Pkin Pk,
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rewrite [-Pk, inv_mul_cancel_left], exact Pkin
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end
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lemma aol_fixed_point_of_mem_normalizer {g : G} :
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g ∈ normalizer H → is_fixed_point (action_on_lcoset H) H (lcoset_of H g) :=
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assume Pgin, take h, assume Phin, subtype.eq
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(by rewrite [action_on_lcoset_eq, ↑lcoset_of, lrcoset_same_of_mem_normalizer Pgin, fin_lrcoset_comm, finsubg_lcoset_id Phin])
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lemma aol_fixed_points_eq_normalizer :
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Union (fixed_points (action_on_lcoset H) H) elt_of = normalizer H :=
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ext take g, begin
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rewrite [mem_Union_iff],
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apply iff.intro,
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intro Pl,
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cases Pl with L PL, revert PL,
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rewrite [is_fixed_point_iff_mem_fixed_points],
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intro Pg,
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apply mem_of_subset_of_mem,
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apply aol_fixed_point_subset_normalizer L, exact and.left Pg,
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exact and.right Pg,
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intro Pr,
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existsi (lcoset_of H g), apply and.intro,
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rewrite [is_fixed_point_iff_mem_fixed_points],
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exact aol_fixed_point_of_mem_normalizer Pr,
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exact fin_mem_lcoset g
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end
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open nat
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lemma card_aol_fixed_points_eq_card_cosets :
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card (fixed_points (action_on_lcoset H) H) = card (lcoset_type (normalizer H) H) :=
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have Peq : card (fixed_points (action_on_lcoset H) H) * card H = card (lcoset_type (normalizer H) H) * card H, from calc
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card _ * card H = card (Union (fixed_points (action_on_lcoset H) H) elt_of) : card_Union_lcosets
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... = card (normalizer H) : aol_fixed_points_eq_normalizer
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... = card (lcoset_type (normalizer H) H) * card H : lagrange_theorem' subset_normalizer,
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eq_of_mul_eq_mul_right (card_pos_of_mem !finsubg_has_one) Peq
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end lcosets
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section perm_fin
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open fin nat eq.ops
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variable {n : nat}
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definition lift_perm (p : perm (fin n)) : perm (fin (succ n)) :=
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perm.mk (lift_fun p) (lift_fun_of_inj (perm.inj p))
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definition lower_perm (p : perm (fin (succ n))) (P : p maxi = maxi) : perm (fin n) :=
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perm.mk (lower_inj p (perm.inj p) P)
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(take i j, begin
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rewrite [-eq_iff_veq, *lower_inj_apply, eq_iff_veq],
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apply injective_compose (perm.inj p) lift_succ_inj
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end)
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lemma lift_lower_eq : ∀ {p : perm (fin (succ n))} (P : p maxi = maxi),
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lift_perm (lower_perm p P) = p
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| (perm.mk pf Pinj) := assume Pmax, begin
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rewrite [↑lift_perm], congruence,
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apply funext, intro i,
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assert Pfmax : pf maxi = maxi, apply Pmax,
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assert Pd : decidable (i = maxi),
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exact _,
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cases Pd with Pe Pne,
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rewrite [Pe, Pfmax], apply lift_fun_max,
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rewrite [lift_fun_of_ne_max Pne, ↑lower_perm, ↑lift_succ],
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rewrite [-eq_iff_veq, -val_lift, lower_inj_apply, eq_iff_veq],
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congruence, rewrite [-eq_iff_veq]
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end
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lemma lift_perm_inj : injective (@lift_perm n) :=
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take p1 p2, assume Peq, eq_of_feq (lift_fun_inj (feq_of_eq Peq))
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lemma lift_perm_inj_on_univ : set.inj_on (@lift_perm n) (ts univ) :=
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eq.symm to_set_univ ▸ iff.elim_left set.injective_iff_inj_on_univ lift_perm_inj
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lemma lift_to_stab : image (@lift_perm n) univ = stab id univ maxi :=
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ext (take (pp : perm (fin (succ n))), iff.intro
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(assume Pimg, obtain p P_ Pp, from exists_of_mem_image Pimg,
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assert Ppp : pp maxi = maxi, from calc
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pp maxi = lift_perm p maxi : {eq.symm Pp}
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... = lift_fun p maxi : rfl
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... = maxi : lift_fun_max,
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mem_sep_of_mem !mem_univ Ppp)
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(assume Pstab,
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assert Ppp : pp maxi = maxi, from of_mem_sep Pstab,
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mem_image !mem_univ (lift_lower_eq Ppp)))
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definition move_from_max_to (i : fin (succ n)) : perm (fin (succ n)) :=
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perm.mk (madd (i - maxi)) madd_inj
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lemma orbit_max : orbit (@id (perm (fin (succ n)))) univ maxi = univ :=
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ext (take i, iff.intro
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(assume P, !mem_univ)
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(assume P, begin
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apply mem_image,
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apply mem_image,
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apply mem_univ (move_from_max_to i), apply rfl,
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apply sub_add_cancel
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end))
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lemma card_orbit_max : card (orbit (@id (perm (fin (succ n)))) univ maxi) = succ n :=
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calc card (orbit (@id (perm (fin (succ n)))) univ maxi) = card univ : by rewrite orbit_max
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... = succ n : card_fin (succ n)
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open fintype
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lemma card_lift_to_stab : card (stab (@id (perm (fin (succ n)))) univ maxi) = card (perm (fin n)) :=
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calc finset.card (stab (@id (perm (fin (succ n)))) univ maxi)
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= finset.card (image (@lift_perm n) univ) : by rewrite lift_to_stab
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... = card univ : by rewrite (card_image_eq_of_inj_on lift_perm_inj_on_univ)
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lemma card_perm_step : card (perm (fin (succ n))) = (succ n) * card (perm (fin n)) :=
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calc card (perm (fin (succ n)))
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= card (orbit id univ maxi) * card (stab id univ maxi) : orbit_stabilizer_theorem
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... = (succ n) * card (stab id univ maxi) : {card_orbit_max}
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... = (succ n) * card (perm (fin n)) : by rewrite -card_lift_to_stab
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end perm_fin
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end group_theory
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