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| (* (c) Copyright 2006-2016 Microsoft Corporation and Inria. *) | |
| (* Distributed under the terms of CeCILL-B. *) | |
| Require Import mathcomp.ssreflect.ssreflect. | |
| From mathcomp | |
| Require Import ssrbool ssrfun eqtype ssrnat seq div fintype path. | |
| From mathcomp | |
| Require Import finset prime fingroup automorphism action gproduct gfunctor. | |
| From mathcomp | |
| Require Import center commutator pgroup gseries nilpotent sylow abelian maximal. | |
| From odd_order | |
| Require Import BGsection1 BGsection5 BGsection6 BGsection7. | |
| (******************************************************************************) | |
| (* This file covers B & G, section 8, i.e., the proof of two special cases *) | |
| (* of the Uniqueness Theorem, for maximal groups with Fitting subgroups of *) | |
| (* rank at least 3. *) | |
| (******************************************************************************) | |
| Set Implicit Arguments. | |
| Unset Strict Implicit. | |
| Unset Printing Implicit Defensive. | |
| Import GroupScope. | |
| Section Eight. | |
| Variable gT : minSimpleOddGroupType. | |
| Local Notation G := (TheMinSimpleOddGroup gT). | |
| Implicit Types H M A X P : {group gT}. | |
| Implicit Types p q r : nat. | |
| Local Notation "K ` p" := 'O_(nat_pred_of_nat p)(K) | |
| (at level 8, p at level 2, format "K ` p") : group_scope. | |
| Local Notation "K ` p" := 'O_(nat_pred_of_nat p)(K)%G : Group_scope. | |
| (* This is B & G, Theorem 8.1(a). *) | |
| Theorem non_pcore_Fitting_Uniqueness p M A0 : | |
| M \in 'M -> ~~ p.-group ('F(M)) -> A0 \in 'E*_p('F(M)) -> 'r_p(A0) >= 3 -> | |
| 'C_('F(M))(A0)%G \in 'U. | |
| Proof. | |
| set F := 'F(M) => maxM p'F /pmaxElemP[/=/setIdP[sA0F abelA0] maxA0]. | |
| have [pA0 cA0A0 _] := and3P abelA0; rewrite (p_rank_abelem abelA0) => dimA0_3. | |
| rewrite (uniq_mmax_subset1 maxM) //= -/F; last by rewrite subIset ?Fitting_sub. | |
| set A := 'C_F(A0); pose pi := \pi(A). | |
| have [sZA sAF]: 'Z(F) \subset A /\ A \subset F by rewrite subsetIl setIS ?centS. | |
| have nilF: nilpotent F := Fitting_nil _. | |
| have nilZ := nilpotentS (center_sub _) nilF. | |
| have piZ: \pi('Z(F)) = \pi(F) by rewrite pi_center_nilpotent. | |
| have def_pi: pi = \pi(F). | |
| by apply/eq_piP=> q; apply/idP/idP; last rewrite -piZ; apply: piSg. | |
| have def_nZq: forall q, q \in pi -> 'N('Z(F)`q) = M. | |
| move=> q; rewrite def_pi -piZ -p_part_gt1. | |
| rewrite -(card_Hall (nilpotent_pcore_Hall _ nilZ)) cardG_gt1 /= -/F => ntZ. | |
| by apply: mmax_normal => //=; rewrite !gFnormal_trans. | |
| have sCqM: forall q, q \in pi -> 'C(A`q) \subset M. | |
| move=> q /def_nZq <-; rewrite cents_norm // centS //. | |
| rewrite (sub_Hall_pcore (nilpotent_pcore_Hall _ _)) ?pcore_pgroup //. | |
| by apply: nilpotentS (Fitting_nil M); apply: subsetIl. | |
| exact: gFsub_trans. | |
| have sA0A: A0 \subset A by rewrite subsetI sA0F. | |
| have pi_p: p \in pi. | |
| by apply: (piSg sA0A); rewrite -[p \in _]logn_gt0 (leq_trans _ dimA0_3). | |
| have sCAM: 'C(A) \subset M. | |
| by rewrite (subset_trans (centS (pcore_sub p _))) ?sCqM. | |
| have prM: M \proper G := mmax_proper maxM; have solM := mFT_sol prM. | |
| have piCA: pi.-group('C(A)). | |
| apply/pgroupP=> q q_pr; case/Cauchy=> // x cAx oxq; apply/idPn=> pi'q. | |
| have Mx := subsetP sCAM x cAx; pose C := 'C_F(<[x]>). | |
| have sAC: A \subset C by rewrite subsetI sAF centsC cycle_subG. | |
| have sCFC_C: 'C_F(C) \subset C. | |
| by rewrite (subset_trans _ sAC) ?setIS // centS ?(subset_trans _ sAC). | |
| have cFx: x \in 'C_M(F). | |
| rewrite inE Mx -cycle_subG coprime_nil_faithful_cent_stab //=. | |
| by rewrite cycle_subG (subsetP (gFnorm _ _)). | |
| by rewrite -orderE coprime_pi' ?cardG_gt0 // -def_pi oxq pnatE. | |
| case/negP: pi'q; rewrite def_pi mem_primes q_pr cardG_gt0 -oxq cardSg //. | |
| by rewrite cycle_subG (subsetP (cent_sub_Fitting _)). | |
| have{p'F} pi_alt q: exists2 r, r \in pi & r != q. | |
| have [<-{q} | ] := eqVneq p q; last by exists p. | |
| rewrite def_pi; apply/allPn; apply: contra p'F => /allP/=pF. | |
| by apply/pgroupP=> q q_pr qF; rewrite !inE pF // mem_primes q_pr cardG_gt0. | |
| have sNZqXq' q X: | |
| A \subset X -> X \proper G -> 'O_q^'('N_X('Z(F)`q)) \subset 'O_q^'(X). | |
| - move=> sAX prX. | |
| have sZqX: 'Z(F)`q \subset X by apply: gFsub_trans (subset_trans sZA sAX). | |
| have cZqNXZ: 'O_q^'('N_X('Z(F)`q)) \subset 'C('Z(F)`q). | |
| have coNq'Zq: coprime #|'O_q^'('N_X('Z(F)`q))| #|'Z(F)`q|. | |
| by rewrite coprime_sym coprime_pcoreC. | |
| rewrite (sameP commG1P trivgP) -(coprime_TIg coNq'Zq) subsetI commg_subl /=. | |
| rewrite commg_subr /= andbC gFsub_trans ?subsetIr //=. | |
| by rewrite gFnorm_trans ?normsG // subsetI sZqX normG. | |
| have: 'O_q^'('C_X(('Z(F))`q)) \subset 'O_q^'(X). | |
| by rewrite p'core_cent_pgroup ?mFT_sol // /psubgroup sZqX pcore_pgroup. | |
| apply: subset_trans; apply: subset_trans (pcoreS _ (subcent_sub _ _)). | |
| by rewrite !subsetI subxx cZqNXZ gFsub_trans ?subsetIl. | |
| have sArXq' q r X: | |
| q \in pi -> q != r -> A \subset X -> X \proper G -> A`r \subset 'O_q^'(X). | |
| - move=> pi_q r'q sAX prX; apply: subset_trans (sNZqXq' q X sAX prX). | |
| apply: subset_trans (pcoreS _ (subsetIr _ _)). | |
| rewrite -setIA (setIidPr (pcore_sub _ _)) subsetI gFsub_trans //= def_nZq //. | |
| apply: subset_trans (pcore_Fitting _ _); rewrite -/F. | |
| rewrite (sub_Hall_pcore (nilpotent_pcore_Hall _ nilF)) ?gFsub_trans //. | |
| by apply: (pi_pnat (pcore_pgroup _ _)); rewrite !inE eq_sym. | |
| have cstrA: normed_constrained A. | |
| split=> [||X Y sAX prX]. | |
| - by apply/eqP=> A1; rewrite /pi /= A1 cards1 in pi_p. | |
| - exact: sub_proper_trans (subset_trans sAF (Fitting_sub _)) prM. | |
| rewrite !inE -/pi -andbA => /and3P[sYX pi'Y nYA]. | |
| rewrite -bigcap_p'core subsetI sYX; apply/bigcapsP=> [[q /= _] pi_q]. | |
| have [r pi_r q'r] := pi_alt q. | |
| have{} sArXq': A`r \subset 'O_q^'(X) by apply: sArXq'; rewrite 1?eq_sym. | |
| have cA_CYr: 'C_Y(A`r) \subset 'C(A). | |
| have coYF: coprime #|Y| #|F|. | |
| by rewrite coprime_sym coprime_pi' ?cardG_gt0 // -def_pi. | |
| rewrite (sameP commG1P trivgP) -(coprime_TIg coYF) commg_subI //. | |
| by rewrite setIS // (subset_trans (sCqM r pi_r)) // gFnorm. | |
| by rewrite subsetI subsetIl. | |
| have{cA_CYr} CYr1: 'C_Y(A`r) = 1. | |
| rewrite -(setIid Y) setIAC coprime_TIg // (coprimeSg cA_CYr) //. | |
| by rewrite (pnat_coprime piCA). | |
| have{CYr1} ->: Y :=: [~: Y, A`r]. | |
| rewrite -(mulg1 [~: Y, _]) -CYr1 coprime_cent_prod ?gFsub_trans //. | |
| rewrite coprime_sym (coprimeSg (pcore_sub _ _)) //= -/A. | |
| by rewrite coprime_pi' ?cardG_gt0. | |
| by rewrite mFT_sol // (sub_proper_trans sYX). | |
| rewrite (subset_trans (commgS _ sArXq')) //. | |
| by rewrite commg_subr gFnorm_trans ?normsG. | |
| have{cstrA} nbyApi'1 q: q \in pi^' -> |/|*(A; q) = [set 1%G]. | |
| move=> pi'q; have trA: [transitive 'O_pi^'('C(A)), on |/|*(A; q) | 'JG]. | |
| apply: normed_constrained_rank3_trans; rewrite //= -/A. | |
| rewrite -rank_abelem // in dimA0_3; apply: leq_trans dimA0_3 (rankS _). | |
| by rewrite /= -/A subsetI sA0A centsC subsetIr. | |
| have [Q maxQ defAmax]: exists2 Q, Q \in |/|*(A; q) & |/|*(A; q) = [set Q]. | |
| case/imsetP: trA => Q maxQ defAmax; exists Q; rewrite // {maxQ}defAmax. | |
| suffices ->: 'O_pi^'('C(A)) = 1 by rewrite /orbit imset_set1 act1. | |
| rewrite -(setIidPr (pcore_sub _ _)) coprime_TIg //. | |
| exact: pnat_coprime piCA (pcore_pgroup _ _). | |
| have{maxQ} qQ: q.-group Q by move: maxQ; rewrite inE => /maxgroupp/andP[]. | |
| have [<- // |] := eqVneq Q 1%G; rewrite -val_eqE /= => ntQ. | |
| have{defAmax trA} defFmax: |/|*(F; q) = [set Q]. | |
| apply/eqP; rewrite eqEcard cards1 -defAmax. | |
| have snAF: A <|<| F by rewrite nilpotent_subnormal ?Fitting_nil. | |
| have piF: pi.-group F by rewrite def_pi /pgroup pnat_pi ?cardG_gt0. | |
| case/(normed_trans_superset _ _ snAF): trA => //= _ /imsetP[R maxR _] -> _. | |
| by rewrite (cardsD1 R) maxR. | |
| have nQM: M \subset 'N(Q). | |
| apply/normsP=> x Mx; apply: congr_group; apply/set1P. | |
| rewrite -defFmax (acts_act (norm_acts_max_norm _ _)) ?defFmax ?set11 //. | |
| by apply: subsetP Mx; apply: gFnorm. | |
| have{nQM} nsQM: Q <| M. | |
| rewrite inE in maxM; case/maxgroupP: maxM => _ maxM. | |
| rewrite -(maxM 'N(Q)%G) ?normalG ?mFT_norm_proper //. | |
| exact: mFT_pgroup_proper qQ. | |
| have sQF: Q \subset F by rewrite Fitting_max ?(pgroup_nil qQ). | |
| rewrite -(setIidPr sQF) coprime_TIg ?eqxx // in ntQ. | |
| by rewrite coprime_pi' ?cardG_gt0 // -def_pi (pi_pnat qQ). | |
| apply/subsetP=> H /setIdP[maxH sAH]; rewrite inE -val_eqE /=. | |
| have prH: H \proper G := mmax_proper maxH; have solH := mFT_sol prH. | |
| pose D := 'F(H); have nilD: nilpotent D := Fitting_nil H. | |
| have card_pcore_nil := card_Hall (nilpotent_pcore_Hall _ _). | |
| have piD: \pi(D) = pi. | |
| set sigma := \pi(_); have pi_sig: {subset sigma <= pi}. | |
| move=> q; rewrite -p_part_gt1 -card_pcore_nil // cardG_gt1 /= -/D. | |
| apply: contraR => /nbyApi'1 defAmax. | |
| have nDqA: A \subset 'N(D`q). | |
| by rewrite gFnorm_trans // (subset_trans sAH) ?gFnorm. | |
| have [Q]:= max_normed_exists (pcore_pgroup _ _) nDqA. | |
| by rewrite defAmax -subG1; move/set1P->. | |
| apply/eq_piP=> q; apply/idP/idP=> [|pi_q]; first exact: pi_sig. | |
| apply: contraLR (pi_q) => sig'q; have nilA := nilpotentS sAF nilF. | |
| rewrite -p_part_eq1 -card_pcore_nil // -trivg_card1 -subG1 /= -/A. | |
| have <-: 'O_sigma^'(H) = 1. | |
| apply/eqP; rewrite -trivg_Fitting ?(solvableS (pcore_sub _ _)) //. | |
| rewrite Fitting_pcore -(setIidPr (pcore_sub _ _)) coprime_TIg //. | |
| by rewrite coprime_pi' ?cardG_gt0 //; apply: pcore_pgroup. | |
| rewrite -bigcap_p'core subsetI gFsub_trans //=. | |
| apply/bigcapsP=> -[r /= _] sig_r; apply: sArXq' => //; first exact: pi_sig. | |
| by apply: contraNneq sig'q => <-. | |
| have cAD q r: q != r -> D`q \subset 'C(A`r). | |
| move=> r'q; have [-> |] := eqVneq D`q 1; first by rewrite sub1G. | |
| rewrite -cardG_gt1 card_pcore_nil // p_part_gt1 piD => pi_q. | |
| have sArHq': A`r \subset 'O_q^'(H) by rewrite sArXq'. | |
| have coHqHq': coprime #|D`q| #|'O_q^'(H)| by rewrite coprime_pcoreC. | |
| rewrite (sameP commG1P trivgP) -(coprime_TIg coHqHq') commg_subI //. | |
| by rewrite subsetI subxx /= p_core_Fitting gFsub_trans ?gFnorm. | |
| rewrite subsetI sArHq' gFsub_trans ?(subset_trans sAH) //=. | |
| by rewrite p_core_Fitting gFnorm. | |
| have sDM: D \subset M. | |
| rewrite [D]FittingEgen gen_subG; apply/bigcupsP=> [[q /= _] _]. | |
| rewrite -p_core_Fitting -/D; have [r pi_r r'q] := pi_alt q. | |
| by apply: subset_trans (sCqM r pi_r); apply: cAD; rewrite eq_sym. | |
| have cApHp': A`p \subset 'C('O_p^'(H)). | |
| have coApHp': coprime #|'O_p^'(H)| #|A`p|. | |
| by rewrite coprime_sym coprime_pcoreC. | |
| have solHp': solvable 'O_p^'(H) by rewrite (solvableS (pcore_sub _ _)). | |
| have nHp'Ap: A`p \subset 'N('O_p^'(H)). | |
| by rewrite gFsub_trans ?gFnorm_trans ?normsG. | |
| apply: subset_trans (coprime_cent_Fitting nHp'Ap coApHp' solHp'). | |
| rewrite subsetI subxx centsC /= FittingEgen gen_subG. | |
| apply/bigcupsP=> [[q /= _] _]; have [-> | /cAD] := eqVneq q p. | |
| by rewrite -(setIidPl (pcore_sub p _)) TI_pcoreC sub1G. | |
| apply: subset_trans; rewrite p_core_Fitting -pcoreI. | |
| by apply: sub_pcore => r /andP[]. | |
| have sHp'M: 'O_p^'(H) \subset M. | |
| by apply: subset_trans (sCqM p pi_p); rewrite centsC. | |
| have ntDp: D`p != 1 by rewrite -cardG_gt1 card_pcore_nil // p_part_gt1 piD. | |
| have sHp'_NMDp': 'O_p^'(H) \subset 'O_p^'('N_M(D`p)). | |
| apply: subset_trans (pcoreS _ (subsetIr _ _)). | |
| rewrite -setIA (setIidPr (pcore_sub _ _)) /= (mmax_normal maxH) //. | |
| by rewrite subsetI sHp'M subxx. | |
| by rewrite /= p_core_Fitting pcore_normal. | |
| have{sHp'_NMDp'} sHp'Mp': 'O_p^'(H) \subset 'O_p^'(M). | |
| have pM_D: p.-subgroup(M) D`p. | |
| by rewrite /psubgroup pcore_pgroup gFsub_trans. | |
| apply: subset_trans (p'core_cent_pgroup pM_D (mFT_sol prM)). | |
| apply: subset_trans (pcoreS _ (subcent_sub _ _)). | |
| rewrite !subsetI sHp'_NMDp' sHp'M andbT /= (sameP commG1P trivgP). | |
| have coHp'Dp: coprime #|'O_p^'(H)| #|D`p|. | |
| by rewrite coprime_sym coprime_pcoreC. | |
| rewrite -(coprime_TIg coHp'Dp) subsetI commg_subl commg_subr /=. | |
| by rewrite p_core_Fitting !gFsub_trans ?gFnorm. | |
| have sMp'H: 'O_p^'(M) \subset H. | |
| rewrite -(mmax_normal maxH (pcore_normal p H)) /= -p_core_Fitting //. | |
| rewrite -/D (subset_trans _ (cent_sub _)) // centsC. | |
| have solMp' := solvableS (pcore_sub p^' _) (mFT_sol prM). | |
| have coMp'Dp: coprime #|'O_p^'(M)| #|D`p|. | |
| by rewrite coprime_sym coprime_pcoreC. | |
| have nMp'Dp: D`p \subset 'N('O_p^'(M)). | |
| by rewrite gFsub_trans ?(subset_trans sDM) ?gFnorm. | |
| apply: subset_trans (coprime_cent_Fitting nMp'Dp coMp'Dp solMp'). | |
| rewrite subsetI subxx centsC /= FittingEgen gen_subG. | |
| apply/bigcupsP=> [[q /= _] _]; have [<- | /cAD] := eqVneq p q. | |
| by rewrite -(setIidPl (pcore_sub p _)) TI_pcoreC sub1G. | |
| rewrite centsC; apply: subset_trans. | |
| rewrite -p_core_Fitting Fitting_pcore pcore_max ?pcore_pgroup //=. | |
| rewrite /normal subsetI -pcoreI pcore_sub subIset ?gFnorm //=. | |
| rewrite pcoreI gFsub_trans //= -/F centsC. | |
| case/dprodP: (nilpotent_pcoreC p nilF) => _ _ /= cFpp' _. | |
| rewrite centsC (subset_trans cFpp' (centS _)) //. | |
| have hallFp := nilpotent_pcore_Hall p nilF. | |
| by rewrite (sub_Hall_pcore hallFp). | |
| have{sHp'Mp' sMp'H} eqHp'Mp': 'O_p^'(H) = 'O_p^'(M). | |
| apply/eqP; rewrite eqEsubset sHp'Mp'. | |
| apply: subset_trans (sNZqXq' p H sAH prH). | |
| apply: subset_trans (pcoreS _ (subsetIr _ _)). | |
| rewrite -setIA (setIidPr (pcore_sub _ _)) subsetI sMp'H /=. | |
| rewrite (mmax_normal maxM) ?gFnormal_trans //. | |
| by rewrite -cardG_gt1 card_pcore_nil // p_part_gt1 piZ -def_pi. | |
| have ntHp': 'O_p^'(H) != 1. | |
| have [q pi_q p'q] := pi_alt p; have: D`q \subset 'O_p^'(H). | |
| by rewrite p_core_Fitting sub_pcore // => r; move/eqnP->. | |
| rewrite -proper1G; apply: proper_sub_trans; rewrite proper1G. | |
| by rewrite -cardG_gt1 card_pcore_nil // p_part_gt1 piD. | |
| rewrite -(mmax_normal maxH (pcore_normal p^' H)) //= eqHp'Mp'. | |
| by rewrite (mmax_normal maxM (pcore_normal _ _)) //= -eqHp'Mp'. | |
| Qed. | |
| (* This is B & G, Theorem 8.1(b). *) | |
| Theorem SCN_Fitting_Uniqueness p M P A : | |
| M \in 'M -> p.-group ('F(M)) -> p.-Sylow(M) P -> | |
| 'r_p('F(M)) >= 3 -> A \in 'SCN_3(P) -> | |
| [/\ p.-Sylow(G) P, A \subset 'F(M) & A \in 'U]. | |
| Proof. | |
| set F := 'F(M) => maxM pF sylP dimFp3 scn3_A. | |
| have [scnA dimA3] := setIdP scn3_A; have [nsAP defCA] := SCN_P scnA. | |
| have cAA := SCN_abelian scnA; have sAP := normal_sub nsAP. | |
| have [sPM pP _] := and3P sylP; have sAM := subset_trans sAP sPM. | |
| have{dimA3} ntA: A :!=: 1 by case: eqP dimA3 => // ->; rewrite rank1. | |
| have prM := mmax_proper maxM; have solM := mFT_sol prM. | |
| have{pF} Mp'1: 'O_p^'(M) = 1. | |
| apply/eqP; rewrite -trivg_Fitting ?(solvableS (pcore_sub _ _)) //. | |
| rewrite Fitting_pcore -(setIidPr (pcore_sub _ _)) coprime_TIg //. | |
| exact: pnat_coprime (pcore_pgroup _ _). | |
| have defF: F = M`p := Fitting_eq_pcore Mp'1. | |
| have sFP: F \subset P by rewrite defF (pcore_sub_Hall sylP). | |
| have sAF: A \subset F. | |
| rewrite defF -(pseries_pop2 _ Mp'1). | |
| exact: (odd_p_abelian_constrained (mFT_odd _) solM sylP cAA nsAP). | |
| have sZA: 'Z(F) \subset A. | |
| by rewrite -defCA setISS ?centS // defF pcore_sub_Hall. | |
| have sCAM: 'C(A) \subset M. | |
| have nsZM: 'Z(F) <| M by rewrite !gFnormal_trans. | |
| rewrite -(mmax_normal maxM nsZM); last first. | |
| rewrite /= -(setIidPr (center_sub _)) meet_center_nil ?Fitting_nil //. | |
| by rewrite -proper1G (proper_sub_trans _ sAF) ?proper1G. | |
| by rewrite (subset_trans _ (cent_sub _)) ?centS. | |
| have nsZL_M: 'Z('L(P)) <| M. | |
| by rewrite (Puig_center_normal (mFT_odd _) solM sylP). | |
| have sNPM: 'N(P) \subset M. | |
| rewrite -(mmax_normal maxM nsZL_M) ?gFnorm_trans //. | |
| apply/eqP => /(trivg_center_Puig_pgroup (pHall_pgroup sylP))-P1. | |
| by rewrite -subG1 -P1 sAP in ntA. | |
| have sylPG: p.-Sylow(G) P := mmax_sigma_Sylow maxM sylP sNPM. | |
| split; rewrite // (uniq_mmax_subset1 maxM sAM). | |
| have{} scn3_A: A \in 'SCN_3[p] by apply/bigcupP; exists P; rewrite // inE. | |
| pose K := 'O_p^'('C(A)); have sKF: K \subset F. | |
| have sKM: K \subset M := gFsub_trans _ sCAM. | |
| apply: subset_trans (cent_sub_Fitting solM). | |
| rewrite subsetI sKM coprime_nil_faithful_cent_stab ?Fitting_nil //. | |
| - by rewrite gFsub_trans ?(subset_trans sCAM) ?gFnorm. | |
| - by rewrite /= -/F defF coprime_pcoreC. | |
| have sACK: A \subset 'C_F(K) by rewrite subsetI sAF centsC pcore_sub. | |
| by rewrite /= -/F -/K (subset_trans _ sACK) //= -defCA setISS ?centS. | |
| have{sKF} K1: K = 1 by rewrite -(setIidPr sKF) defF TI_pcoreC. | |
| have p'nbyA_1 q: q != p -> |/|*(A; q) = [set 1%G]. | |
| move=> p'q. | |
| have: [transitive K, on |/|*(A; q) | 'JG] by apply: Thompson_transitivity. | |
| case/imsetP=> Q maxQ; rewrite K1 /orbit imset_set1 act1 => defAmax. | |
| have nQNA: 'N(A) \subset 'N(Q). | |
| apply/normsP=> x Nx; apply: congr_group; apply/set1P; rewrite -defAmax. | |
| by rewrite (acts_act (norm_acts_max_norm _ _)). | |
| have{nQNA} nQF: F \subset 'N(Q). | |
| exact: subset_trans (subset_trans (normal_norm nsAP) nQNA). | |
| have defFmax: |/|*(F; q) = [set Q] := max_normed_uniq defAmax sAF nQF. | |
| have nQM: M \subset 'N(Q). | |
| apply/normsP=> x Mx; apply: congr_group; apply/set1P; rewrite -defFmax. | |
| rewrite (acts_act (norm_acts_max_norm _ _)) ?defFmax ?set11 //. | |
| by rewrite (subsetP (gFnorm _ _)). | |
| have [<- // | ntQ] := eqVneq Q 1%G. | |
| rewrite inE in maxQ; have [qQ _] := andP (maxgroupp maxQ). | |
| have{nQM} defNQ: 'N(Q) = M. | |
| by rewrite (mmax_norm maxM) // (mFT_pgroup_proper qQ). | |
| case/negP: ntQ; rewrite -[_ == _]subG1 -Mp'1 -defNQ pcore_max ?normalG //. | |
| exact: pi_pnat qQ _. | |
| have{} p'nbyA_1 X: | |
| X \proper G -> p^'.-group X -> A \subset 'N(X) -> X :=: 1. | |
| - move=> prX p'X nXA; have solX := mFT_sol prX. | |
| apply/eqP; rewrite -trivg_Fitting // -subG1 /= FittingEgen gen_subG. | |
| apply/bigcupsP=> [[q /= _] _]; have [-> | p'q] := eqVneq q p. | |
| rewrite -(setIidPl (pcore_sub _ _)) coprime_TIg //. | |
| by rewrite (pnat_coprime (pcore_pgroup _ _)). | |
| have [R] := max_normed_exists (pcore_pgroup q X) (gFnorm_trans _ nXA). | |
| by rewrite p'nbyA_1 // => /set1P->. | |
| apply/subsetPn=> -[H0 MA_H0 neH0M]. | |
| pose H := [arg max_(H > H0 | (H \in 'M(A)) && (H != M)) #|H :&: M|`_p]. | |
| case: arg_maxnP @H => [|H {H0 MA_H0 neH0M}]; first by rewrite MA_H0 -in_set1. | |
| rewrite /= inE -andbA => /and3P[maxH sAH neHM] maxHM. | |
| have prH: H \proper G by rewrite inE in maxH; apply: maxgroupp maxH. | |
| have sAHM: A \subset H :&: M by rewrite subsetI sAH. | |
| have [R sylR_HM sAR]:= Sylow_superset sAHM (pgroupS sAP pP). | |
| have [/subsetIP[sRH sRM] pR _] := and3P sylR_HM. | |
| have{sylR_HM} sylR_H: p.-Sylow(H) R. | |
| have [Q sylQ] := Sylow_superset sRM pR; have [sQM pQ _] := and3P sylQ. | |
| case/eqVproper=> [defR | /(nilpotent_proper_norm (pgroup_nil pQ)) sRN]. | |
| apply: (pHall_subl sRH (subsetT _)); rewrite pHallE subsetT /=. | |
| by rewrite -(card_Hall sylPG) (card_Hall sylP) defR (card_Hall sylQ). | |
| case/maximal_exists: (subsetT 'N(R)) => [nRG | [D maxD sND]]. | |
| case/negP: (proper_irrefl (mem G)); rewrite -{1}nRG. | |
| rewrite mFT_norm_proper ?(mFT_pgroup_proper pR) //. | |
| by rewrite -proper1G (proper_sub_trans _ sAR) ?proper1G. | |
| move/implyP: (maxHM D); rewrite 2!inE {}maxD leqNgt. | |
| case: eqP sND => [->{D} sNM _ | _ sND]. | |
| rewrite -Sylow_subnorm (pHall_subl _ _ sylR_HM) ?setIS //. | |
| by rewrite subsetI sRH normG. | |
| rewrite (subset_trans (subset_trans sAR (normG R)) sND); case/negP. | |
| rewrite -(card_Hall sylR_HM) (leq_trans (proper_card sRN)) //. | |
| rewrite -(part_pnat_id (pgroupS (subsetIl _ _) pQ)) dvdn_leq //. | |
| by rewrite partn_dvd ?cardG_gt0 // cardSg //= setIC setISS. | |
| have Hp'1: 'O_p^'(H) = 1. | |
| apply: p'nbyA_1 (pcore_pgroup _ _) (subset_trans sAH (gFnorm _ _)). | |
| exact: sub_proper_trans (pcore_sub _ _) prH. | |
| have nsZLR_H: 'Z('L(R)) <| H. | |
| exact: Puig_center_normal (mFT_odd _) (mFT_sol prH) sylR_H _. | |
| have ntZLR: 'Z('L(R)) != 1. | |
| apply/eqP=> /(trivg_center_Puig_pgroup pR) R1. | |
| by rewrite -subG1 -R1 sAR in ntA. | |
| have defH: 'N('Z('L(R))) = H := mmax_normal maxH nsZLR_H ntZLR. | |
| have{sylR_H} sylR: p.-Sylow(G) R. | |
| rewrite -Sylow_subnorm setTI (pHall_subl _ _ sylR_H) ?normG //=. | |
| by rewrite -defH !gFnorm_trans. | |
| have nsZLR_M: 'Z('L(R)) <| M. | |
| have sylR_M := pHall_subl sRM (subsetT _) sylR. | |
| exact: Puig_center_normal (mFT_odd _) solM sylR_M _. | |
| case/eqP: neHM; apply: group_inj. | |
| by rewrite -defH (mmax_normal maxM nsZLR_M). | |
| Qed. | |
| (* This summarizes the two branches of B & G, Theorem 8.1. *) | |
| Theorem Fitting_Uniqueness M : M \in 'M -> 'r('F(M)) >= 3 -> 'F(M)%G \in 'U. | |
| Proof. | |
| move=> maxM; have [p _ -> dimF3] := rank_witness 'F(M). | |
| have prF: 'F(M) \proper G := sub_mmax_proper maxM (Fitting_sub M). | |
| have [pF | npF] := boolP (p.-group 'F(M)). | |
| have [P sylP] := Sylow_exists p M; have [sPM pP _] := and3P sylP. | |
| have dimP3: 'r_p(P) >= 3. | |
| rewrite (p_rank_Sylow sylP) (leq_trans dimF3) //. | |
| by rewrite p_rankS ?Fitting_sub. | |
| have [A] := rank3_SCN3 pP (mFT_odd _) dimP3. | |
| by case/(SCN_Fitting_Uniqueness maxM pF)=> // _ sAF; apply: uniq_mmaxS. | |
| case/p_rank_geP: dimF3 => A /setIdP[EpA dimA3]. | |
| have [A0 maxA0 sAA0] := @maxgroup_exists _ [pred X in 'E_p('F(M))] _ EpA. | |
| have [_ abelA] := pElemP EpA; have pmaxA0: A0 \in 'E*_p('F(M)) by rewrite inE. | |
| case/pElemP: (maxgroupp maxA0) => sA0F; case/and3P=> _ cA0A0 _. | |
| have dimA0_3: 'r_p(A0) >= 3. | |
| by rewrite -(eqP dimA3) -(p_rank_abelem abelA) p_rankS. | |
| have:= non_pcore_Fitting_Uniqueness maxM npF pmaxA0 dimA0_3. | |
| exact: uniq_mmaxS (subsetIl _ _) prF. | |
| Qed. | |
| End Eight. | |