Sylow theorems #

The Sylow theorems are the following results for every finite group G and every prime number p.

There exists a Sylow p-subgroup of G.
All Sylow p-subgroups of G are conjugate to each other.
Let nₚ be the number of Sylow p-subgroups of G, then nₚ divides the index of the Sylow p-subgroup, nₚ ≡ 1 [MOD p], and nₚ is equal to the index of the normalizer of the Sylow p-subgroup in G.

Main definitions #

Sylow p G : The type of Sylow p-subgroups of G.

Main statements #

Sylow.exists_subgroup_card_pow_prime: A generalization of Sylow's first theorem: For every prime power pⁿ dividing the cardinality of G, there exists a subgroup of G of order pⁿ.
IsPGroup.exists_le_sylow: A generalization of Sylow's first theorem: Every p-subgroup is contained in a Sylow p-subgroup.
Sylow.card_eq_multiplicity: The cardinality of a Sylow subgroup is p ^ n where n is the multiplicity of p in the group order.
Sylow.isPretransitive_of_finite: a generalization of Sylow's second theorem: If the number of Sylow p-subgroups is finite, then all Sylow p-subgroups are conjugate.
card_sylow_modEq_one: a generalization of Sylow's third theorem: If the number of Sylow p-subgroups is finite, then it is congruent to 1 modulo p.

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structure Sylow (p : ℕ) (G : Type u_1) [Group G] extends Subgroup G :

Type u_1

A Sylow p-subgroup is a maximal p-subgroup.

carrier : Set G
mul_mem' {a b : G} : a ∈ (↑self).carrier → b ∈ (↑self).carrier → a * b ∈ (↑self).carrier
one_mem' : 1 ∈ (↑self).carrier
inv_mem' {x : G} : x ∈ (↑self).carrier → x⁻¹ ∈ (↑self).carrier
isPGroup' : IsPGroup p ↥↑self
is_maximal' {Q : Subgroup G} : IsPGroup p ↥Q → ↑self ≤ Q → Q = ↑self

Instances For

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instance Sylow.instCoeOutSubgroup {p : ℕ} {G : Type u_1} [Group G] :

CoeOut (Sylow p G) (Subgroup G)

Equations

Sylow.instCoeOutSubgroup = { coe := Sylow.toSubgroup }

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theorem Sylow.ext {p : ℕ} {G : Type u_1} [Group G] {P Q : Sylow p G} (h : ↑P = ↑Q) :

P = Q

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theorem Sylow.ext_iff {p : ℕ} {G : Type u_1} [Group G] {P Q : Sylow p G} :

P = Q ↔ ↑P = ↑Q

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instance Sylow.instSetLike {p : ℕ} {G : Type u_1} [Group G] :

SetLike (Sylow p G) G

Equations

Sylow.instSetLike = { coe := fun (x : Sylow p G) => ↑↑x, coe_injective' := ⋯ }

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instance Sylow.instSubgroupClass {p : ℕ} {G : Type u_1} [Group G] :

SubgroupClass (Sylow p G) G

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def IsPGroup.toSylow {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] {P : Subgroup G} (hP1 : IsPGroup p ↥P) (hP2 : ¬p ∣ P.index) :

Sylow p G

A p-subgroup with index indivisible by p is a Sylow subgroup.

Equations

hP1.toSylow hP2 = { toSubgroup := P, isPGroup' := hP1, is_maximal' := ⋯ }

Instances For

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@[simp]

theorem IsPGroup.toSylow_coe {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] {P : Subgroup G} (hP1 : IsPGroup p ↥P) (hP2 : ¬p ∣ P.index) :

↑(hP1.toSylow hP2) = P

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@[simp]

theorem IsPGroup.mem_toSylow {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] {P : Subgroup G} (hP1 : IsPGroup p ↥P) (hP2 : ¬p ∣ P.index) {g : G} :

g ∈ hP1.toSylow hP2 ↔ g ∈ P

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def Sylow.ofCard {G : Type u_1} [Group G] [Finite G] {p : ℕ} [Fact (Nat.Prime p)] (H : Subgroup G) (card_eq : Nat.card ↥H = p ^ (Nat.card G).factorization p) :

Sylow p G

A subgroup with cardinality p ^ n is a Sylow subgroup where n is the multiplicity of p in the group order.

Equations

Sylow.ofCard H card_eq = ⋯.toSylow ⋯

Instances For

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@[simp]

theorem Sylow.coe_ofCard {G : Type u_1} [Group G] [Finite G] {p : ℕ} [Fact (Nat.Prime p)] (H : Subgroup G) (card_eq : Nat.card ↥H = p ^ (Nat.card G).factorization p) :

↑(ofCard H card_eq) = H

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def Sylow.comapOfKerIsPGroup {p : ℕ} {G : Type u_1} [Group G] (P : Sylow p G) {K : Type u_2} [Group K] (ϕ : K →* G) (hϕ : IsPGroup p ↥ϕ.ker) (h : ↑P ≤ ϕ.range) :

Sylow p K

The preimage of a Sylow subgroup under a p-group-kernel homomorphism is a Sylow subgroup.

Equations

P.comapOfKerIsPGroup ϕ hϕ h = { toSubgroup := Subgroup.comap ϕ ↑P, isPGroup' := ⋯, is_maximal' := ⋯ }

Instances For

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@[simp]

theorem Sylow.coe_comapOfKerIsPGroup {p : ℕ} {G : Type u_1} [Group G] (P : Sylow p G) {K : Type u_2} [Group K] (ϕ : K →* G) (hϕ : IsPGroup p ↥ϕ.ker) (h : ↑P ≤ ϕ.range) :

↑(P.comapOfKerIsPGroup ϕ hϕ h) = Subgroup.comap ϕ ↑P

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def Sylow.comapOfInjective {p : ℕ} {G : Type u_1} [Group G] (P : Sylow p G) {K : Type u_2} [Group K] (ϕ : K →* G) (hϕ : Function.Injective ⇑ϕ) (h : ↑P ≤ ϕ.range) :

Sylow p K

The preimage of a Sylow subgroup under an injective homomorphism is a Sylow subgroup.

Equations

P.comapOfInjective ϕ hϕ h = P.comapOfKerIsPGroup ϕ ⋯ h

Instances For

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@[simp]

theorem Sylow.coe_comapOfInjective {p : ℕ} {G : Type u_1} [Group G] (P : Sylow p G) {K : Type u_2} [Group K] (ϕ : K →* G) (hϕ : Function.Injective ⇑ϕ) (h : ↑P ≤ ϕ.range) :

↑(P.comapOfInjective ϕ hϕ h) = Subgroup.comap ϕ ↑P

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def Sylow.subtype {p : ℕ} {G : Type u_1} [Group G] (P : Sylow p G) {N : Subgroup G} (h : ↑P ≤ N) :

Sylow p ↥N

A sylow subgroup of G is also a sylow subgroup of a subgroup of G.

Equations

P.subtype h = P.comapOfInjective N.subtype ⋯ ⋯

Instances For

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@[simp]

theorem Sylow.coe_subtype {p : ℕ} {G : Type u_1} [Group G] (P : Sylow p G) {N : Subgroup G} (h : ↑P ≤ N) :

↑(P.subtype h) = (↑P).subgroupOf N

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theorem Sylow.subtype_injective {p : ℕ} {G : Type u_1} [Group G] {N : Subgroup G} {P Q : Sylow p G} {hP : ↑P ≤ N} {hQ : ↑Q ≤ N} (h : P.subtype hP = Q.subtype hQ) :

P = Q

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theorem IsPGroup.exists_le_sylow {p : ℕ} {G : Type u_1} [Group G] {P : Subgroup G} (hP : IsPGroup p ↥P) :

∃ (Q : Sylow p G), P ≤ ↑Q

A generalization of Sylow's first theorem. Every p-subgroup is contained in a Sylow p-subgroup.

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instance Sylow.nonempty {p : ℕ} {G : Type u_1} [Group G] :

Nonempty (Sylow p G)

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noncomputable instance Sylow.inhabited {p : ℕ} {G : Type u_1} [Group G] :

Inhabited (Sylow p G)

Equations

Sylow.inhabited = Classical.inhabited_of_nonempty ⋯

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theorem Sylow.exists_comap_eq_of_ker_isPGroup {p : ℕ} {G : Type u_1} [Group G] {H : Type u_2} [Group H] (P : Sylow p H) {f : H →* G} (hf : IsPGroup p ↥f.ker) :

∃ (Q : Sylow p G), Subgroup.comap f ↑Q = ↑P

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theorem Sylow.exists_comap_eq_of_injective {p : ℕ} {G : Type u_1} [Group G] {H : Type u_2} [Group H] (P : Sylow p H) {f : H →* G} (hf : Function.Injective ⇑f) :

∃ (Q : Sylow p G), Subgroup.comap f ↑Q = ↑P

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theorem Sylow.exists_comap_subtype_eq {p : ℕ} {G : Type u_1} [Group G] {H : Subgroup G} (P : Sylow p ↥H) :

∃ (Q : Sylow p G), Subgroup.comap H.subtype ↑Q = ↑P

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theorem Sylow.finite_of_ker_is_pGroup {p : ℕ} {G : Type u_1} [Group G] {H : Type u_2} [Group H] {f : H →* G} (hf : IsPGroup p ↥f.ker) [Finite (Sylow p G)] :

Finite (Sylow p H)

If the kernel of f : H →* G is a p-group, then Finite (Sylow p G) implies Finite (Sylow p H).

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theorem Sylow.finite_of_injective {p : ℕ} {G : Type u_1} [Group G] {H : Type u_2} [Group H] {f : H →* G} (hf : Function.Injective ⇑f) [Finite (Sylow p G)] :

Finite (Sylow p H)

If f : H →* G is injective, then Finite (Sylow p G) implies Finite (Sylow p H).

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instance Sylow.instFiniteSubtypeMemSubgroup {p : ℕ} {G : Type u_1} [Group G] (H : Subgroup G) [Finite (Sylow p G)] :

Finite (Sylow p ↥H)

If H is a subgroup of G, then Finite (Sylow p G) implies Finite (Sylow p H).

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instance Sylow.pointwiseMulAction {p : ℕ} {G : Type u_1} [Group G] {α : Type u_2} [Group α] [MulDistribMulAction α G] :

MulAction α (Sylow p G)

Subgroup.pointwiseMulAction preserves Sylow subgroups.

Equations

Sylow.pointwiseMulAction = { smul := fun (g : α) (P : Sylow p G) => { toSubgroup := g • ↑P, isPGroup' := ⋯, is_maximal' := ⋯ }, one_smul := ⋯, mul_smul := ⋯ }

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theorem Sylow.pointwise_smul_def {p : ℕ} {G : Type u_1} [Group G] {α : Type u_2} [Group α] [MulDistribMulAction α G] {g : α} {P : Sylow p G} :

↑(g • P) = g • ↑P

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instance Sylow.mulAction {p : ℕ} {G : Type u_1} [Group G] :

MulAction G (Sylow p G)

Equations

Sylow.mulAction = MulAction.compHom (Sylow p G) MulAut.conj

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theorem Sylow.smul_def {p : ℕ} {G : Type u_1} [Group G] {g : G} {P : Sylow p G} :

g • P = MulAut.conj g • P

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theorem Sylow.coe_subgroup_smul {p : ℕ} {G : Type u_1} [Group G] {g : G} {P : Sylow p G} :

↑(g • P) = MulAut.conj g • ↑P

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theorem Sylow.coe_smul {p : ℕ} {G : Type u_1} [Group G] {g : G} {P : Sylow p G} :

↑(g • P) = MulAut.conj g • ↑P

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theorem Sylow.smul_le {p : ℕ} {G : Type u_1} [Group G] {P : Sylow p G} {H : Subgroup G} (hP : ↑P ≤ H) (h : ↥H) :

↑(h • P) ≤ H

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theorem Sylow.smul_subtype {p : ℕ} {G : Type u_1} [Group G] {P : Sylow p G} {H : Subgroup G} (hP : ↑P ≤ H) (h : ↥H) :

h • P.subtype hP = (h • P).subtype ⋯

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theorem Sylow.smul_eq_iff_mem_normalizer {p : ℕ} {G : Type u_1} [Group G] {g : G} {P : Sylow p G} :

g • P = P ↔ g ∈ (↑P).normalizer

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theorem Sylow.smul_eq_of_normal {p : ℕ} {G : Type u_1} [Group G] {g : G} {P : Sylow p G} [h : (↑P).Normal] :

g • P = P

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theorem Subgroup.sylow_mem_fixedPoints_iff {p : ℕ} {G : Type u_1} [Group G] (H : Subgroup G) {P : Sylow p G} :

P ∈ MulAction.fixedPoints (↥H) (Sylow p G) ↔ H ≤ (↑P).normalizer

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theorem IsPGroup.inf_normalizer_sylow {p : ℕ} {G : Type u_1} [Group G] {P : Subgroup G} (hP : IsPGroup p ↥P) (Q : Sylow p G) :

P ⊓ (↑Q).normalizer = P ⊓ ↑Q

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theorem IsPGroup.sylow_mem_fixedPoints_iff {p : ℕ} {G : Type u_1} [Group G] {P : Subgroup G} (hP : IsPGroup p ↥P) {Q : Sylow p G} :

Q ∈ MulAction.fixedPoints (↥P) (Sylow p G) ↔ P ≤ ↑Q

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instance Sylow.isPretransitive_of_finite {p : ℕ} {G : Type u_1} [Group G] [hp : Fact (Nat.Prime p)] [Finite (Sylow p G)] :

MulAction.IsPretransitive G (Sylow p G)

A generalization of Sylow's second theorem. If the number of Sylow p-subgroups is finite, then all Sylow p-subgroups are conjugate.

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theorem card_sylow_modEq_one (p : ℕ) (G : Type u_1) [Group G] [Fact (Nat.Prime p)] [Finite (Sylow p G)] :

Nat.card (Sylow p G) ≡ 1 [MOD p]

A generalization of Sylow's third theorem. If the number of Sylow p-subgroups is finite, then it is congruent to 1 modulo p.

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theorem not_dvd_card_sylow (p : ℕ) (G : Type u_1) [Group G] [hp : Fact (Nat.Prime p)] [Finite (Sylow p G)] :

¬p ∣ Nat.card (Sylow p G)

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def Sylow.equivSMul {p : ℕ} {G : Type u_1} [Group G] (P : Sylow p G) (g : G) :

↥↑P ≃* ↥↑(g • P)

Sylow subgroups are isomorphic

Equations

P.equivSMul g = Subgroup.equivSMul (MulAut.conj g) ↑P

Instances For

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noncomputable def Sylow.equiv {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P Q : Sylow p G) :

↥↑P ≃* ↥↑Q

Sylow subgroups are isomorphic

Equations

P.equiv Q = ⋯.mpr (P.equivSMul (Classical.choose ⋯))

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@[simp]

theorem Sylow.orbit_eq_top {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) :

MulAction.orbit G P = ⊤

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theorem Sylow.stabilizer_eq_normalizer {p : ℕ} {G : Type u_1} [Group G] (P : Sylow p G) :

MulAction.stabilizer G P = (↑P).normalizer

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theorem Sylow.conj_eq_normalizer_conj_of_mem_centralizer {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) (x g : G) (hx : x ∈ Subgroup.centralizer ↑P) (hy : g⁻¹ * x * g ∈ Subgroup.centralizer ↑P) :

∃ n ∈ (↑P).normalizer, g⁻¹ * x * g = n⁻¹ * x * n

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theorem Sylow.conj_eq_normalizer_conj_of_mem {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) [_hP : IsMulCommutative ↥↑P] (x g : G) (hx : x ∈ P) (hy : g⁻¹ * x * g ∈ P) :

∃ n ∈ (↑P).normalizer, g⁻¹ * x * g = n⁻¹ * x * n

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noncomputable def Sylow.equivQuotientNormalizer {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) :

Sylow p G ≃ G ⧸ (↑P).normalizer

Sylow p-subgroups are in bijection with cosets of the normalizer of a Sylow p-subgroup

Equations

One or more equations did not get rendered due to their size.

Instances For

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instance Sylow.instFiniteQuotientSubgroupNormalizerOfFactPrime {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) :

Finite (G ⧸ (↑P).normalizer)

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theorem Sylow.card_eq_card_quotient_normalizer {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) :

Nat.card (Sylow p G) = Nat.card (G ⧸ (↑P).normalizer)

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theorem Sylow.card_eq_index_normalizer {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) :

Nat.card (Sylow p G) = (↑P).normalizer.index

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theorem Sylow.card_dvd_index {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) :

Nat.card (Sylow p G) ∣ (↑P).index

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theorem Sylow.not_dvd_index' {p : ℕ} {G : Type u_1} [Group G] [hp : Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) (hP : (↑P).relIndex (↑P).normalizer ≠ 0) :

¬p ∣ (↑P).index

A Sylow p-subgroup has index indivisible by p, assuming [N(P) : P] < ∞.

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theorem Sylow.not_dvd_index {p : ℕ} {G : Type u_1} [Group G] [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) [(↑P).FiniteIndex] :

¬p ∣ (↑P).index

A Sylow p-subgroup has index indivisible by p.

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def Sylow.mapSurjective {p : ℕ} {G : Type u_1} [Group G] [Finite G] {G' : Type u_2} [Group G'] {f : G →* G'} (hf : Function.Surjective ⇑f) [Fact (Nat.Prime p)] (P : Sylow p G) :

Sylow p G'

Surjective group homomorphisms map Sylow subgroups to Sylow subgroups.

Equations

Sylow.mapSurjective hf P = { toSubgroup := Subgroup.map f ↑P, isPGroup' := ⋯, is_maximal' := ⋯ }

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@[simp]

theorem Sylow.coe_mapSurjective {p : ℕ} {G : Type u_1} [Group G] [Finite G] {G' : Type u_2} [Group G'] {f : G →* G'} (hf : Function.Surjective ⇑f) [Fact (Nat.Prime p)] (P : Sylow p G) :

↑(mapSurjective hf P) = Subgroup.map f ↑P

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theorem Sylow.mapSurjective_surjective {G : Type u_1} [Group G] [Finite G] {G' : Type u_2} [Group G'] {f : G →* G'} (hf : Function.Surjective ⇑f) (p : ℕ) [Fact (Nat.Prime p)] :

Function.Surjective (mapSurjective hf)

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theorem Sylow.normalizer_sup_eq_top {G : Type u_1} [Group G] {p : ℕ} [Fact (Nat.Prime p)] {N : Subgroup G} [N.Normal] [Finite (Sylow p ↥N)] (P : Sylow p ↥N) :

(Subgroup.map N.subtype ↑P).normalizer ⊔ N = ⊤

Frattini's Argument: If N is a normal subgroup of G, and if P is a Sylow p-subgroup of N, then N_G(P) ⊔ N = G.

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theorem Sylow.normalizer_sup_eq_top' {G : Type u_1} [Group G] {p : ℕ} [Fact (Nat.Prime p)] {N : Subgroup G} [N.Normal] [Finite (Sylow p ↥N)] (P : Sylow p G) (hP : ↑P ≤ N) :

(↑P).normalizer ⊔ N = ⊤

Frattini's Argument: If N is a normal subgroup of G, and if P is a Sylow p-subgroup of N, then N_G(P) ⊔ N = G.

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theorem QuotientGroup.card_preimage_mk {G : Type u} [Group G] (s : Subgroup G) (t : Set (G ⧸ s)) :

Nat.card ↑(mk ⁻¹' t) = Nat.card ↥s * Nat.card ↑t

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theorem Sylow.mem_fixedPoints_mul_left_cosets_iff_mem_normalizer {G : Type u} [Group G] {H : Subgroup G} [Finite ↑↑H] {x : G} :

↑x ∈ MulAction.fixedPoints (↥H) (G ⧸ H) ↔ x ∈ H.normalizer

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def Sylow.fixedPointsMulLeftCosetsEquivQuotient {G : Type u} [Group G] (H : Subgroup G) [Finite ↑↑H] :

↑(MulAction.fixedPoints (↥H) (G ⧸ H)) ≃ ↥H.normalizer ⧸ Subgroup.comap H.normalizer.subtype H

The fixed points of the action of H on its cosets correspond to normalizer H / H.

Equations

Sylow.fixedPointsMulLeftCosetsEquivQuotient H = Equiv.subtypeQuotientEquivQuotientSubtype (↑H.normalizer) (MulAction.fixedPoints (↥H) (G ⧸ H)) ⋯ ⋯

Instances For

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theorem Sylow.card_quotient_normalizer_modEq_card_quotient {G : Type u} [Group G] [Finite G] {p n : ℕ} [hp : Fact (Nat.Prime p)] {H : Subgroup G} (hH : Nat.card ↥H = p ^ n) :

Nat.card (↥H.normalizer ⧸ Subgroup.comap H.normalizer.subtype H) ≡ Nat.card (G ⧸ H) [MOD p]

If H is a p-subgroup of G, then the index of H inside its normalizer is congruent mod p to the index of H.

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theorem Sylow.card_normalizer_modEq_card {G : Type u} [Group G] [Finite G] {p n : ℕ} [hp : Fact (Nat.Prime p)] {H : Subgroup G} (hH : Nat.card ↥H = p ^ n) :

Nat.card ↥H.normalizer ≡ Nat.card G [MOD p ^ (n + 1)]

If H is a subgroup of G of cardinality p ^ n, then the cardinality of the normalizer of H is congruent mod p ^ (n + 1) to the cardinality of G.

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theorem Sylow.prime_dvd_card_quotient_normalizer {G : Type u} [Group G] [Finite G] {p n : ℕ} [Fact (Nat.Prime p)] (hdvd : p ^ (n + 1) ∣ Nat.card G) {H : Subgroup G} (hH : Nat.card ↥H = p ^ n) :

p ∣ Nat.card (↥H.normalizer ⧸ Subgroup.comap H.normalizer.subtype H)

If H is a p-subgroup but not a Sylow p-subgroup, then p divides the index of H inside its normalizer.

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theorem Sylow.prime_pow_dvd_card_normalizer {G : Type u} [Group G] [Finite G] {p n : ℕ} [_hp : Fact (Nat.Prime p)] (hdvd : p ^ (n + 1) ∣ Nat.card G) {H : Subgroup G} (hH : Nat.card ↥H = p ^ n) :

p ^ (n + 1) ∣ Nat.card ↥H.normalizer

If H is a p-subgroup but not a Sylow p-subgroup of cardinality p ^ n, then p ^ (n + 1) divides the cardinality of the normalizer of H.

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theorem Sylow.exists_subgroup_card_pow_succ {G : Type u} [Group G] [Finite G] {p n : ℕ} [hp : Fact (Nat.Prime p)] (hdvd : p ^ (n + 1) ∣ Nat.card G) {H : Subgroup G} (hH : Nat.card ↥H = p ^ n) :

∃ (K : Subgroup G), Nat.card ↥K = p ^ (n + 1) ∧ H ≤ K

If H is a subgroup of G of cardinality p ^ n, then H is contained in a subgroup of cardinality p ^ (n + 1) if p ^ (n + 1) divides the cardinality of G

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@[irreducible]

theorem Sylow.exists_subgroup_card_pow_prime_le {G : Type u} [Group G] [Finite G] (p : ℕ) {n m : ℕ} [_hp : Fact (Nat.Prime p)] (_hdvd : p ^ m ∣ Nat.card G) (H : Subgroup G) (_hH : Nat.card ↥H = p ^ n) (_hnm : n ≤ m) :

∃ (K : Subgroup G), Nat.card ↥K = p ^ m ∧ H ≤ K

If H is a subgroup of G of cardinality p ^ n, then H is contained in a subgroup of cardinality p ^ m if n ≤ m and p ^ m divides the cardinality of G

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theorem Sylow.exists_subgroup_card_pow_prime {G : Type u} [Group G] [Finite G] (p : ℕ) {n : ℕ} [Fact (Nat.Prime p)] (hdvd : p ^ n ∣ Nat.card G) :

∃ (K : Subgroup G), Nat.card ↥K = p ^ n

A generalisation of Sylow's first theorem. If p ^ n divides the cardinality of G, then there is a subgroup of cardinality p ^ n

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theorem Sylow.exists_subgroup_card_pow_prime_of_le_card {G : Type u} [Group G] {n p : ℕ} (hp : Nat.Prime p) (h : IsPGroup p G) (hn : p ^ n ≤ Nat.card G) :

∃ (H : Subgroup G), Nat.card ↥H = p ^ n

A special case of Sylow's first theorem. If G is a p-group of size at least p ^ n then there is a subgroup of cardinality p ^ n.

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theorem Sylow.exists_subgroup_le_card_pow_prime_of_le_card {G : Type u} [Group G] {n p : ℕ} (hp : Nat.Prime p) (h : IsPGroup p G) {H : Subgroup G} (hn : p ^ n ≤ Nat.card ↥H) :

∃ H' ≤ H, Nat.card ↥H' = p ^ n

A special case of Sylow's first theorem. If G is a p-group and H a subgroup of size at least p ^ n then there is a subgroup of H of cardinality p ^ n.

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theorem Sylow.exists_subgroup_le_card_le {G : Type u} [Group G] {k p : ℕ} (hp : Nat.Prime p) (h : IsPGroup p G) {H : Subgroup G} (hk : k ≤ Nat.card ↥H) (hk₀ : k ≠ 0) :

∃ H' ≤ H, Nat.card ↥H' ≤ k ∧ k < p * Nat.card ↥H'

A special case of Sylow's first theorem. If G is a p-group and H a subgroup of size at least k then there is a subgroup of H of cardinality between k / p and k.

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theorem Sylow.pow_dvd_card_of_pow_dvd_card {G : Type u} [Group G] [Finite G] {p n : ℕ} [hp : Fact (Nat.Prime p)] (P : Sylow p G) (hdvd : p ^ n ∣ Nat.card G) :

p ^ n ∣ Nat.card ↥↑P

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theorem Sylow.dvd_card_of_dvd_card {G : Type u} [Group G] [Finite G] {p : ℕ} [Fact (Nat.Prime p)] (P : Sylow p G) (hdvd : p ∣ Nat.card G) :

p ∣ Nat.card ↥↑P

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theorem Sylow.card_coprime_index {G : Type u} [Group G] [Finite G] {p : ℕ} [hp : Fact (Nat.Prime p)] (P : Sylow p G) :

(Nat.card ↥↑P).Coprime (↑P).index

Sylow subgroups are Hall subgroups.

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theorem Sylow.ne_bot_of_dvd_card {G : Type u} [Group G] [Finite G] {p : ℕ} [hp : Fact (Nat.Prime p)] (P : Sylow p G) (hdvd : p ∣ Nat.card G) :

↑P ≠ ⊥

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theorem Sylow.card_eq_multiplicity {G : Type u} [Group G] [Finite G] {p : ℕ} [hp : Fact (Nat.Prime p)] (P : Sylow p G) :

Nat.card ↥↑P = p ^ (Nat.card G).factorization p

The cardinality of a Sylow subgroup is p ^ n where n is the multiplicity of p in the group order.

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noncomputable def Sylow.unique_of_normal {G : Type u} [Group G] {p : ℕ} [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) (h : (↑P).Normal) :

Unique (Sylow p G)

If G has a normal Sylow p-subgroup, then it is the only Sylow p-subgroup.

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P.unique_of_normal h = { toInhabited := Sylow.inhabited, uniq := ⋯ }

Instances For

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instance Sylow.characteristic_of_subsingleton {G : Type u} [Group G] {p : ℕ} [Subsingleton (Sylow p G)] (P : Sylow p G) :

(↑P).Characteristic

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theorem Sylow.normal_of_subsingleton {G : Type u} [Group G] {p : ℕ} [Subsingleton (Sylow p G)] (P : Sylow p G) :

(↑P).Normal

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theorem Sylow.characteristic_of_normal {G : Type u} [Group G] {p : ℕ} [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) (h : (↑P).Normal) :

(↑P).Characteristic

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theorem Sylow.normal_of_normalizer_normal {G : Type u} [Group G] {p : ℕ} [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) (hn : (↑P).normalizer.Normal) :

(↑P).Normal

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@[simp]

theorem Sylow.normalizer_normalizer {G : Type u} [Group G] {p : ℕ} [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) :

(↑P).normalizer.normalizer = (↑P).normalizer

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theorem Sylow.normal_of_all_max_subgroups_normal {G : Type u} [Group G] [Finite G] (hnc : ∀ (H : Subgroup G), IsCoatom H → H.Normal) {p : ℕ} [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) :

(↑P).Normal

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theorem Sylow.normal_of_normalizerCondition {G : Type u} [Group G] (hnc : NormalizerCondition G) {p : ℕ} [Fact (Nat.Prime p)] [Finite (Sylow p G)] (P : Sylow p G) :

(↑P).Normal

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noncomputable def Sylow.directProductOfNormal {G : Type u} [Group G] [Finite G] (hn : ∀ {p : ℕ} [Fact (Nat.Prime p)] (P : Sylow p G), (↑P).Normal) :

((p : { x : ℕ // x ∈ (Nat.card G).primeFactors }) → (P : Sylow (↑p) G) → ↥P) ≃* G

If all its Sylow subgroups are normal, then a finite group is isomorphic to the direct product of these Sylow subgroups.

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One or more equations did not get rendered due to their size.

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Documentation

Mathlib.GroupTheory.Sylow

Sylow theorems #

Main definitions #

Main statements #