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Mathlib.RepresentationTheory.Tannaka

Tannaka duality for finite groups #

In this file we prove Tannaka duality for finite groups.

The theorem can be formulated as follows: for any integral domain k, a finite group G can be recovered from FDRep k G, the monoidal category of finite dimensional k-linear representations of G, and the monoidal forgetful functor forget : FDRep k G ⥤ FGModuleCat k.

The main result is the isomorphism equiv : G ≃* Aut (forget k G).

Reference #

https://math.leidenuniv.nl/scripties/1bachCommelin.pdf

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instance TannakaDuality.FiniteGroup.instMonoidalFDRepFGModuleCatForget₂ {k G : Type u} [CommRing k] [Group G] :
(CategoryTheory.forget₂ (FDRep k G) (FGModuleCat k)).Monoidal
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def TannakaDuality.FiniteGroup.forget (k G : Type u) [CommRing k] [Group G] :
CategoryTheory.LaxMonoidalFunctor (FDRep k G) (FGModuleCat k)

The monoidal forgetful functor from FDRep k G to FGModuleCat k.

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    @[simp]
    theorem TannakaDuality.FiniteGroup.forget_obj {k G : Type u} [CommRing k] [Group G] (X : FDRep k G) :
    (forget k G).obj X = X.V
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    @[simp]
    theorem TannakaDuality.FiniteGroup.forget_map {k G : Type u} [CommRing k] [Group G] (X Y : FDRep k G) (f : X Y) :
    (forget k G).map f = f.hom
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    def TannakaDuality.FiniteGroup.equivApp {k G : Type u} [CommRing k] [Group G] (g : G) (X : FDRep k G) :
    X.V X.V

    Definition of equivHom g : Aut (forget k G) by its components.

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      @[simp]
      theorem TannakaDuality.FiniteGroup.equivApp_hom {k G : Type u} [CommRing k] [Group G] (g : G) (X : FDRep k G) :
      (equivApp g X).hom = ModuleCat.ofHom (X.ρ g)
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      @[simp]
      theorem TannakaDuality.FiniteGroup.equivApp_inv {k G : Type u} [CommRing k] [Group G] (g : G) (X : FDRep k G) :
      (equivApp g X).inv = ModuleCat.ofHom (X.ρ g⁻¹)
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      def TannakaDuality.FiniteGroup.equivHom (k G : Type u) [CommRing k] [Group G] :
      G →* CategoryTheory.Aut (forget k G)

      The group homomorphism G →* Aut (forget k G) shown to be an isomorphism.

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      • One or more equations did not get rendered due to their size.
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        @[simp]
        theorem TannakaDuality.FiniteGroup.equivHom_apply (k G : Type u) [CommRing k] [Group G] (g : G) :
        (equivHom k G) g = CategoryTheory.LaxMonoidalFunctor.isoOfComponents (equivApp g)
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        def TannakaDuality.FiniteGroup.rightRegular {k G : Type u} [CommRing k] [Group G] :
        Representation k G (Gk)

        The representation on G → k induced by multiplication on the right in G.

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          @[simp]
          theorem TannakaDuality.FiniteGroup.rightRegular_apply {k G : Type u} [CommRing k] [Group G] (s t : G) (f : Gk) :
          (rightRegular s) f t = f (t * s)
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          def TannakaDuality.FiniteGroup.leftRegular {k G : Type u} [CommRing k] [Group G] :
          Representation k G (Gk)

          The representation on G → k induced by multiplication on the left in G.

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            @[simp]
            theorem TannakaDuality.FiniteGroup.leftRegular_apply {k G : Type u} [CommRing k] [Group G] (s t : G) (f : Gk) :
            (leftRegular s) f t = f (s⁻¹ * t)
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            def TannakaDuality.FiniteGroup.rightFDRep {k G : Type u} [CommRing k] [Group G] [Finite G] :
            FDRep k G

            The right regular representation rightRegular on G → k as a FDRep k G.

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              theorem TannakaDuality.FiniteGroup.equivHom_injective {k G : Type u} [CommRing k] [Group G] [Finite G] [Nontrivial k] :
              Function.Injective (equivHom k G)
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              @[deprecated TannakaDuality.FiniteGroup.equivHom_injective (since := "2025-04-27")]
              theorem TannakaDuality.FiniteGroup.equivHom_inj {k G : Type u} [CommRing k] [Group G] [Finite G] [Nontrivial k] :
              Function.Injective (equivHom k G)

              Alias of TannakaDuality.FiniteGroup.equivHom_injective.

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              def TannakaDuality.FiniteGroup.mulRepHom {k G : Type u} [CommRing k] [Group G] [Finite G] :
              CategoryTheory.MonoidalCategoryStruct.tensorObj rightFDRep rightFDRep rightFDRep

              The FDRep k G morphism induced by multiplication on G → k.

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                theorem TannakaDuality.FiniteGroup.map_mul_toRightFDRepComp {k G : Type u} [CommRing k] [Group G] [Finite G] (η : CategoryTheory.Aut (forget k G)) (f g : Gk) :
                have α := ModuleCat.Hom.hom (η.hom.hom.app rightFDRep); α (f * g) = α f * α g

                The rightFDRep component of η : Aut (forget k G) preserves multiplication

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                def TannakaDuality.FiniteGroup.algHomOfRightFDRepComp {k G : Type u} [CommRing k] [Group G] [Finite G] (η : CategoryTheory.Aut (forget k G)) :
                (Gk) →ₐ[k] Gk

                The rightFDRep component of η : Aut (forget k G) gives rise to an algebra morphism (G → k) →ₐ[k] (G → k).

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                  def TannakaDuality.FiniteGroup.sumSMulInv {k G : Type u} [CommRing k] [Group G] [Fintype G] {X : FDRep k G} (v : X.V) :
                  (Gk) →ₗ[k] X.V

                  For v : X and G a finite group, the G-equivariant linear map from the right regular representation rightFDRep to X sending single 1 1 to v.

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                    @[simp]
                    theorem TannakaDuality.FiniteGroup.sumSMulInv_apply {k G : Type u} [CommRing k] [Group G] [Fintype G] {X : FDRep k G} (v : X.V) (f : Gk) :
                    (sumSMulInv v) f = s : G, f s (X.ρ s⁻¹) v
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                    @[simp]
                    theorem TannakaDuality.FiniteGroup.sumSMulInv_single_id {k G : Type u} [CommRing k] [Group G] [Fintype G] [DecidableEq G] {X : FDRep k G} (v : X.V) :
                    s : G, Pi.single 1 1 s (X.ρ s⁻¹) v = v
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                    def TannakaDuality.FiniteGroup.ofRightFDRep {k G : Type u} [CommRing k] [Group G] [Finite G] [Fintype G] (X : FDRep k G) (v : X.V) :
                    rightFDRep X

                    For v : X and G a finite group, the representation morphism from the right regular representation rightFDRep to X sending single 1 1 to v.

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                      @[simp]
                      theorem TannakaDuality.FiniteGroup.ofRightFDRep_hom {k G : Type u} [CommRing k] [Group G] [Finite G] [Fintype G] (X : FDRep k G) (v : X.V) :
                      (ofRightFDRep X v).hom = ModuleCat.ofHom (sumSMulInv v)
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                      theorem TannakaDuality.FiniteGroup.toRightFDRepComp_injective {k G : Type u} [CommRing k] [Group G] [Finite G] {η₁ η₂ : CategoryTheory.Aut (forget k G)} (h : η₁.hom.hom.app rightFDRep = η₂.hom.hom.app rightFDRep) :
                      η₁ = η₂
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                      def TannakaDuality.FiniteGroup.leftRegularFDRepHom {k G : Type u} [CommRing k] [Group G] [Finite G] (s : G) :
                      CategoryTheory.End rightFDRep

                      leftRegular as a morphism rightFDRep k G ⟶ rightFDRep k G in FDRep k G.

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                        theorem TannakaDuality.FiniteGroup.toRightFDRepComp_in_rightRegular {k G : Type u} [CommRing k] [Group G] [Finite G] [IsDomain k] (η : CategoryTheory.Aut (forget k G)) :
                        ∃ (s : G), ModuleCat.Hom.hom (η.hom.hom.app rightFDRep) = rightRegular s
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                        theorem TannakaDuality.FiniteGroup.equivHom_surjective {k G : Type u} [CommRing k] [Group G] [Finite G] [IsDomain k] :
                        Function.Surjective (equivHom k G)
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                        def TannakaDuality.FiniteGroup.equiv (k G : Type u) [CommRing k] [Group G] [Finite G] [IsDomain k] :
                        G ≃* CategoryTheory.Aut (forget k G)

                        Tannaka duality for finite groups:

                        A finite group G is isomorphic to Aut (forget k G), where k is any integral domain, and forget k G is the monoidal forgetful functor FDRep k G ⥤ FGModuleCat k G.

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