HepLean Documentation

Mathlib.RingTheory.Ideal.Quotient.Operations

More operations on modules and ideals related to quotients #

Main results: #

def RingHom.kerLift {R : Type u} {S : Type v} [CommRing R] [Semiring S] (f : R →+* S) :

The induced map from the quotient by the kernel to the codomain.

This is an isomorphism if f has a right inverse (quotientKerEquivOfRightInverse) / is surjective (quotientKerEquivOfSurjective).

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    @[simp]
    theorem RingHom.kerLift_mk {R : Type u} {S : Type v} [CommRing R] [Semiring S] (f : R →+* S) (r : R) :
    f.kerLift ((Ideal.Quotient.mk (RingHom.ker f)) r) = f r
    theorem RingHom.lift_injective_of_ker_le_ideal {R : Type u} {S : Type v} [CommRing R] [Semiring S] (I : Ideal R) {f : R →+* S} (H : aI, f a = 0) (hI : RingHom.ker f I) :
    theorem RingHom.kerLift_injective {R : Type u} {S : Type v} [CommRing R] [Semiring S] (f : R →+* S) :
    Function.Injective f.kerLift

    The induced map from the quotient by the kernel is injective.

    def RingHom.quotientKerEquivOfRightInverse {R : Type u} {S : Type v} [CommRing R] [Semiring S] {f : R →+* S} {g : SR} (hf : Function.RightInverse g f) :

    The first isomorphism theorem for commutative rings, computable version.

    Equations
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      @[simp]
      theorem RingHom.quotientKerEquivOfRightInverse.apply {R : Type u} {S : Type v} [CommRing R] [Semiring S] {f : R →+* S} {g : SR} (hf : Function.RightInverse g f) (x : R RingHom.ker f) :
      @[simp]
      theorem RingHom.quotientKerEquivOfRightInverse.Symm.apply {R : Type u} {S : Type v} [CommRing R] [Semiring S] {f : R →+* S} {g : SR} (hf : Function.RightInverse g f) (x : S) :

      The quotient of a ring by he zero ideal is isomorphic to the ring itself.

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        noncomputable def RingHom.quotientKerEquivOfSurjective {R : Type u} {S : Type v} [CommRing R] [Semiring S] {f : R →+* S} (hf : Function.Surjective f) :

        The first isomorphism theorem for commutative rings, surjective case.

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          noncomputable def RingHom.quotientKerEquivRangeS {R : Type u} {S : Type v} [CommRing R] [Semiring S] (f : R →+* S) :
          R RingHom.ker f ≃+* f.rangeS

          The first isomorphism theorem for commutative rings (RingHom.rangeS version).

          Equations
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            noncomputable def RingHom.quotientKerEquivRange {R : Type u} [CommRing R] {S : Type v} [Ring S] (f : R →+* S) :
            R RingHom.ker f ≃+* f.range

            The first isomorphism theorem for commutative rings (RingHom.range version).

            Equations
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              @[simp]
              theorem Ideal.mk_ker {R : Type u} [CommRing R] {I : Ideal R} :
              theorem Ideal.map_mk_eq_bot_of_le {R : Type u} [CommRing R] {I : Ideal R} {J : Ideal R} (h : I J) :
              theorem Ideal.injective_lift_iff {R : Type u} {S : Type v} [CommRing R] [Semiring S] {I : Ideal R} {f : R →+* S} (H : aI, f a = 0) :
              theorem Ideal.ker_Pi_Quotient_mk {R : Type u} [CommRing R] {ι : Type u_1} (I : ιIdeal R) :
              RingHom.ker (Pi.ringHom fun (i : ι) => Ideal.Quotient.mk (I i)) = ⨅ (i : ι), I i
              @[simp]
              theorem Ideal.bot_quotient_isMaximal_iff {R : Type u} [CommRing R] (I : Ideal R) :
              .IsMaximal I.IsMaximal
              @[simp]
              theorem Ideal.mem_quotient_iff_mem_sup {R : Type u} [CommRing R] {I : Ideal R} {J : Ideal R} {x : R} :

              See also Ideal.mem_quotient_iff_mem in case I ≤ J.

              theorem Ideal.mem_quotient_iff_mem {R : Type u} [CommRing R] {I : Ideal R} {J : Ideal R} (hIJ : I J) {x : R} :

              See also Ideal.mem_quotient_iff_mem_sup if the assumption I ≤ J is not available.

              def Ideal.quotientInfToPiQuotient {R : Type u} [CommRing R] {ι : Type u_1} (I : ιIdeal R) :
              R ⨅ (i : ι), I i →+* (i : ι) → R I i

              The homomorphism from R/(⋂ i, f i) to ∏ i, (R / f i) featured in the Chinese Remainder Theorem. It is bijective if the ideals f i are coprime.

              Equations
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                theorem Ideal.quotientInfToPiQuotient_mk {R : Type u} [CommRing R] {ι : Type u_1} (I : ιIdeal R) (x : R) :
                (Ideal.quotientInfToPiQuotient I) ((Ideal.Quotient.mk (⨅ (i : ι), I i)) x) = fun (i : ι) => (Ideal.Quotient.mk (I i)) x
                theorem Ideal.quotientInfToPiQuotient_mk' {R : Type u} [CommRing R] {ι : Type u_1} (I : ιIdeal R) (x : R) (i : ι) :
                (Ideal.quotientInfToPiQuotient I) ((Ideal.Quotient.mk (⨅ (i : ι), I i)) x) i = (Ideal.Quotient.mk (I i)) x
                theorem Ideal.quotientInfToPiQuotient_surj {R : Type u} [CommRing R] {ι : Type u_1} [Finite ι] {I : ιIdeal R} (hI : Pairwise fun (i j : ι) => IsCoprime (I i) (I j)) :
                noncomputable def Ideal.quotientInfRingEquivPiQuotient {R : Type u} [CommRing R] {ι : Type u_1} [Finite ι] (f : ιIdeal R) (hf : Pairwise fun (i j : ι) => IsCoprime (f i) (f j)) :
                R ⨅ (i : ι), f i ≃+* ((i : ι) → R f i)

                Chinese Remainder Theorem. Eisenbud Ex.2.6. Similar to Atiyah-Macdonald 1.10 and Stacks 00DT

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                  theorem Ideal.pi_quotient_surjective {R : Type u_2} [CommRing R] {ι : Type u_3} [Finite ι] {I : ιIdeal R} (hf : Pairwise fun (i j : ι) => IsCoprime (I i) (I j)) (x : (i : ι) → R I i) :
                  ∃ (r : R), ∀ (i : ι), (Ideal.Quotient.mk (I i)) r = x i

                  Corollary of Chinese Remainder Theorem: if Iᵢ are pairwise coprime ideals in a commutative ring then the canonical map R → ∏ (R ⧸ Iᵢ) is surjective.

                  theorem Ideal.exists_forall_sub_mem_ideal {R : Type u_2} [CommRing R] {ι : Type u_3} [Finite ι] {I : ιIdeal R} (hI : Pairwise fun (i j : ι) => IsCoprime (I i) (I j)) (x : ιR) :
                  ∃ (r : R), ∀ (i : ι), r - x i I i

                  Corollary of Chinese Remainder Theorem: if Iᵢ are pairwise coprime ideals in a commutative ring then given elements xᵢ you can find r with r - xᵢ ∈ Iᵢ for all i.

                  noncomputable def Ideal.quotientInfEquivQuotientProd {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) (coprime : IsCoprime I J) :
                  R I J ≃+* (R I) × R J

                  Chinese remainder theorem, specialized to two ideals.

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                    @[simp]
                    theorem Ideal.quotientInfEquivQuotientProd_fst {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) (coprime : IsCoprime I J) (x : R I J) :
                    ((I.quotientInfEquivQuotientProd J coprime) x).1 = (Ideal.Quotient.factor (I J) I ) x
                    @[simp]
                    theorem Ideal.quotientInfEquivQuotientProd_snd {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) (coprime : IsCoprime I J) (x : R I J) :
                    ((I.quotientInfEquivQuotientProd J coprime) x).2 = (Ideal.Quotient.factor (I J) J ) x
                    @[simp]
                    theorem Ideal.fst_comp_quotientInfEquivQuotientProd {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) (coprime : IsCoprime I J) :
                    (RingHom.fst (R I) (R J)).comp (I.quotientInfEquivQuotientProd J coprime) = Ideal.Quotient.factor (I J) I
                    @[simp]
                    theorem Ideal.snd_comp_quotientInfEquivQuotientProd {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) (coprime : IsCoprime I J) :
                    (RingHom.snd (R I) (R J)).comp (I.quotientInfEquivQuotientProd J coprime) = Ideal.Quotient.factor (I J) J
                    noncomputable def Ideal.quotientMulEquivQuotientProd {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) (coprime : IsCoprime I J) :
                    R I * J ≃+* (R I) × R J

                    Chinese remainder theorem, specialized to two ideals.

                    Equations
                    • I.quotientMulEquivQuotientProd J coprime = (Ideal.quotEquivOfEq ).trans (I.quotientInfEquivQuotientProd J coprime)
                    Instances For
                      @[simp]
                      theorem Ideal.quotientMulEquivQuotientProd_fst {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) (coprime : IsCoprime I J) (x : R I * J) :
                      ((I.quotientMulEquivQuotientProd J coprime) x).1 = (Ideal.Quotient.factor (I * J) I ) x
                      @[simp]
                      theorem Ideal.quotientMulEquivQuotientProd_snd {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) (coprime : IsCoprime I J) (x : R I * J) :
                      ((I.quotientMulEquivQuotientProd J coprime) x).2 = (Ideal.Quotient.factor (I * J) J ) x
                      @[simp]
                      theorem Ideal.fst_comp_quotientMulEquivQuotientProd {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) (coprime : IsCoprime I J) :
                      (RingHom.fst (R I) (R J)).comp (I.quotientMulEquivQuotientProd J coprime) = Ideal.Quotient.factor (I * J) I
                      @[simp]
                      theorem Ideal.snd_comp_quotientMulEquivQuotientProd {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) (coprime : IsCoprime I J) :
                      (RingHom.snd (R I) (R J)).comp (I.quotientMulEquivQuotientProd J coprime) = Ideal.Quotient.factor (I * J) J
                      instance Ideal.Quotient.algebra (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] {I : Ideal A} :
                      Algebra R₁ (A I)

                      The R₁-algebra structure on A/I for an R₁-algebra A

                      Equations
                      instance Ideal.Quotient.isScalarTower (R₁ : Type u_1) (R₂ : Type u_2) {A : Type u_3} [CommSemiring R₁] [CommSemiring R₂] [CommRing A] [Algebra R₁ A] [Algebra R₂ A] [SMul R₁ R₂] [IsScalarTower R₁ R₂ A] (I : Ideal A) :
                      IsScalarTower R₁ R₂ (A I)
                      Equations
                      • =
                      def Ideal.Quotient.mkₐ (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] (I : Ideal A) :
                      A →ₐ[R₁] A I

                      The canonical morphism A →ₐ[R₁] A ⧸ I as morphism of R₁-algebras, for I an ideal of A, where A is an R₁-algebra.

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                        theorem Ideal.Quotient.algHom_ext (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] {I : Ideal A} {S : Type u_5} [Semiring S] [Algebra R₁ S] ⦃f : A I →ₐ[R₁] S ⦃g : A I →ₐ[R₁] S (h : f.comp (Ideal.Quotient.mkₐ R₁ I) = g.comp (Ideal.Quotient.mkₐ R₁ I)) :
                        f = g
                        theorem Ideal.Quotient.alg_map_eq (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] (I : Ideal A) :
                        algebraMap R₁ (A I) = (algebraMap A (A I)).comp (algebraMap R₁ A)
                        theorem Ideal.Quotient.mkₐ_toRingHom (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] (I : Ideal A) :
                        @[simp]
                        theorem Ideal.Quotient.mkₐ_eq_mk (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] (I : Ideal A) :
                        @[simp]
                        theorem Ideal.Quotient.mk_comp_algebraMap (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] (I : Ideal A) :
                        (Ideal.Quotient.mk I).comp (algebraMap R₁ A) = algebraMap R₁ (A I)
                        @[simp]
                        theorem Ideal.Quotient.mk_algebraMap (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] (I : Ideal A) (x : R₁) :
                        (Ideal.Quotient.mk I) ((algebraMap R₁ A) x) = (algebraMap R₁ (A I)) x
                        theorem Ideal.Quotient.mkₐ_surjective (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] (I : Ideal A) :

                        The canonical morphism A →ₐ[R₁] I.quotient is surjective.

                        @[simp]
                        theorem Ideal.Quotient.mkₐ_ker (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] (I : Ideal A) :

                        The kernel of A →ₐ[R₁] I.quotient is I.

                        def Ideal.Quotient.liftₐ {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] (I : Ideal A) (f : A →ₐ[R₁] B) (hI : aI, f a = 0) :
                        A I →ₐ[R₁] B

                        Ideal.quotient.lift as an AlgHom.

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                          @[simp]
                          theorem Ideal.Quotient.liftₐ_apply {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] (I : Ideal A) (f : A →ₐ[R₁] B) (hI : aI, f a = 0) (x : A I) :
                          (Ideal.Quotient.liftₐ I f hI) x = (Ideal.Quotient.lift I (↑f) hI) x
                          theorem Ideal.Quotient.liftₐ_comp {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] (I : Ideal A) (f : A →ₐ[R₁] B) (hI : aI, f a = 0) :
                          theorem Ideal.KerLift.map_smul {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] (f : A →ₐ[R₁] B) (r : R₁) (x : A RingHom.ker f) :
                          f.kerLift (r x) = r f.kerLift x
                          def Ideal.kerLiftAlg {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] (f : A →ₐ[R₁] B) :

                          The induced algebras morphism from the quotient by the kernel to the codomain.

                          This is an isomorphism if f has a right inverse (quotientKerAlgEquivOfRightInverse) / is surjective (quotientKerAlgEquivOfSurjective).

                          Equations
                          Instances For
                            @[simp]
                            theorem Ideal.kerLiftAlg_mk {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] (f : A →ₐ[R₁] B) (a : A) :
                            @[simp]
                            theorem Ideal.kerLiftAlg_toRingHom {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] (f : A →ₐ[R₁] B) :
                            (Ideal.kerLiftAlg f) = (↑f).kerLift
                            theorem Ideal.kerLiftAlg_injective {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] (f : A →ₐ[R₁] B) :

                            The induced algebra morphism from the quotient by the kernel is injective.

                            @[simp]
                            theorem Ideal.quotientKerAlgEquivOfRightInverse_apply {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] {f : A →ₐ[R₁] B} {g : BA} (hf : Function.RightInverse g f) (a : A RingHom.ker f.toRingHom) :
                            @[simp]
                            theorem Ideal.quotientKerAlgEquivOfRightInverse_symm_apply {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] {f : A →ₐ[R₁] B} {g : BA} (hf : Function.RightInverse g f) :
                            def Ideal.quotientKerAlgEquivOfRightInverse {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] {f : A →ₐ[R₁] B} {g : BA} (hf : Function.RightInverse g f) :

                            The first isomorphism theorem for algebras, computable version.

                            Equations
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                              @[deprecated Ideal.quotientKerAlgEquivOfRightInverse_apply]
                              theorem Ideal.quotientKerAlgEquivOfRightInverse.apply {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] {f : A →ₐ[R₁] B} {g : BA} (hf : Function.RightInverse g f) (a : A RingHom.ker f.toRingHom) :

                              Alias of Ideal.quotientKerAlgEquivOfRightInverse_apply.

                              @[deprecated Ideal.quotientKerAlgEquivOfRightInverse_symm_apply]
                              theorem Ideal.QuotientKerAlgEquivOfRightInverseSymm.apply {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] {f : A →ₐ[R₁] B} {g : BA} (hf : Function.RightInverse g f) :

                              Alias of Ideal.quotientKerAlgEquivOfRightInverse_symm_apply.

                              @[simp]
                              theorem Ideal.quotientKerAlgEquivOfSurjective_symm_apply {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] {f : A →ₐ[R₁] B} (hf : Function.Surjective f) :
                              @[simp]
                              theorem Ideal.quotientKerAlgEquivOfSurjective_apply {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] {f : A →ₐ[R₁] B} (hf : Function.Surjective f) (a : A RingHom.ker f.toRingHom) :
                              noncomputable def Ideal.quotientKerAlgEquivOfSurjective {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [Semiring B] [Algebra R₁ B] {f : A →ₐ[R₁] B} (hf : Function.Surjective f) :

                              The first isomorphism theorem for algebras.

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                                def Ideal.quotientMap {R : Type u} [CommRing R] {S : Type v} [CommRing S] {I : Ideal R} (J : Ideal S) (f : R →+* S) (hIJ : I Ideal.comap f J) :
                                R I →+* S J

                                The ring hom R/I →+* S/J induced by a ring hom f : R →+* S with I ≤ f⁻¹(J)

                                Equations
                                Instances For
                                  @[simp]
                                  theorem Ideal.quotientMap_mk {R : Type u} [CommRing R] {S : Type v} [CommRing S] {J : Ideal R} {I : Ideal S} {f : R →+* S} {H : J Ideal.comap f I} {x : R} :
                                  @[simp]
                                  theorem Ideal.quotientMap_algebraMap {R₁ : Type u_1} {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] {S : Type v} [CommRing S] {J : Ideal A} {I : Ideal S} {f : A →+* S} {H : J Ideal.comap f I} {x : R₁} :
                                  (Ideal.quotientMap I f H) ((algebraMap R₁ (A J)) x) = (Ideal.Quotient.mk I) (f ((algebraMap R₁ A) x))
                                  theorem Ideal.quotientMap_comp_mk {R : Type u} [CommRing R] {S : Type v} [CommRing S] {J : Ideal R} {I : Ideal S} {f : R →+* S} (H : J Ideal.comap f I) :
                                  @[simp]
                                  theorem Ideal.quotientEquiv_symm_apply {R : Type u} [CommRing R] {S : Type v} [CommRing S] (I : Ideal R) (J : Ideal S) (f : R ≃+* S) (hIJ : J = Ideal.map (↑f) I) (a : S J) :
                                  (I.quotientEquiv J f hIJ).symm a = (Ideal.quotientMap I f.symm ) a
                                  @[simp]
                                  theorem Ideal.quotientEquiv_apply {R : Type u} [CommRing R] {S : Type v} [CommRing S] (I : Ideal R) (J : Ideal S) (f : R ≃+* S) (hIJ : J = Ideal.map (↑f) I) :
                                  ∀ (a : R I), (I.quotientEquiv J f hIJ) a = (↑(Ideal.quotientMap J f )).toFun a
                                  def Ideal.quotientEquiv {R : Type u} [CommRing R] {S : Type v} [CommRing S] (I : Ideal R) (J : Ideal S) (f : R ≃+* S) (hIJ : J = Ideal.map (↑f) I) :
                                  R I ≃+* S J

                                  The ring equiv R/I ≃+* S/J induced by a ring equiv f : R ≃+* S, where J = f(I).

                                  Equations
                                  • I.quotientEquiv J f hIJ = { toFun := (↑(Ideal.quotientMap J f )).toFun, invFun := (Ideal.quotientMap I f.symm ), left_inv := , right_inv := , map_mul' := , map_add' := }
                                  Instances For
                                    theorem Ideal.quotientEquiv_mk {R : Type u} [CommRing R] {S : Type v} [CommRing S] (I : Ideal R) (J : Ideal S) (f : R ≃+* S) (hIJ : J = Ideal.map (↑f) I) (x : R) :
                                    (I.quotientEquiv J f hIJ) ((Ideal.Quotient.mk I) x) = (Ideal.Quotient.mk J) (f x)
                                    @[simp]
                                    theorem Ideal.quotientEquiv_symm_mk {R : Type u} [CommRing R] {S : Type v} [CommRing S] (I : Ideal R) (J : Ideal S) (f : R ≃+* S) (hIJ : J = Ideal.map (↑f) I) (x : S) :
                                    (I.quotientEquiv J f hIJ).symm ((Ideal.Quotient.mk J) x) = (Ideal.Quotient.mk I) (f.symm x)
                                    theorem Ideal.quotientMap_injective' {R : Type u} [CommRing R] {S : Type v} [CommRing S] {J : Ideal R} {I : Ideal S} {f : R →+* S} {H : J Ideal.comap f I} (h : Ideal.comap f I J) :

                                    H and h are kept as separate hypothesis since H is used in constructing the quotient map.

                                    theorem Ideal.quotientMap_injective {R : Type u} [CommRing R] {S : Type v} [CommRing S] {I : Ideal S} {f : R →+* S} :

                                    If we take J = I.comap f then QuotientMap is injective automatically.

                                    theorem Ideal.quotientMap_surjective {R : Type u} [CommRing R] {S : Type v} [CommRing S] {J : Ideal R} {I : Ideal S} {f : R →+* S} {H : J Ideal.comap f I} (hf : Function.Surjective f) :
                                    theorem Ideal.comp_quotientMap_eq_of_comp_eq {R : Type u} [CommRing R] {S : Type v} [CommRing S] {R' : Type u_5} {S' : Type u_6} [CommRing R'] [CommRing S'] {f : R →+* S} {f' : R' →+* S'} {g : R →+* R'} {g' : S →+* S'} (hfg : f'.comp g = g'.comp f) (I : Ideal S') :
                                    let leq := ; (Ideal.quotientMap I g' ).comp (Ideal.quotientMap (Ideal.comap g' I) f ) = (Ideal.quotientMap I f' ).comp (Ideal.quotientMap (Ideal.comap f' I) g leq)

                                    Commutativity of a square is preserved when taking quotients by an ideal.

                                    def Ideal.quotientMapₐ {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [CommRing B] [Algebra R₁ B] {I : Ideal A} (J : Ideal B) (f : A →ₐ[R₁] B) (hIJ : I Ideal.comap f J) :
                                    A I →ₐ[R₁] B J

                                    The algebra hom A/I →+* B/J induced by an algebra hom f : A →ₐ[R₁] B with I ≤ f⁻¹(J).

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                                      theorem Ideal.quotient_map_mkₐ {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [CommRing B] [Algebra R₁ B] {I : Ideal A} (J : Ideal B) (f : A →ₐ[R₁] B) (H : I Ideal.comap f J) {x : A} :
                                      theorem Ideal.quotient_map_comp_mkₐ {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [CommRing B] [Algebra R₁ B] {I : Ideal A} (J : Ideal B) (f : A →ₐ[R₁] B) (H : I Ideal.comap f J) :
                                      (Ideal.quotientMapₐ J f H).comp (Ideal.Quotient.mkₐ R₁ I) = (Ideal.Quotient.mkₐ R₁ J).comp f
                                      def Ideal.quotientEquivAlg {R₁ : Type u_1} {A : Type u_3} {B : Type u_4} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] [CommRing B] [Algebra R₁ B] (I : Ideal A) (J : Ideal B) (f : A ≃ₐ[R₁] B) (hIJ : J = Ideal.map (↑f) I) :
                                      (A I) ≃ₐ[R₁] B J

                                      The algebra equiv A/I ≃ₐ[R] B/J induced by an algebra equiv f : A ≃ₐ[R] B, whereJ = f(I).

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                                      • I.quotientEquivAlg J f hIJ = { toEquiv := (I.quotientEquiv J (↑f) hIJ).toEquiv, map_mul' := , map_add' := , commutes' := }
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                                        instance Ideal.quotientAlgebra {R : Type u} [CommRing R] {A : Type u_3} [CommRing A] {I : Ideal A} [Algebra R A] :
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                                        def Ideal.quotientEquivAlgOfEq (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] {I : Ideal A} {J : Ideal A} (h : I = J) :
                                        (A I) ≃ₐ[R₁] A J

                                        Quotienting by equal ideals gives equivalent algebras.

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                                          theorem Ideal.quotientEquivAlgOfEq_mk (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] {I : Ideal A} {J : Ideal A} (h : I = J) (x : A) :
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                                          theorem Ideal.quotientEquivAlgOfEq_symm (R₁ : Type u_1) {A : Type u_3} [CommSemiring R₁] [CommRing A] [Algebra R₁ A] {I : Ideal A} {J : Ideal A} (h : I = J) :
                                          theorem Ideal.comap_map_mk {R : Type u} [CommRing R] {I : Ideal R} {J : Ideal R} (h : I J) :
                                          noncomputable def Ideal.quotientKerEquivRange {R : Type u} [CommRing R] {A : Type u_5} {B : Type u_6} [CommRing A] [Algebra R A] [Semiring B] [Algebra R B] (f : A →ₐ[R] B) :
                                          (A RingHom.ker f) ≃ₐ[R] f.range

                                          The first isomorphism theorem for commutative algebras (AlgHom.range version).

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                                            def DoubleQuot.quotLeftToQuotSup {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) :
                                            R I →+* R I J

                                            The obvious ring hom R/I → R/(I ⊔ J)

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                                              def DoubleQuot.quotQuotToQuotSup {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) :

                                              The ring homomorphism (R/I)/J' -> R/(I ⊔ J) induced by quotLeftToQuotSup where J' is the image of J in R/I

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                                                def DoubleQuot.quotQuotMk {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) :

                                                The composite of the maps R → (R/I) and (R/I) → (R/I)/J'

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                                                  The kernel of quotQuotMk

                                                  def DoubleQuot.liftSupQuotQuotMk {R : Type u} [CommRing R] (I : Ideal R) (J : Ideal R) :

                                                  The ring homomorphism R/(I ⊔ J) → (R/I)/J' induced by quotQuotMk

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                                                    quotQuotToQuotSup and liftSupQuotQuotMk are inverse isomorphisms. In the case where I ≤ J, this is the Third Isomorphism Theorem (see quotQuotEquivQuotOfLe)

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                                                      The obvious isomorphism (R/I)/J' → (R/J)/I'

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                                                        def DoubleQuot.quotQuotEquivQuotOfLE {R : Type u} [CommRing R] {I : Ideal R} {J : Ideal R} (h : I J) :

                                                        The Third Isomorphism theorem for rings. See quotQuotEquivQuotSup for a version that does not assume an inclusion of ideals.

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                                                          def DoubleQuot.quotLeftToQuotSupₐ (R : Type u) {A : Type u_1} [CommSemiring R] [CommRing A] [Algebra R A] (I : Ideal A) (J : Ideal A) :
                                                          A I →ₐ[R] A I J

                                                          The natural algebra homomorphism A / I → A / (I ⊔ J).

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                                                            def DoubleQuot.quotQuotToQuotSupₐ (R : Type u) {A : Type u_1} [CommSemiring R] [CommRing A] [Algebra R A] (I : Ideal A) (J : Ideal A) :

                                                            The algebra homomorphism (A / I) / J' -> A / (I ⊔ J) induced by quotQuotToQuotSup, where J' is the projection of J in A / I.

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                                                              def DoubleQuot.quotQuotMkₐ (R : Type u) {A : Type u_1} [CommSemiring R] [CommRing A] [Algebra R A] (I : Ideal A) (J : Ideal A) :

                                                              The composition of the algebra homomorphisms A → (A / I) and (A / I) → (A / I) / J', where J' is the projection J in A / I.

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                                                                theorem DoubleQuot.coe_quotQuotMkₐ (R : Type u) {A : Type u_1} [CommSemiring R] [CommRing A] [Algebra R A] (I : Ideal A) (J : Ideal A) :
                                                                def DoubleQuot.liftSupQuotQuotMkₐ (R : Type u) {A : Type u_1} [CommSemiring R] [CommRing A] [Algebra R A] (I : Ideal A) (J : Ideal A) :

                                                                The injective algebra homomorphism A / (I ⊔ J) → (A / I) / J'induced by quot_quot_mk, where J' is the projection J in A / I.

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                                                                  def DoubleQuot.quotQuotEquivQuotSupₐ (R : Type u) {A : Type u_1} [CommSemiring R] [CommRing A] [Algebra R A] (I : Ideal A) (J : Ideal A) :

                                                                  quotQuotToQuotSup and liftSupQuotQuotMk are inverse isomorphisms. In the case where I ≤ J, this is the Third Isomorphism Theorem (see DoubleQuot.quotQuotEquivQuotOfLE).

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                                                                    The natural algebra isomorphism (A / I) / J' → (A / J) / I', where J' (resp. I') is the projection of J in A / I (resp. I in A / J).

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                                                                      def DoubleQuot.quotQuotEquivQuotOfLEₐ (R : Type u) {A : Type u_1} [CommSemiring R] [CommRing A] [Algebra R A] {I : Ideal A} {J : Ideal A} (h : I J) :

                                                                      The third isomorphism theorem for algebras. See quotQuotEquivQuotSupₐ for version that does not assume an inclusion of ideals.

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                                                                        noncomputable def Ideal.powQuotPowSuccLinearEquivMapMkPowSuccPow {R : Type u_1} [CommRing R] (I : Ideal R) (n : ) :
                                                                        ((I ^ n) I ) ≃ₗ[R] (Ideal.map (Ideal.Quotient.mk (I ^ (n + 1))) (I ^ n))

                                                                        I ^ n ⧸ I ^ (n + 1) can be viewed as a quotient module and as ideal of R ⧸ I ^ (n + 1). This definition gives the R-linear equivalence between the two.

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                                                                          noncomputable def Ideal.powQuotPowSuccEquivMapMkPowSuccPow {R : Type u_1} [CommRing R] (I : Ideal R) (n : ) :
                                                                          (I ^ n) I (Ideal.map (Ideal.Quotient.mk (I ^ (n + 1))) (I ^ n))

                                                                          I ^ n ⧸ I ^ (n + 1) can be viewed as a quotient module and as ideal of R ⧸ I ^ (n + 1). This definition gives the equivalence between the two, instead of the R-linear equivalence, to bypass typeclass synthesis issues on complex Module goals.

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                                                                          • I.powQuotPowSuccEquivMapMkPowSuccPow n = (I.powQuotPowSuccLinearEquivMapMkPowSuccPow n)
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