Infinite sums in topological vector spaces

theorem HasSum.const_smul {α : Type u_1} {β : Type u_2} {γ : Type u_3} [Monoid γ] [TopologicalSpace α] [AddCommMonoid α] [DistribMulAction γ α] [ContinuousConstSMul γ α] {f : β → α} {a : α} (b : γ) (hf : HasSum f a) : HasSum (fun (i : β) => b • f i) (b • a)

theorem Summable.const_smul {α : Type u_1} {β : Type u_2} {γ : Type u_3} [Monoid γ] [TopologicalSpace α] [AddCommMonoid α] [DistribMulAction γ α] [ContinuousConstSMul γ α] {f : β → α} (b : γ) (hf : Summable f) : Summable fun (i : β) => b • f i

theorem tsum_const_smul {α : Type u_1} {β : Type u_2} {γ : Type u_3} [Monoid γ] [TopologicalSpace α] [AddCommMonoid α] [DistribMulAction γ α] [ContinuousConstSMul γ α] {f : β → α} [T2Space α] (b : γ) (hf : Summable f) : ∑' (i : β), b • f i = b • ∑' (i : β), f i

Infinite sums commute with scalar multiplication. Version for scalars living in a Monoid, but requiring a summability hypothesis.

theorem tsum_const_smul' {α : Type u_1} {β : Type u_2} [TopologicalSpace α] [AddCommMonoid α] {f : β → α} {γ : Type u_5} [Group γ] [DistribMulAction γ α] [ContinuousConstSMul γ α] [T2Space α] (g : γ) : ∑' (i : β), g • f i = g • ∑' (i : β), f i

Infinite sums commute with scalar multiplication. Version for scalars living in a Group, but not requiring any summability hypothesis.

theorem tsum_const_smul'' {α : Type u_1} {β : Type u_2} [TopologicalSpace α] [AddCommMonoid α] {f : β → α} {γ : Type u_5} [DivisionRing γ] [Module γ α] [ContinuousConstSMul γ α] [T2Space α] (g : γ) : ∑' (i : β), g • f i = g • ∑' (i : β), f i

Infinite sums commute with scalar multiplication. Version for scalars living in a DivisionRing; no summability hypothesis. This could be made to work for a [GroupWithZero γ] if there was such a thing as DistribMulActionWithZero.

theorem HasSum.smul_const {ι : Type u_5} {R : Type u_7} {M : Type u_9} [Semiring R] [TopologicalSpace R] [TopologicalSpace M] [AddCommMonoid M] [Module R M] [ContinuousSMul R M] {f : ι → R} {r : R} (hf : HasSum f r) (a : M) : HasSum (fun (z : ι) => f z • a) (r • a)

theorem Summable.smul_const {ι : Type u_5} {R : Type u_7} {M : Type u_9} [Semiring R] [TopologicalSpace R] [TopologicalSpace M] [AddCommMonoid M] [Module R M] [ContinuousSMul R M] {f : ι → R} (hf : Summable f) (a : M) : Summable fun (z : ι) => f z • a

theorem tsum_smul_const {ι : Type u_5} {R : Type u_7} {M : Type u_9} [Semiring R] [TopologicalSpace R] [TopologicalSpace M] [AddCommMonoid M] [Module R M] [ContinuousSMul R M] {f : ι → R} [T2Space M] (hf : Summable f) (a : M) : ∑' (z : ι), f z • a = (∑' (z : ι), f z) • a

Note we cannot derive the mul lemmas from these smul lemmas, as the mul versions do not require associativity, but Module does.

theorem HasSum.smul_eq {ι : Type u_5} {κ : Type u_6} {R : Type u_7} {M : Type u_9} [Semiring R] [AddCommMonoid M] [Module R M] [TopologicalSpace R] [TopologicalSpace M] [T3Space M] [ContinuousAdd M] [ContinuousSMul R M] {f : ι → R} {g : κ → M} {s : R} {t : M} {u : M} (hf : HasSum f s) (hg : HasSum g t) (hfg : HasSum (fun (x : ι × κ) => f x.1 • g x.2) u) : s • t = u

theorem HasSum.smul {ι : Type u_5} {κ : Type u_6} {R : Type u_7} {M : Type u_9} [Semiring R] [AddCommMonoid M] [Module R M] [TopologicalSpace R] [TopologicalSpace M] [T3Space M] [ContinuousAdd M] [ContinuousSMul R M] {f : ι → R} {g : κ → M} {s : R} {t : M} (hf : HasSum f s) (hg : HasSum g t) (hfg : Summable fun (x : ι × κ) => f x.1 • g x.2) : HasSum (fun (x : ι × κ) => f x.1 • g x.2) (s • t)

theorem tsum_smul_tsum {ι : Type u_5} {κ : Type u_6} {R : Type u_7} {M : Type u_9} [Semiring R] [AddCommMonoid M] [Module R M] [TopologicalSpace R] [TopologicalSpace M] [T3Space M] [ContinuousAdd M] [ContinuousSMul R M] {f : ι → R} {g : κ → M} (hf : Summable f) (hg : Summable g) (hfg : Summable fun (x : ι × κ) => f x.1 • g x.2) : (∑' (x : ι), f x) • ∑' (y : κ), g y = ∑' (z : ι × κ), f z.1 • g z.2

Scalar product of two infinites sums indexed by arbitrary types.

theorem ContinuousLinearMap.hasSum {ι : Type u_5} {R : Type u_7} {R₂ : Type u_8} {M : Type u_9} {M₂ : Type u_10} [Semiring R] [Semiring R₂] [AddCommMonoid M] [Module R M] [AddCommMonoid M₂] [Module R₂ M₂] [TopologicalSpace M] [TopologicalSpace M₂] {σ : R →+* R₂} {f : ι → M} (φ : M →SL[σ] M₂) {x : M} (hf : HasSum f x) : HasSum (fun (b : ι) => φ (f b)) (φ x)

Applying a continuous linear map commutes with taking an (infinite) sum.

theorem HasSum.mapL {ι : Type u_5} {R : Type u_7} {R₂ : Type u_8} {M : Type u_9} {M₂ : Type u_10} [Semiring R] [Semiring R₂] [AddCommMonoid M] [Module R M] [AddCommMonoid M₂] [Module R₂ M₂] [TopologicalSpace M] [TopologicalSpace M₂] {σ : R →+* R₂} {f : ι → M} (φ : M →SL[σ] M₂) {x : M} (hf : HasSum f x) : HasSum (fun (b : ι) => φ (f b)) (φ x)

Alias of ContinuousLinearMap.hasSum.

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Applying a continuous linear map commutes with taking an (infinite) sum.

theorem ContinuousLinearMap.summable {ι : Type u_5} {R : Type u_7} {R₂ : Type u_8} {M : Type u_9} {M₂ : Type u_10} [Semiring R] [Semiring R₂] [AddCommMonoid M] [Module R M] [AddCommMonoid M₂] [Module R₂ M₂] [TopologicalSpace M] [TopologicalSpace M₂] {σ : R →+* R₂} {f : ι → M} (φ : M →SL[σ] M₂) (hf : Summable f) : Summable fun (b : ι) => φ (f b)

theorem Summable.mapL {ι : Type u_5} {R : Type u_7} {R₂ : Type u_8} {M : Type u_9} {M₂ : Type u_10} [Semiring R] [Semiring R₂] [AddCommMonoid M] [Module R M] [AddCommMonoid M₂] [Module R₂ M₂] [TopologicalSpace M] [TopologicalSpace M₂] {σ : R →+* R₂} {f : ι → M} (φ : M →SL[σ] M₂) (hf : Summable f) : Summable fun (b : ι) => φ (f b)

Alias of ContinuousLinearMap.summable.

theorem ContinuousLinearMap.map_tsum {ι : Type u_5} {R : Type u_7} {R₂ : Type u_8} {M : Type u_9} {M₂ : Type u_10} [Semiring R] [Semiring R₂] [AddCommMonoid M] [Module R M] [AddCommMonoid M₂] [Module R₂ M₂] [TopologicalSpace M] [TopologicalSpace M₂] {σ : R →+* R₂} [T2Space M₂] {f : ι → M} (φ : M →SL[σ] M₂) (hf : Summable f) : φ (∑' (z : ι), f z) = ∑' (z : ι), φ (f z)

theorem ContinuousLinearEquiv.hasSum {ι : Type u_5} {R : Type u_7} {R₂ : Type u_8} {M : Type u_9} {M₂ : Type u_10} [Semiring R] [Semiring R₂] [AddCommMonoid M] [Module R M] [AddCommMonoid M₂] [Module R₂ M₂] [TopologicalSpace M] [TopologicalSpace M₂] {σ : R →+* R₂} {σ' : R₂ →+* R} [RingHomInvPair σ σ'] [RingHomInvPair σ' σ] {f : ι → M} (e : M ≃SL[σ] M₂) {y : M₂} : HasSum (fun (b : ι) => e (f b)) y ↔ HasSum f (e.symm y)

Applying a continuous linear map commutes with taking an (infinite) sum.

theorem ContinuousLinearEquiv.hasSum' {ι : Type u_5} {R : Type u_7} {R₂ : Type u_8} {M : Type u_9} {M₂ : Type u_10} [Semiring R] [Semiring R₂] [AddCommMonoid M] [Module R M] [AddCommMonoid M₂] [Module R₂ M₂] [TopologicalSpace M] [TopologicalSpace M₂] {σ : R →+* R₂} {σ' : R₂ →+* R} [RingHomInvPair σ σ'] [RingHomInvPair σ' σ] {f : ι → M} (e : M ≃SL[σ] M₂) {x : M} : HasSum (fun (b : ι) => e (f b)) (e x) ↔ HasSum f x

Applying a continuous linear map commutes with taking an (infinite) sum.

theorem ContinuousLinearEquiv.summable {ι : Type u_5} {R : Type u_7} {R₂ : Type u_8} {M : Type u_9} {M₂ : Type u_10} [Semiring R] [Semiring R₂] [AddCommMonoid M] [Module R M] [AddCommMonoid M₂] [Module R₂ M₂] [TopologicalSpace M] [TopologicalSpace M₂] {σ : R →+* R₂} {σ' : R₂ →+* R} [RingHomInvPair σ σ'] [RingHomInvPair σ' σ] {f : ι → M} (e : M ≃SL[σ] M₂) : (Summable fun (b : ι) => e (f b)) ↔ Summable f

theorem ContinuousLinearEquiv.tsum_eq_iff {ι : Type u_5} {R : Type u_7} {R₂ : Type u_8} {M : Type u_9} {M₂ : Type u_10} [Semiring R] [Semiring R₂] [AddCommMonoid M] [Module R M] [AddCommMonoid M₂] [Module R₂ M₂] [TopologicalSpace M] [TopologicalSpace M₂] {σ : R →+* R₂} {σ' : R₂ →+* R} [RingHomInvPair σ σ'] [RingHomInvPair σ' σ] [T2Space M] [T2Space M₂] {f : ι → M} (e : M ≃SL[σ] M₂) {y : M₂} : ∑' (z : ι), e (f z) = y ↔ ∑' (z : ι), f z = e.symm y

theorem ContinuousLinearEquiv.map_tsum {ι : Type u_5} {R : Type u_7} {R₂ : Type u_8} {M : Type u_9} {M₂ : Type u_10} [Semiring R] [Semiring R₂] [AddCommMonoid M] [Module R M] [AddCommMonoid M₂] [Module R₂ M₂] [TopologicalSpace M] [TopologicalSpace M₂] {σ : R →+* R₂} {σ' : R₂ →+* R} [RingHomInvPair σ σ'] [RingHomInvPair σ' σ] [T2Space M] [T2Space M₂] {f : ι → M} (e : M ≃SL[σ] M₂) : e (∑' (z : ι), f z) = ∑' (z : ι), e (f z)

abbrev AddAction.automorphize.match_1 {α : Type u_2} {β : Type u_1} [AddGroup α] [AddAction α β] (b₁ : β) (b₂ : β) (motive : b₁ ≈ b₂ → Prop) : ∀ (h : b₁ ≈ b₂), (∀ (a : α) (ha : a +ᵥ b₂ = b₁), motive ⋯) → motive h

Equations

• ⋯ = ⋯

noncomputable def AddAction.automorphize {α : Type u_1} {β : Type u_2} {M : Type u_11} [TopologicalSpace M] [AddCommMonoid M] [AddGroup α] [AddAction α β] (f : β → M) : Quotient (AddAction.orbitRel α β) → M

Given an additive group α acting on a type β, and a function f : β → M, we automorphize f to a function β ⧸ α → M by summing over α orbits, b ↦ ∑' (a : α), f(a • b).

Equations

• AddAction.automorphize f = Quotient.lift (fun (b : β) => ∑' (a : α), f (a +ᵥ b)) ⋯

theorem AddAction.automorphize.proof_1 {α : Type u_2} {β : Type u_1} {M : Type u_3} [TopologicalSpace M] [AddCommMonoid M] [AddGroup α] [AddAction α β] (f : β → M) (b₁ : β) (b₂ : β) : b₁ ≈ b₂ → (fun (b : β) => ∑' (a : α), f (a +ᵥ b)) b₁ = (fun (b : β) => ∑' (a : α), f (a +ᵥ b)) b₂

noncomputable def MulAction.automorphize {α : Type u_1} {β : Type u_2} {M : Type u_11} [TopologicalSpace M] [AddCommMonoid M] [Group α] [MulAction α β] (f : β → M) : Quotient (MulAction.orbitRel α β) → M

Given a group α acting on a type β, and a function f : β → M, we "automorphize" f to a function β ⧸ α → M by summing over α orbits, b ↦ ∑' (a : α), f(a • b).

Equations

• MulAction.automorphize f = Quotient.lift (fun (b : β) => ∑' (a : α), f (a • b)) ⋯

theorem MulAction.automorphize_smul_left {α : Type u_1} {β : Type u_2} {M : Type u_11} [TopologicalSpace M] [AddCommMonoid M] [T2Space M] {R : Type u_12} [DivisionRing R] [Module R M] [ContinuousConstSMul R M] [Group α] [MulAction α β] (f : β → M) (g : Quotient (MulAction.orbitRel α β) → R) : MulAction.automorphize (g ∘ Quotient.mk' • f) = g • MulAction.automorphize f

Automorphization of a function into an R-Module distributes, that is, commutes with the R-scalar multiplication.

theorem AddAction.automorphize_smul_left {α : Type u_1} {β : Type u_2} {M : Type u_11} [TopologicalSpace M] [AddCommMonoid M] [T2Space M] {R : Type u_12} [DivisionRing R] [Module R M] [ContinuousConstSMul R M] [AddGroup α] [AddAction α β] (f : β → M) (g : Quotient (AddAction.orbitRel α β) → R) : AddAction.automorphize (g ∘ Quotient.mk' • f) = g • AddAction.automorphize f

Automorphization of a function into an R-Module distributes, that is, commutes with the R-scalar multiplication.

noncomputable def QuotientAddGroup.automorphize {M : Type u_11} [TopologicalSpace M] [AddCommMonoid M] {G : Type u_13} [AddGroup G] {Γ : AddSubgroup G} (f : G → M) : G ⧸ Γ → M

Given a subgroup Γ of an additive group G, and a function f : G → M, we automorphize f to a function G ⧸ Γ → M by summing over Γ orbits, g ↦ ∑' (γ : Γ), f(γ • g).

Equations

• QuotientAddGroup.automorphize f = AddAction.automorphize f

noncomputable def QuotientGroup.automorphize {M : Type u_11} [TopologicalSpace M] [AddCommMonoid M] {G : Type u_13} [Group G] {Γ : Subgroup G} (f : G → M) : G ⧸ Γ → M

Given a subgroup Γ of a group G, and a function f : G → M, we "automorphize" f to a function G ⧸ Γ → M by summing over Γ orbits, g ↦ ∑' (γ : Γ), f(γ • g).

Equations

• QuotientGroup.automorphize f = MulAction.automorphize f

theorem QuotientGroup.automorphize_smul_left {M : Type u_11} [TopologicalSpace M] [AddCommMonoid M] [T2Space M] {R : Type u_12} [DivisionRing R] [Module R M] [ContinuousConstSMul R M] {G : Type u_13} [Group G] {Γ : Subgroup G} (f : G → M) (g : G ⧸ Γ → R) : QuotientGroup.automorphize (g ∘ Quotient.mk' • f) = g • QuotientGroup.automorphize f

Automorphization of a function into an R-Module distributes, that is, commutes with the R-scalar multiplication.

theorem QuotientAddGroup.automorphize_smul_left {M : Type u_11} [TopologicalSpace M] [AddCommMonoid M] [T2Space M] {R : Type u_12} [DivisionRing R] [Module R M] [ContinuousConstSMul R M] {G : Type u_13} [AddGroup G] {Γ : AddSubgroup G} (f : G → M) (g : G ⧸ Γ → R) : QuotientAddGroup.automorphize (g ∘ Quotient.mk' • f) = g • QuotientAddGroup.automorphize f

Automorphization of a function into an R-Module distributes, that is, commutes with the R-scalar multiplication.