Continuous additive maps are ℝ
-linear #
In this file we prove that a continuous map f : E →+ F
between two topological vector spaces
over ℝ
is ℝ
-linear
theorem
map_real_smul
{E : Type u_1}
[AddCommGroup E]
[Module ℝ E]
[TopologicalSpace E]
[ContinuousSMul ℝ E]
{F : Type u_2}
[AddCommGroup F]
[Module ℝ F]
[TopologicalSpace F]
[ContinuousSMul ℝ F]
[T2Space F]
{G : Type u_3}
[AddMonoidHomClass G E F]
(f : G)
(hf : Continuous ↑f)
(c : ℝ)
(x : E)
:
A continuous additive map between two vector spaces over ℝ
is ℝ
-linear.
def
AddMonoidHom.toRealLinearMap
{E : Type u_1}
[AddCommGroup E]
[Module ℝ E]
[TopologicalSpace E]
[ContinuousSMul ℝ E]
{F : Type u_2}
[AddCommGroup F]
[Module ℝ F]
[TopologicalSpace F]
[ContinuousSMul ℝ F]
[T2Space F]
(f : E →+ F)
(hf : Continuous ↑f)
:
Reinterpret a continuous additive homomorphism between two real vector spaces as a continuous real-linear map.
Equations
- One or more equations did not get rendered due to their size.
Instances For
@[simp]
theorem
AddMonoidHom.coe_toRealLinearMap
{E : Type u_1}
[AddCommGroup E]
[Module ℝ E]
[TopologicalSpace E]
[ContinuousSMul ℝ E]
{F : Type u_2}
[AddCommGroup F]
[Module ℝ F]
[TopologicalSpace F]
[ContinuousSMul ℝ F]
[T2Space F]
(f : E →+ F)
(hf : Continuous ↑f)
:
↑(AddMonoidHom.toRealLinearMap f hf) = ↑f
def
AddEquiv.toRealLinearEquiv
{E : Type u_1}
[AddCommGroup E]
[Module ℝ E]
[TopologicalSpace E]
[ContinuousSMul ℝ E]
{F : Type u_2}
[AddCommGroup F]
[Module ℝ F]
[TopologicalSpace F]
[ContinuousSMul ℝ F]
[T2Space F]
(e : E ≃+ F)
(h₁ : Continuous ↑e)
(h₂ : Continuous ↑(AddEquiv.symm e))
:
Reinterpret a continuous additive equivalence between two real vector spaces as a continuous real-linear map.
Equations
- One or more equations did not get rendered due to their size.
Instances For
instance
Real.isScalarTower
{E : Type u_1}
[AddCommGroup E]
[Module ℝ E]
[TopologicalSpace E]
[ContinuousSMul ℝ E]
[T2Space E]
{A : Type u_3}
[TopologicalSpace A]
[Ring A]
[Algebra ℝ A]
[Module A E]
[ContinuousSMul ℝ A]
[ContinuousSMul A E]
:
IsScalarTower ℝ A E
A topological group carries at most one structure of a topological ℝ
-module, so for any
topological ℝ
-algebra A
(e.g. A = ℂ
) and any topological group that is both a topological
ℝ
-module and a topological A
-module, these structures agree.