Definition:Bounded Linear Transformation/Normed Vector Space
< Definition:Bounded Linear Transformation(Redirected from Definition:Bounded Linear Transformation on Normed Vector Space)
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Definition
Let $\struct {V, \norm \cdot_V}$ and $\struct {U, \norm \cdot_U}$ be normed vector spaces.
Let $A : V \to U$ be a linear transformation.
We say that $A$ is a bounded linear transformation if and only if:
- $\forall v \in V: \exists c > 0: \norm {A v}_U \le c \norm v_V$.
Also see
Sources
- 2020: James C. Robinson: Introduction to Functional Analysis ... (previous) ... (next) $11.1$: Bounded Linear Maps