- categories: Functional analysis, Theorem
Every Linear Map from to is Continuous
Let denote either the field of real numbers or complex numbers . Suppose is a normed vector space over . Then, every linear map is continuous.
Explanation and Proof Outline
- Finite-Dimensional Domain: In the vector space , all norms are equivalent (see Equivalence of Norms in Fⁿ)
- Linearity and Continuity: To show continuity, we only need to show that is bounded. Since is linear, continuity at a single point (e.g., ) implies continuity everywhere.
- Boundedness of : Given the equivalence of norms in , there exists a constant such that: for all . This inequality shows that is bounded with respect to any norm on and hence is continuous.