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Function Space

$f(I)$ is the collection of all real-valued continuous functions defined on some interval $I$. $f^{(n)}(I)$ is the collection of all functions $\in f(I)$ with continuous $n$th Derivatives. A function space is a Topological Vector Space whose ``points'' are functions.

See also Functional, Functional Analysis, Operator

© 1996-9 Eric W. Weisstein