Pontryagin Duality for Spaces of Continuous Functions

This paper considers the space Y s C T, X of all continuous and bounded functions from a topological space T to a complex normed space X with the sup Ž . norm. The extremal structure of the closed unit ball B Y in Y has been intensively studied when X is strictly convex, that is, in terms of its uni

b ## Ž . gies are analyzed such as bounded sets, denseness of C X m E, the b Mackey property, continuous functionals, etc. Also, the dual of these locally convex spaces and the relation of it to spaces of vector-measures are analyzed.

It is shown that if a separable real Banach space X admits a separating analytic Ž Ž . function with an additional condition property K , concerning uniform behaviour . of radii of convergence then every uniformly continuous mapping on X into any real Banach space Y can be approximated by analytic o

A closed nonvoid subset Z of a Banach space X is called antiproximinal if no point outside Z has a nearest point in Z. The aim of the present paper is to prove that, for a compact Hausdorff space T and a real Banach space E, the Banach space C T E , of all continuous functions defined on T and with