On Hahn-Banach smoothness of L1-preduals and related w*-w point of continuity of unit balls of dual spaces

Abstract

This article aims to examine the Hahn-Banach smoothness of Banach spaces and its connections to various geometrical aspects. We examine the circumstances that allow linear functionals to have unique norm-preserving extensions, with particular attention to the behavior of these properties in L1-preduals and in spaces of affine continuous functions. Banach spaces which are L1-preduals and also Hahn-Banach smooth are completely characterized. It is demonstrated that if X is an M-embedded space then X* admits a predual which is not weakly Hahn-Banach smooth. It is derived that, when S is a compact convex set where each point in ext(S) is a limit point of ext(S) and also represents a split face, no subspace of A(S) retains the property-(wU) in A(S)**. Furthermore, when X=C0(L), in the context of a locally compact Hausdorff space L, the continuity of the identity mapping I:(BX*,w*) (BX*,w) in ext (BX*) significantly influences the subspaces of X that have unique extension property in X**. Collectively, this study provides structural characterizations of specialized geometric property, so called Hahn-Banach smoothness, and offers solutions to some natural problems enlisted at the beginning that involve spaces that are L1-preduals and also spaces that are M-embedded.