Uniqueness of Hahn-Banach extension and related norm-1 projections in dual spaces

Abstract

In this paper we study two properties viz. property-U and property-SU of a subspace Y of a Banach space which correspond to the uniqueness of the Hahn-Banach extension of each linear functional in Y* and in addition to that this association forms a linear operator of norm-1 from Y* to X*. It is proved that, under certain geometric assumptions on X, Y, Z these properties are stable with respect to the injective tensor product; Y has property-U (SU) in Z if and only if X Y has property-U (SU) in X Z. We prove that when X* has the Radon-Nikodym Property for 1<p< ∞, Lp(μ, Y) has property-U (property-SU) in Lp(μ, X) if and only if Y is so in X. We show that if Z⊂eq Y⊂eq X, where Y has property-U (SU) in X then Y/Z has property-U (SU) in X/Z. On the other hand Y has property-SU in X if Y/Z has property-SU in X/Z and Z (⊂eq Y) is an M-ideal in X. It is observed that a smooth Banach space of dimension >3 is a Hilbert space if and only if for any two subspaces Y, Z with property-SU in X, Y+Z has property-SU in X whenever Y+Z is closed. We characterize all hyperplanes in c0 which have property-SU.