On Hahn-Banach smoothness and related properties in Banach spaces

Abstract

In this paper, we study several variants of Hahn-Banach smoothness, viz., property-(SU)/(HB)/(wU), where property-(SU) and property-(HB) are stronger notions and property-(wU) is a weaker notion of Hahn-Banach smoothness. We characterize property-(wU) and property-(HB). It is observed that L1(μ) has property-(wU) in L1(μ,(R2,\|.\|2)) but it does not have property-(U) in L1(μ,(R2,\|.\|2)) for a non-atomic measure μ. We derive a sufficient condition when property-(wU) is equivalent to property-(U) of a subspace. It is observed that these properties are separably determined. Finally, finite-dimensional and finite co-dimensional subspaces of c0, p (1≤ p<∞) having these properties are characterized.