A study on coreflexive Banach Spaces

Abstract

In this paper, we study non-reflexive Banach spaces X for which the quotient space X**/X is reflexive. Such spaces were first introduced by James R.~Clark, where they were called coreflexive spaces. We show that a space X is coreflexive if and only if every separable subspace Y⊂eq X is coreflexive, provided that X is w*-sequently dense in its bidual X**. We show that coreflexive spaces are stable under p-sum for 1<p<∞. We show that if X is a coreflexive space such that X**/X is separable, then the space of Bochner p-integrable functions, Lp(μ,X) is coreflexive for 1<p<∞. We conclude by providing an alternative proof of the fact, in a quasi-reflexive space X, w-PC's of the unit ball X1 continue to have the same property in all the higher even-order dual unit balls of X.