One side James' Compactness Theorem

Abstract

We present some extensions of classical results that involve elements of the dual of Banach spaces, such as Bishop-Phelp's theorem and James' compactness theorem, but restricting to sets of functionals determined by geometrical properties. The main result, which answers a question posed by F. Delbaen, is the following: Let E be a Banach space such that (BE, ω) is convex block compact. Let A and B be bounded, closed and convex sets with distance d(A,B) > 0. If every x ∈ E with \[ (x,B) < ∈f(x,A) \] attains its infimum on A and its supremum on B, then A and B are both weakly compact. We obtain new characterizations of weakly compact sets and reflexive spaces, as well as a result concerning a variational problem in dual Banach spaces.