Simultaneously continuous retraction and Bishop-Phelps-Bollob\'as type theorem

Abstract

We study the existence of a retraction from the dual space X* of a (real or complex) Banach space X onto its unit ball BX* which is uniformly continuous in norm topology and continuous in weak-* topology. Such a retraction is called a uniformly simultaneously continuous retraction. It is shown that if X has a normalized unconditional Schauder basis with unconditional basis constant 1 and X* is uniformly monotone, then a uniformly simultaneously continuous retraction from X* onto BX* exists. It is also shown that if \Xi\ is a family of separable Banach spaces whose duals are uniformly convex with moduli of convexity δi() such that ∈fi δi()>0 and X= [ Xi]c0 or X=[ Xi]_p for 1 p<∞, then a uniformly simultaneously continuous retraction exists from X* onto BX*. The relation between the existence of a uniformly simultaneously continuous retraction and the Bishsop-Phelps-Bollob\'as property for operators is investigated and it is proved that the existence of a uniformly simultaneously continuous retraction from X* onto its unit ball implies that a pair (X, C0(K)) has the Bishop-Phelps-Bollob\'as property for every locally compact Hausdorff spaces K. As a corollary, we prove that (C0(S), C0(K)) has the Bishop-Phelps-Bollob\'as property if C0(S) and C0(K) are the spaces of all real-valued continuous functions vanishing at infinity on locally compact metric space S and locally compact Hausdorff space K respectively.