A study on F-simultaneous approximative τ-compactness property in Banach spaces

Abstract

Vesel\'y (1997) studied Banach spaces that admit f-centers for finite subsets of the space. In this work, we introduce the concept of F-simultaneous approximative τ-compactness property (τ-F-SACP in short) for triplets (X, V,F), where X is a Banach space, V is a τ-closed subset of X, F is a subfamily of closed and bounded subsets of X, F is a collection of functions, and τ is the norm or weak topology on X. We characterize reflexive spaces with the Kadec-Klee property using triplets with τ-F-SACP. We investigate the relationship between τ-F-SACP and the continuity properties of the restricted f-center map. The study further examines τ-F-SACP in the context of CLUR spaces and explores various characterizations of τ-F-SACP, including connections to reflexivity, Fr\'echet smoothness, and the Kadec-Klee property.