Weak*-sequential properties of Johnson-Lindenstrauss spaces

Abstract

A Banach space X is said to have Efremov's property (E) if every element of the weak*-closure of a convex bounded set C ⊂eq X* is the weak*-limit of a sequence in C. By assuming the Continuum Hypothesis, we prove that there exist maximal almost disjoint families of infinite subsets of N for which the corresponding Johnson-Lindenstrauss spaces enjoy (resp. fail) property (E). This is related to a gap in [A. Plichko, Three sequential properties of dual Banach spaces in the weak* topology, Topology Appl. 190 (2015), 93--98] and allows to answer (consistently) questions of Plichko and Yost.