A -weak Grothendieck compactness principle

Abstract

For 0≤slant ≤slant ω1, we define the notion of -weakly precompact and -weakly compact sets in Banach spaces and prove that a set is -weakly precompact if and only if its weak closure is -weakly compact. We prove a quantified version of Grothendieck's compactness principle and the characterization of Schur spaces obtained by Dowling et al. For 0≤slant ≤slant ω1, we prove that a Banach space X has the -Schur property if and only if every -weakly compact set is contained in the closed, convex hull of a weakly null (equivalently, norm null) sequence.