Banach spaces containing c0 and elements in the fourth dual

Abstract

A recent result of T.~Abrahamsen, P.~H\'ajek and S.~Troyanski states that a separable Banach space is almost square if and only if there exists h∈ SX**** such that \|x+h\|=\\|x\|,1\ for all x∈ X. The proof passes through a sequential version of being almost square which we call being sequentially almost square. In this article we study these conditions in the nonseparable setting. On one hand, we show that a Banach space X contains a copy of c0 if and only if there exists an equivalent renorming | · | on X for which there exists h∈ SX**** such that |x+h|=\|x|,1\ for every x∈ X. On the other hand, although it is unclear whether the aforementioned result of T.~Abrahamsen et al. holds in the nonseparable setting, we show that, under the existence of selective ultrafilters, if X is a sequentially almost square Banach space then there exists h∈ SX**** such that \|x+h\|=\\|x\|,1\ for all x∈ X.

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