Thickness of the unit sphere, 1-types, and the almost Daugavet property

Abstract

We study those Banach spaces X for which SX does not admit a finite -net consisting of elements of SX for any < 2. We give characterisations of this class of spaces in terms of 1-type sequences and in terms of the almost Daugavet property. The main result of the paper is: a separable Banach space X is isomorphic to a space from this class if and only if X contains an isomorphic copy of 1.