Delta-points and their implications for the geometry of Banach spaces

Abstract

We show that the Lipschitz-free space with the Radon--Nikod\'ym property and a Daugavet point recently constructed by Veeorg is in fact a dual space isomorphic to 1. Furthermore, we answer an open problem from the literature by showing that there exists a superreflexive space, in the form of a renorming of 2, with a -point. Building on these two results, we are able to renorm every infinite-dimensional Banach space with a -point. Next, we establish powerful relations between existence of -points in Banach spaces and their duals. As an application, we obtain sharp results about the influence of -points for the asymptotic geometry of Banach spaces. In addition, we prove that if X is a Banach space with a shrinking k-unconditional basis with k < 2, or if X is a Hahn--Banach smooth space with a dual satisfying the Kadets--Klee property, then X and its dual X* fail to contain -points. In particular, we get that no Lipschitz-free space with a Hahn--Banach smooth predual contains -points. Finally we present a purely metric characterization of the molecules in Lipschitz-free spaces that are -points, and we solve an open problem about representation of finitely supported -points in Lipschitz-free spaces.