Asymptotic geometry and delta-points

Abstract

We study Daugavet- and -points in Banach spaces. A norm one element x is a Daugavet-point (respectively a -point) if in every slice of the unit ball (respectively in every slice of the unit ball containing x) you can find another element of distance as close to 2 from x as desired. In this paper we look for criteria and properties ensuring that a norm one element is not a Daugavet- or -point. We show that asymptotically uniformly smooth spaces and reflexive asymptotically uniformly convex spaces do not contain -points. We also show that the same conclusion holds true for the James tree space as well as for its predual. Finally we prove that there exists a superreflexive Banach space with a Daugavet- or -point provided there exists such a space satisfying a weaker condition.