Daugavet points and -points in Lipschitz-free spaces

Abstract

We study Daugavet points and -points in Lipschitz-free Banach spaces. We prove that, if M is a compact metric space, then μ∈ S F(M) is a Daugavet point if, and only if, there is no denting point of B F(M) at distance strictly smaller than two from μ. Moreover, we prove that if x and y are connectable by rectifiable curves of lenght as close to d(x,y) as we wish, then the molecule mx,y is a -point. Some conditions on M which guarantee that the previous implication reverses are also obtained. As a consequence of our work, we show that Lipschitz-free spaces are natural examples of Banach spaces where we can guarantee the existence of -points which are not Daugavet points.