Diameter two properties for spaces of Lipschitz functions

Abstract

We solve some open problems regarding diameter two properties within the class of Banach spaces of real-valued Lipschitz functions by using the de Leeuw transform. Namely, we show that: the diameter two property, the strong diameter two property, and the symmetric strong diameter two property are all different for these spaces of Lipschitz functions; the space Lip0(Kn) has the symmetric strong diameter two property for every n∈ N, including the case of n=2; every local norm-one Lipschitz function is a Daugavet point.

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