Lipschitz free p-spaces for 0<p<1

Abstract

This paper initiates the study of the structure of a new class of p-Banach spaces, 0<p<1, namely the Lipschitz free p-spaces (alternatively called Arens-Eells p-spaces) Fp(M) over p-metric spaces. We systematically develop the theory and show that some results hold as in the case of p=1, while some new interesting phenomena appear in the case 0<p<1 which have no analogue in the classical setting. For the former, we, e.g., show that the Lipschitz free p-space over a separable ultrametric space is isomorphic to p for all 0<p 1, or that p isomorphically embeds into Fp(M) for any p-metric space M. On the other hand, solving a problem by the first author and N. Kalton, there are metric spaces N⊂ M such that the natural embedding from Fp(N) to Fp(M) is not an isometry.