Lipschitz extensions into p-Banach spaces, and canonical embeddings of Lipschitz-free p-spaces for 0<p<1

Abstract

We show that inclusions of p-metric spaces always produce genuine linear embeddings at the level of Lipschitz-free p-spaces. More precisely, for every 0<p<1 and every inclusion N⊂ M of p-metric spaces, the canonical map from Fp(N) into Fp( M) is always an isomorphic embedding, as it plainly happens for p=1. Our proof relies on a versatile extension procedure for p-Banach-valued Lipschitz maps, allowing us to control the geometry of canonical molecules and uncover a rigidity principle governing the structure of Lipschitz free p-spaces. As an application, we prove that, given 0<p<q 1, the natural envelope map from the Lipschitz-free p-space Fp( M) to its q-Banach envelope Fq( M) is one-to-one. These results give positive answers to two foundational questions that were originally raised by Kalton in [Lipschitz structure of quasi-Banach spaces, Israel J. Math. 170 (2009), 317-335], and provide tools for furthering the understanding of subspace structures, hereditary properties, and geometric invariants in Lipschitz-free p-spaces.

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