Nagata Dimension and Lipschitz Extensions Into Quasi-Banach Spaces

Abstract

Given two metric spaces N ⊂eq M in inclusion and 0<p≤ 1, we wish to determine the smallest constant tp ( N, M) such that any Lipschitz map f: N Z into any p-Banach space Z can be extended to a Lipschitz map f' : M Z satisfying Lip f' ≤ tp ( N, M)· Lip f. In this article, we prove that if N has finite Nagata dimension at most d with constant γ, then tp ( N, M) p γ · (d+1)1/p -1 · (d+2) for all 0<p≤ 1. We show that examples of spaces with finite Nagata dimension include doubling spaces, as well as minor-excluded metric graphs. We also establish that the constant tp ( N, M) generally increases as p approaches zero.