Lipschitz mappings, metric differentiability, and factorization through metric trees
Metric Geometry
2022-03-21 v2 Classical Analysis and ODEs
Abstract
Given a Lipschitz map from a cube into a metric space, we find several equivalent conditions for to have a Lipschitz factorization through a metric tree. As an application we prove a recent conjecture of David and Schul. The techniques developed for the proof of the factorization result yield several other new and seemingly unrelated results. We prove that if is a Lipschitz mapping from an open set in onto a metric space , then the topological dimension of equals if and only if has positive -dimensional Hausdorff measure. We also prove an area formula for length-preserving maps between metric spaces, which gives, in particular, a new formula for integration on countably rectifiable sets in the Heisenberg group.
Keywords
Cite
@article{arxiv.2106.15763,
title = {Lipschitz mappings, metric differentiability, and factorization through metric trees},
author = {Behnam Esmayli and Piotr Hajłasz},
journal= {arXiv preprint arXiv:2106.15763},
year = {2022}
}