Hard Sard: Quantitative Implicit Function and Extension Theorems for Lipschitz Maps
Abstract
We prove a global implicit function theorem. In particular we show that any Lipschitz map (with -dim. image) can be precomposed with a bi-Lipschitz map such that will satisfy, when we restrict to a large portion of the domain , that is bi-Lipschitz in the first coordinate, and constant in the second coordinate. Geometrically speaking, the map distorts in a controlled manner, so that the fibers of are straightened out. Furthermore, our results stay valid when the target space is replaced by {\bf any metric space}. A main point is that our results are quantitative: the size of the set on which behavior is good is a significant part of the discussion. Our estimates are motivated by examples such as Kaufman's 1979 construction of a map from onto with rank everywhere. On route we prove an extension theorem which is of independent interest. We show that for any , any Lipschitz function gives rise to a large (in an appropriate sense) subset such that is bi-Lipschitz and may be extended to a bi-Lipschitz function defined on {\bf all} of . The most interesting case is the case . As a simple corollary, we show that -dimensional Ahlfors-David regular spaces lying in having big pieces of bi-Lipschitz images also have big pieces of big pieces of Lipschitz graphs in . This was previously known only for by a result of G. David and S. Semmes.
Cite
@article{arxiv.1105.4198,
title = {Hard Sard: Quantitative Implicit Function and Extension Theorems for Lipschitz Maps},
author = {Jonas Azzam and Raanan Schul},
journal= {arXiv preprint arXiv:1105.4198},
year = {2015}
}
Comments
75 pages. Keywords: Implicit function theorem, Sard's Theorem, bi-Lipschitz Extension, Reifenberg flat. V2 small modifications after referee comments. V3 typo fixed. To appear in GAFA