An elementary rectifiability lemma and some applications
Classical Analysis and ODEs
2023-08-15 v2 Analysis of PDEs
Differential Geometry
Abstract
We generalize a classical theorem of Besicovitch, showing that, for any positive integers , if is a Souslin set which is not --finite, then contains a purely unrectifiable closed set with . Therefore, if is a Souslin set with the property that every closed subset with finite measure is -rectifiable, then is -rectifiable. We also point out that this theorem holds in a suitable class of metric spaces. Our interest is motivated by recent studies of the structure of the singular sets of several objects in geometric analysis and we explain the usefulness of our lemma with some examples.
Cite
@article{arxiv.2307.02866,
title = {An elementary rectifiability lemma and some applications},
author = {Camillo De Lellis and Ian Fleschler},
journal= {arXiv preprint arXiv:2307.02866},
year = {2023}
}
Comments
The second version contains minor corrections, an additional general statement in a class of metric spaces, and an outline of the argument for its validity