Pointwise differentiability of higher order for sets
Abstract
The present paper develops two concepts of pointwise differentiability of higher order for arbitrary subsets of Euclidean space defined by comparing their distance functions to those of smooth submanifolds. Results include that differentials are Borel functions, higher order rectifiability of the set of differentiability points, and a Rademacher result. One concept is characterised by a limit procedure involving inhomogeneously dilated sets. The original motivation to formulate the concepts stems from studying the support of stationary integral varifolds. In particular, strong pointwise differentiability of every positive integer order is shown at almost all points of the intersection of the support with a given plane.
Cite
@article{arxiv.1603.08587,
title = {Pointwise differentiability of higher order for sets},
author = {Ulrich Menne},
journal= {arXiv preprint arXiv:1603.08587},
year = {2019}
}
Comments
Description of subsequent work added to the introduction, references and affiliations updated, typographical corrections made; 34 pages