Quantitative Reifenberg theorem for measures
Classical Analysis and ODEs
2025-03-25 v3 Analysis of PDEs
Differential Geometry
Abstract
We study generalizations of Reifenberg's Theorem for measures in under assumptions on the Jones' -numbers, which appropriately measure how close the support is to being contained in a subspace. Our main results, which holds for general measures without density assumptions, give effective measure bounds on away from a closed -rectifiable set with bounded Hausdorff measure. We show examples to see the sharpness of our results. Under further density assumptions one can translate this into a global measure bound and -rectifiable structure for . Applications include quantitative Reifenberg theorems on sets and discrete measures, as well as upper Ahlfor's regularity estimates on measures which satisfy -number estimates on all scales.
Cite
@article{arxiv.1612.08052,
title = {Quantitative Reifenberg theorem for measures},
author = {Nick Edelen and Aaron Naber and Daniele Valtorta},
journal= {arXiv preprint arXiv:1612.08052},
year = {2025}
}
Comments
70 pages