Boundary regularity and stability for spaces with Ricci bounded below
Abstract
This paper studies the structure and stability of boundaries in noncollapsed spaces, that is, metric-measure spaces with lower Ricci curvature bounded below. Our main structural result is that the boundary is homeomorphic to a manifold away from a set of codimension 2, and is rectifiable. Along the way we show effective measure bounds on the boundary and its tubular neighborhoods. These results are new even for Gromov-Hausdorff limits of smooth manifolds with boundary, and require new techniques beyond those needed to prove the analogous statements for the regular set, in particular when it comes to the manifold structure of the boundary . The key local result is an -regularity theorem, which tells us that if a ball is sufficiently close to a half space in the Gromov-Hausdorff sense, then is biH\"older to an open set of . In particular, is itself homeomorphic to near . Further, the boundary is rectifiable and the boundary measure is Ahlfors regular on with volume close to the Euclidean volume. Our second collection of results involve the stability of the boundary with respect to noncollapsed mGH convergence . Specifically, we show a boundary volume convergence which tells us that the Hausdorff measures on the boundaries converge to the limit Hausdorff measure on . We will see that a consequence of this is that if the are boundary free then so is .
Cite
@article{arxiv.2011.08383,
title = {Boundary regularity and stability for spaces with Ricci bounded below},
author = {Elia Bruè and Aaron Naber and Daniele Semola},
journal= {arXiv preprint arXiv:2011.08383},
year = {2020}
}