Linear isoperimetric inequality for normal and integral currents in compact subanalytic sets
Abstract
The isoperimetric inequality for a smooth compact Riemannian manifold provides a positive , so that for any dimensional integral current in there exists an integral current in with and . Although such an inequality still holds for any compact Lipschitz neighborhood retract , it may fail in case contains a single polynomial singularity. Here, replacing by , we find that a linear inequality is valid for any compact algebraic, semi-algebraic, or even subanalytic set . In such a set, this linear inequality holds not only for integral currents, which have coefficients, but also for normal currents having coefficients and generally for normal flat chains with coefficients in any complete normed abelian group. A relative version for a subanalytic pair is also true, and there are applications to variational and metric properties of subanalytic sets.
Cite
@article{arxiv.2012.02667,
title = {Linear isoperimetric inequality for normal and integral currents in compact subanalytic sets},
author = {Thierry De Pauw and Robert Hardt},
journal= {arXiv preprint arXiv:2012.02667},
year = {2020}
}