English

Linear isoperimetric inequality for normal and integral currents in compact subanalytic sets

Analysis of PDEs 2020-12-07 v1

Abstract

The isoperimetric inequality for a smooth compact Riemannian manifold AA provides a positive c(A){\bf c}(A), so that for any k+1k+1 dimensional integral current S0S_0 in AA there exists an integral current S S in AA with S=S0\partial S=\partial S_0 and M(S)c(A)M(S)(k+1)/k{\bf M}(S)\leq {\bf c}(A){\bf M}(\partial S)^{(k+1)/k}. Although such an inequality still holds for any compact Lipschitz neighborhood retract AA, it may fail in case AA contains a single polynomial singularity. Here, replacing (k+1)/k(k+1)/k by 11, we find that a linear inequality M(S)c(A)M(S){\bf M}(S)\leq {\bf c}(A){\bf M}(\partial S) is valid for any compact algebraic, semi-algebraic, or even subanalytic set AA. In such a set, this linear inequality holds not only for integral currents, which have Z\boldsymbol{Z} coefficients, but also for normal currents having R\boldsymbol{R} coefficients and generally for normal flat chains with coefficients in any complete normed abelian group. A relative version for a subanalytic pair BAB\subset A is also true, and there are applications to variational and metric properties of subanalytic sets.

Keywords

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}
}
R2 v1 2026-06-23T20:44:10.490Z