On the approximation of finite perimeter sets

Abstract

We prove that if ⊂eqRN is a set with finite perimeter with HN-1(∂ ∂* )=0, then any set of finite perimeter E⊂eqRN can be approximated by a polyhedral or smooth bounded set F in such a way that both the total perimeter of E and the perimeter of E inside are approximated by those of F, and the boundary of F has negligible intersection with the boundary of . In addition, we address the approximation for perimeter and volume with densities, and we present counterexamples illustrating the sharpness of our assumptions. Our constructions rely on a technical result that replaces E with a set F which agrees with E and has the same boundary inside , while sharing no common boundary with , and does so without substantially altering the perimeter or the volume of the original set.

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