On smooth interior approximation of Sets of Finite Perimeter

Abstract

In this paper, we prove that for any bounded set of finite perimeter ⊂ Rn, we can choose smooth sets Ek such that Ek → in L1 and align moregeneralapproximation i → ∞ P(Ei) P()+C1(n) Hn-1(∂ 1). alignIn the above 1 is the measure-theoretic interior of , P(·) denotes the perimeter functional on sets, and C1(n) is a dimensional constant. Conversely, we prove that for any sets Ek satisfying Ek → in L1, there exists a dimensional constant C2(n) such that the following inequality holds: align gap k → ∞ P(Ek) P()+ C2(n) Hn-1(∂ 1). align In particular, these results imply that for a bounded set of finite perimeter,align char* Hn-1(∂ 1)=0 align holds if and only if there exists a sequence of smooth sets Ek such that Ek , Ek → in L1 and P(Ek) → P().