On indecomposable sets with applications

Abstract

In this note we show the characteristic function of every indecomposable set F in the plane is BV equivalent to the characteristic function a closed set F, i.e. ||1F-1F||BV(R2)=0. We show by example this is false in dimension three and above. As a corollary to this result we show that for every ε>0 a set of finite perimeter S can be approximated by a closed subset Sε with finitely many indecomposable components and with the property that H1(∂M Sε ∂M S)=0 and ||1S-1Sε||BV(R2)<ε. We apply this corollary to give a short proof that locally quasiminimizing sets in the plane are BVl extension domains.