An atomic decomposition for functions of bounded variation

Abstract

In this paper, we give a decomposition of the gradient measure Du of an arbitrary function of bounded variation u into a sum of atoms μ=DF, where F is a set of finite perimeter. The atoms further satisfy the support, cancellation, normalization, and size conditions: For each μ, there exists a cube Q such that *suppμ⊂ Q, μ(Q)=0, |μ|(Q)≤ 1, and, denoting by pt the heat kernel in Rd, \[ x ∈ Rd, t>0 |t1/2 pt μ (x)| ≤ 1l(Q)d-1. \] Our proof relies on a sampling of the coarea formula and a new boxing identity. We present several consequences of this result, including Sobolev inequalities, dimension estimates, and trace inequalities.