On the divergence of the composition of irregular fields with BV functions

Abstract

We introduce a family of (nonlinear) pairing measures that ensure the validity of the divergence rule for composite functions B(x,u(x)), where B(·,t) is a bounded divergence-measure vector field, and u is a scalar function of bounded variation. The elements of the family depend on the choice of the pointwise representative of u on its jump set. Beyond the standard properties, such as the Coarea and Gauss-Green formulas on sets of finite perimeter, this flexibility allows us to characterize the pairings that ensure the lower semicontinuity of the corresponding functionals along sequences converging in L1 with controlled precise values. We show that these lower semicontinuous pairings arise as the relaxation of integral functionals defined in Sobolev spaces.