Characterizations of signed measures in the dual of BV and related isometric isomorphisms

Abstract

We characterize all (signed) measures in BVnn-1(Rn)*, where BVnn-1(Rn) is defined as the space of all functions u in Lnn-1(Rn) such that Du is a finite vector-valued measure. We also show that BVnn-1(Rn)* and BV(Rn)* are isometrically isomorphic, where BV(Rn) is defined as the space of all functions u in L1(Rn) such that Du is a finite vector-valued measure. As a consequence of our characterizations, an old issue raised in Meyers-Ziemer [MZ] is resolved by constructing a locally integrable function f such that f belongs to BV(Rn)* but |f| does not. Moreover, we show that the measures in BVnn-1(Rn)* coincide with the measures in W1,1(Rn)*, the dual of the homogeneous Sobolev space W1,1(Rn), in the sense of isometric isomorphism. For a bounded open set with Lipschitz boundary, we characterize the measures in the dual space BV0()*. One of the goals of this paper is to make precise the definition of BV0(), which is the space of functions of bounded variation with zero trace on the boundary of . We show that the measures in BV0()* coincide with the measures in W1,10()*. Finally, the class of finite measures in BV()* is also characterized.