On the approximation of SBD functions and some applications

Abstract

Three density theorems for three suitable subspaces of SBD functions, in the strong BD topology, are proven. The spaces are SBD, SBDp∞, where the absolutely continuous part of the symmetric gradient is in Lp, with p>1, and SBDp, whose functions are in SBDp∞ and the jump set has finite Hn-1-measure. This generalises on the one hand the density result by [Chambolle, 2004-2005] and, on the other hand, extends in some sense the three approximation theorems in by [De Philippis, Fusco, Pratelli, 2017] for SBV, SBVp∞, SBVp spaces, obtaining also more regularity for the absolutely continuous part of the approximating functions. As application, the sharp version of two -convergence results for energies defined on SBD2 is derived.