Regularity for the Dirichlet problem on BD

Abstract

We establish that the Dirichlet problem for convex linear growth functionals on BD, the functions of bounded deformation, gives rise to the same unconditional Sobolev and partial C1,α-regularity theory as presently available for the full gradient Dirichlet problem on BV. By Ornstein's Non-Inequality, BV is a proper subspace of BD, and full gradient techniques known from the BV-situation do not apply here. In particular, applying to all generalised minima (i.e., minima of a suitably relaxed problem) despite their non-uniqueness and reaching the ellipticity ranges known from the BV-case, this paper extends previous results by Kristensen and the author (Gmeineder, F.; Kristensen, J.: Sobolev regularity for convex functionals on BD. J. Calc. Var. (2019) 58:56) in an optimal way.