Variational problems of splitting-type with mixed linear-superlinear growth conditions

Abstract

Variational problems of splitting-type with mixed linear-superlinear growth conditions are considered. In the twodimensional case the minimizing problem is given by \[ J [w] = ∫ [f1(∂1 w) + f2(∂2 w)] \,dx \] w.r.t. a suitable class of comparison functions. Here f1 is supposed to be a convex energy density with linear growth, f2 is supposed to be of superlinear growth, for instance to be given by a N-function or just bounded from below by a N-function. One motivation for this kind of problem located between the well known splitting-type problems of superlinear growth and the splitting-type problems with linear growth (recently considered in [1]) is the link to mathematical problems in plasticity (compare [2]). Here we prove results on the appropriate way of relaxation including approximation procedures, duality, existence and uniqueness of solutions as well as some new higher integrability results.