Higher differentiability results for solutions to a class of non-homogeneouns elliptic problems under sub-quadratic growth conditions

Abstract

We prove a sharp higher differentiability result for local minimizers of functionals of the form F(w,)=∫[ F(x,Dw(x))-f(x)· w(x)]dx with non-autonomous integrand F(x,) which is convex with respect to the gradient variable, under p-growth conditions, with 1<p<2. The main novelty here is that the results are obtained assuming that the partial map x D F(x,) has weak derivatives in some Lebesgue space Lq and the datum f is assumed to belong to a suitable Lebesgue space Lr. We also prove that it is possible to weaken the assumption on the datum f and on the map x D F(x,), if the minimizers are assumed to be a priori bounded.