Gradient regularity for a class of elliptic obstacle problems
Abstract
We prove some regularity results for a priori bounded local minimizers of non-autonomous integral functionals of the form F(v,)=∫ F(x,Dv)dx, under the constraint v a.e. in , where is a fixed obstacle function. Assuming that the coefficients of the partial map x D F(x,) satisfy a suitable Sobolev regularity, we are able to obtain higher differentiability and Lipschitz continuity results for the local minimizers.
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