Regularity results for bounded solutions to obstacle problems with non-standard growth conditions
Abstract
In this paper we consider a class of obstacle problems of the type %equation* %∫<A(x, Du), D(-u)> \, 0∀ %∈ W1,q() s.t. %equation* equation* \∫f(x, Dv)\, \,:\, v∈ K()\ equation* where is the obstacle, K()=\v∈ u0+W1, p0(, ): v a.e. in \, with u0 ∈ W1,p() a fixed boundary datum, the class of the admissible functions and the integrand f(x, Dv) satisfies non standard (p,q)-growth conditions. \\ We prove higher differentiability results for bounded solutions of the obstacle problem under dimension-free conditions on the gap between the growth and the ellipticity exponents. Moreover, also the Sobolev assumption on the partial map x A(x, ) is independent of the dimension n and this, in some cases, allows us to manage coefficients in a Sobolev class below the critical one W1,n.
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