Global higher integrability for minimisers of convex obstacle problems with (p,q)-growth
Abstract
We prove global W1,q(,RN)-regularity for minimisers of F(u)=∫ F(x,Du)d x satisfying u≥ for a given Sobolev obstacle . W1,q(,Rm) regularity is also proven for minimisers of the associated relaxed functional. Our main assumptions on F(x,z) are a uniform α-H\"older continuity assumption in x and natural (p,q)-growth conditions in z with q<(n+α)pn. In the autonomous case F F(z) we can improve the gap to q<npn-1, a result new even in the unconstrained case.
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