Higher differentiability of solutions for a class of obstacle problems with variable exponents

Abstract

In this paper we prove a higher differentiability result for the solutions to a class of obstacle problems in the form equation* obst-def0 \∫ F(x,Dw) dx : w∈ K()\ equation* where ∈ W1,p(x)() is a fixed function called obstacle and K=\w ∈ W1,p(x)0()+u0: w \,\, a.e. in \ is the class of the admissible functions, for a suitable boundary value u0 . We deal with a convex integrand F which satisfies the p(x)-growth conditions equation*growth||p(x) F(x,) C(1+||p(x)), p(x)>1 equation*