Mosco-convergence of convex sets and unilateral problems for differential operators with lower order terms having natural growth

Abstract

We study the stability of solutions to a class of variational inequalities posed on obstacle-type convex sets, under Mosco-convergence. More precisely, for a fixed obstacle ∈ W01,p() L∞(), we consider u∈ W01,p() L∞() satisfying u≥ a.e. and A(u),v-u+∫H(x,u,∇ u)(v-u)≥ 0 for all v∈ W01,p() L∞() with v≥. Here, A is a Leray-Lions type operator, mapping W01,p() into its dual W-1, p'(), while H(x, u, D u) grows like |D u|p. Our main result establishes that the solutions are stable under Mosco-convergence of the constraint sets. This extends classical stability results to natural growth problems.