A stability result for elliptic equations with singular nonlinearity and its applications to homogenization problems

Abstract

We consider model semilinear elliptic equations of the type \[ cases - div (A(x) ∇ u) = f u- λ, u > 0 in \ , \\ u ∈ H01(), cases \] where is a bounded domain in RN, N 1, A ∈ L∞()N × N is a coercive matrix, 0 < λ 1 and f is a nonnegative function in L1loc(), or more generally, nonnegative Radon measure on . We discuss H1-stability of u under a minimal assumption on f. Additionally, we apply the result to homogenization problems.