A semilinear elliptic equation with a mild singularity at u=0: existence and homogenization

Abstract

In this paper we consider semilinear elliptic equations with singularities, whose prototype is the following equation* cases - div \,A(x) D u = f(x)g(u)+l(x)& in \; ,\\ u = 0 & on \; ∂ ,\\ cases equation* where is an open bounded set of RN,\, N≥ 1, A∈ L∞()N× N is a coercive matrix, g:[0,+∞)→ [0,+∞] is continuous, and 0≤ g(s)≤ 1sγ+1 ∀ s>0, with 0<γ≤ 1 and f,l ∈ Lr(), r=2NN+2 if N≥ 3, r>1 if N=2, r=1 if N=1, f(x), l(x)≥ 0 a.e. x ∈ . We prove the existence of at least one nonnegative solution and a stability result; moreover uniqueness is also proved if g(s) is nonincreasing or "almost nonincreasing". Finally, we study the homogenization of these equations posed in a sequence of domains ε obtained by removing many small holes from a fixed domain .