Reduced limit for semilinear boundary value problems with measure data

Abstract

We study boundary value problems for semilinear elliptic equations of the form - u+g u=μ in a smooth bounded domain ⊂ RN. Let \μn\ and \τn\ be sequences of measure in and ∂ respectively. Assume that there exists a solution un of the equation with μ=μn subject to boundary data τn. Further assume that the sequences of measures converge in a weak sense to μ and τ respectively and \un\ converges to u in L1(). In general u is not a solution of the boundary value problem with data (μ,τ). However there exist measures (μ*,τ*) such that u satisfies the equation with μ replaced by μ* and with u=τ* on the boundary. The pair (μ*,τ*) is called the reduced limit of the sequence \(μn,τn)\. We investigate the relation between the weak limit and the reduced limit and the dependence of the latter on the sequence.