An existence result for a nonlinear transmission problems

Abstract

Let o and i be open bounded subsets of Rn of class C1,α such that the closure of i is contained in o. Let fo be a function in C1,α(∂o) and let F and G be continuous functions from ∂i×R to R. By exploiting an argument based on potential theory and on the Leray-Schauder principle we show that under suitable and completely explicit conditions on F and G there exists at least one pair of continuous functions (uo, ui) such that \[ \ arrayll uo=0&in oi\,,\\ ui=0&in i\,,\\ uo(x)=fo(x)&for all x∈∂o\,,\\ uo(x)=F(x,ui(x))&for all x∈∂i\,,\\ i·∇ uo(x)-i·∇ ui(x)=G(x,ui(x))&for all x∈∂i\,, array . \] where the last equality is attained in certain weak sense. In a simple example we show that such a pair of functions (uo, ui) is in general neither unique nor local unique. If instead the fourth condition of the problem is obtained by a small nonlinear perturbation of a homogeneous linear condition, then we can prove the existence of at least one classical solution which is in addition locally unique.