On second order elliptic equations with a small parameter

Abstract

The Neumann problem with a small parameter (1εL0+L1)uε(x)=f(x) for x∈ G, .∂ uε∂ γε(x)|∂ G=0 is considered in this paper. The operators L0 and L1 are self-adjoint second order operators. We assume that L0 has a non-negative characteristic form and L1 is strictly elliptic. The reflection is with respect to inward co-normal unit vector γε(x). The behavior of ε 0uε(x) is effectively described via the solution of an ordinary differential equation on a tree. We calculate the differential operators inside the edges of this tree and the gluing condition at the root. Our approach is based on an analysis of the corresponding diffusion processes.