Asymptotic analysis a perturbed Robin problem in a planar domain

Abstract

We consider a perforated domain (ε) of R2 with a small hole of size ε and we study the behavior of the solution of a mixed Neumann-Robin problem in (ε) as the size ε of the small hole tends to 0. In addition to the geometric degeneracy of the problem, the ε-dependent Robin condition may degenerate into a Neumann condition for ε=0 and the Robin datum may diverge to infinity. Our goal is to analyze the asymptotic behavior of the solutions to the problem as ε tends to 0 and understand how the boundary condition affects the behavior of the solutions when ε is close to 0.