Asymptotic analysis of a boundary-value problem in a thin cascade domain with a local joint

Abstract

A nonuniform Neumann boundary-value problem is considered for the Poisson equation in a thin domain coinciding with two thin rectangles connected through a joint of diameter O(). A rigorous procedure is developed to construct the complete asymptotic expansion for the solution as the small parameter 0. Energetic and uniform pointwise estimates for the difference between the solution of the starting problem ( >0) and the solution of the corresponding limit problem ( =0) are proved, from which the influence of the geometric irregularity of the joint is observed.