Puiseux asymptotic expansions for convection-dominated transport problems in thin graph-like networks: strong boundary interactions

Abstract

This article completes the study of the influence of the intensity parameter α in the boundary condition ∂_ u - u \, V· = α given on the boundary of a thin three-dimensional graph-like network consisting of thin cylinders that are interconnected by small domains (nodes) with diameters of order O(). Inside of the thin network a time-dependent convection-diffusion equation with high P\'eclet number of order O(-1) is considered. The novelty of this article is the case of α <1, which indicates a strong intensity of physical processes on the boundary, described by the inhomogeneity (the cases α =1 and α >1 were previously studied by the same authors). A complete Puiseux asymptotic expansion is constructed for the solution u as 0, i.e., when the diffusion coefficients are eliminated and the thin network shrinks into a graph. Furthermore, the corresponding uniform pointwise and energy estimates are proved, which provide an approximation of the solution with a given accuracy in terms of the parameter .