Boundary-layer profile of a singularly perturbed non-local semi-linear problem arising in chemotaxis

Abstract

This paper is concerned with the following singularly perturbed non-local semi-linear problem equation h cases 2 u=m∫eudxu eu &in~,\\ u= u0~&on~∂, cases equation which corresponds to the stationary problem of a chemotaxis system describing the aerobic bacterial movement, where is a smooth bounded domain in RN (N≥ 1), , m and u0 are positive constants. We show that the problem h admits a unique classical solution which is of boundary-layer profile as 0, where the boundary-layer thickness is of order . When =BR(0) is a ball with radius R>0, we find a refined asymptotic boundary layer profile up to the first-order expansion of by which we find that the slope of the layer profile in the immediate vicinity of the boundary decreases with respect to (w.r.t.) the curvature while the boundary-layer thickness increases w.r.t. the curvature.