Litcius/Paper detail

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

Chiun‐Chang Lee, Zhi‐An Wang, Wen Yang

2020Nonlinearity24 citationsDOI

Abstract

Abstract This paper is concerned with the stationary problem of an aero-taxis system with physical boundary conditions proposed by Tuval et al (2005 Proc. Natl Acad. Sci . 102 2277–82) to describe the boundary layer formation in the air–fluid interface in any dimensions. By considering a special case where fluid is free, the stationary problem is essentially reduced to a singularly perturbed nonlocal semi-linear elliptic problem. Denoting the diffusion rate of oxygen by ɛ > 0, we show that the stationary problem admits a unique classical solution of boundary-layer profile as ɛ → 0, where the boundary-layer thickness is of order ɛ . When the domain is a ball, we find a refined asymptotic boundary layer profile up to the first-order approximation of ɛ 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.

Topics & Concepts

MathematicsBoundary layerBlasius boundary layerCurvatureMathematical analysisBoundary (topology)Boundary layer thicknessSingular perturbationBoundary layer controlBall (mathematics)Method of matched asymptotic expansionsFree boundary problemDomain (mathematical analysis)Boundary value problemGeometryMechanicsPhysicsMathematical Biology Tumor GrowthAdvanced Mathematical Modeling in EngineeringGas Dynamics and Kinetic Theory
Boundary-layer profile of a singularly perturbed nonlocal semi-linear problem arising in chemotaxis | Litcius