KPP fronts in shear flows with cut-off reaction rates

Abstract

We consider the effect of a shear flow which has, without loss of generality, a zero mean flow rate, on a Kolmogorov--Petrovskii--Piscounov (KPP) type model in the presence of a discontinuous cut-off at concentration u = uc. Its structure and speed of propagation depends on A (the strength of the flow relative to the propagation speed in the absence of advection) and B (the square of the front thickness relative to the channel width). We use matched asymptotic expansions to approximate the propagation speed in the three natural cases A ∞, A 0 and A=O(1), with particular associated orderings on B, whilst uc∈(0,1) remains fixed. In all the cases that we consider, the shear flow enhances the speed of propagation in a manner that is similar to the case without cut-off (uc=0). We illustrate the theory by evaluating expressions (either directly or through numerical integration) for the particular cases of the plane Couette and Poiseuille flows.