The effect of an unfavorable region on the invasion process of a species

Abstract

To model a propagating phenomena through the environment with an unfavorable region, we consider a reaction diffusion equation with negative growth rate in the unfavorable region and bistable reaction outside of it. We study rigorously the influence of L, the width of the unfavorable region, on the propagation of solutions. It turns out that there exists a critical value L* depending only on the reaction term such that, when L<L*, spreading happens for any solution in the sense that it passes through the unfavorable region successfully and establish with minor defect in the region; when L=L*, spreading happens only for a species with large initial population, while residue happens for a population with small initial data, in the sense that the solution converges to a small steady state; when L>L* we have a trichotomy result: spreading/residue happens for a species with large/small initial population, but, for a species with medium-sized initial data, it can not pass through the region either and converges to a transition steady state.