The diffusive competition model with a free boundary: Invasion of a superior or inferior competitor

Abstract

In this paper we consider the diffusive competition model consisting of an invasive species with density u and a native species with density v, in a radially symmetric setting with free boundary. We assume that v undergoes diffusion and growth in N, and u exists initially in a ball \r<h(0)\, but invades into the environment with spreading front \r=h(t)\, with h(t) evolving according to the free boundary condition h'(t)=-μ ur(t, h(t)), where μ>0 is a given constant and u(t,h(t))=0. Thus the population range of u is the expanding ball \r<h(t)\, while that for v is N. In the case that u is a superior competitor (determined by the reaction terms), we show that a spreading-vanishing dichotomy holds, namely, as t∞, either h(t)∞ and (u,v) (u*,0), or t∞ h(t)<∞ and (u,v) (0,v*), where (u*,0) and (0, v*) are the semitrivial steady-states of the system. Moreover, when spreading of u happens, some rough estimates of the spreading speed are also given. When u is an inferior competitor, we show that (u,v) (0,v*) as t∞.