Convergence to a single wave in the Fisher-KPP equation

Abstract

We study the large time asymptotics of a solution of the Fisher-KPP reaction-diffusion equation, with an initial condition that is a compact perturbation of a step function. A well-known result of Bramson states that, in the reference frame moving as 2t - (3/2) t +x∞, the solution of the equation converges as t+∞ to a translate of the traveling wave corresponding to the minimal speed~c*=2. The constant x∞ depends on the initial condition u(0,x). The proof is elaborate, and based on probabilistic arguments. The purpose of this paper is to provide a simple proof based on PDE arguments.