Asymptotic stability of the critical Fisher-KPP front using pointwise estimates

Abstract

We propose a simple alternative proof of a famous result of Gallay regarding the nonlinear asymptotic stability of the critical front of the Fisher-KPP equation which shows that perturbations of the critical front decay algebraically with rate t-3/2 in a weighted L∞ space. Our proof is based on pointwise semigroup methods and the key remark that the faster algebraic decay rate t-3/2 is a consequence of the lack of an embedded zero of the Evans function at the origin for the linearized problem around the critical front.