The Bramson delay in the non-local Fisher-KPP equation

Abstract

We consider the non-local Fisher-KPP equation modeling a population with individuals competing with each other for resources with a strength related to their distance, and obtain the asymptotics for the position of the invasion front starting from a localized population. Depending on the behavior of the competition kernel at infinity, the location of the front is either 2t - (3/2) t + O(1), as in the local case, or 2t - O(tβ) for some explicit β ∈ (0,1). Our main tools here are alocal-in-time Harnack inequality and an analysis of the linearized problem with a suitable moving Dirichlet boundary condition. Our analysis also yields, for any β∈(0,1), examples of Fisher-KPP type non-linearities f\β such that the front for the localFisher-KPP equation with reaction term f\β is at 2t - O(tβ).