The spreading speed of solutions of the non-local Fisher-KPP equation

Abstract

We consider the Fisher-KPP equation with a non-local interaction term. Hamel and Ryzhik showed that in solutions of this equation, the front location at a large time t is 2 t +o(t). We study the asymptotics of the second order term in the front location. If the interaction kernel φ(x) decays sufficiently fast as x→ ∞ then this term is given by -32 2 t +o( t), which is the same correction as found by Bramson for the local Fisher-KPP equation. However, if φ has a heavier tail then the second order term is -tβ +o(1), where β ∈ (0,1) depends on the tail of φ. The proofs are probabilistic, using a Feynman-Kac formula. Since solutions of the non-local Fisher-KPP equation do not obey the maximum principle, the proofs differ from those in Bramson's work, although some of the ideas used are similar.