Precise asymptotics for Fisher-KPP fronts

Abstract

We consider the one-dimensional Fisher-KPP equation with step-like initial data. Nolen, Roquejoffre, and Ryzhik showed that the solution u converges at long time to a traveling wave φ at a position σ(t) = 2t - (3/2) t + α0- 3π/t, with error O(tγ-1) for any γ>0. With their methods, we find a refined shift σ(t) = σ(t) + μ* ( t)/t + α1/t such that in the frame moving with σ, the solution u satisfies u(t,x) = φ (x) + (x)/t + O(tγ-3/2) for a certain profile independent of initial data. The coefficient α1 depends on initial data, but μ* = 9(5-6 2)/8 is universal, and agrees with a finding of Berestycki, Brunet, and Derrida in a closely-related problem. Furthermore, we predict the asymptotic forms of σ and u to arbitrarily high order.