Sharp large time behaviour in N -dimensional Fisher-KPP equations
Sharp large time behaviour in N -dimensional Fisher-KPP equations
We study the large time behaviour of the Fisher-KPP equation $\partial$ t u = $\Delta$u + u -- u 2 in spatial dimension N , when the initial datum is compactly supported. We prove the existence of a Lipschitz function s of the unit sphere, such that u(t, x) converges, …