Sharp interface limit of the Fisher-KPP equation when initial data have slow exponential decay

Abstract

We investigate the singular limit, as 0, of the Fisher equation ∂t u= u + -1u(1-u) in the whole space. We consider initial data with compact support plus perturbations with slow exponential decay. We prove that the sharp interface limit moves by a constant speed, which dramatically depends on the tails of the initial data. By performing a fine analysis of both the generation and motion of interface, we provide a new estimate of the thickness of the transition layers.