Logarithmic Bramson correction for multi-dimensional periodic Fisher-KPP equations

Abstract

We study the long time behavior of solutions of periodic Fisher-KPP type equations in Rn that arise from compactly supported initial data. We prove that propagation along a fixed direction e∈Sn-1 is completely determined by an associated minimizing direction e' which is unique and in a bijective correspondence with e. This correspondence allows us to determine the correct Bramson shift in higher dimensions and show that that the propagation along each e occurs asymptotically at the speed w*(e)t-n/2+1λ*(e')\,e· e' t+O(1).