The wave speed of an FKPP equation with jumps via coordinated branching

Abstract

We consider a Fisher-KPP equation with nonlinear selection driven by a Poisson random measure. We prove that the equation admits a unique wave speed s> 0 given by s22 = ∫[0, 1] (1 + y)y R( d y) where R is the intensity of the impacts of the driving noise. Our arguments are based on upper and lower bounds via a quenched duality with a coordinated system of branching Brownian motions.