Global existence for a free boundary problem of Fisher-KPP type

Abstract

Motivated by the study of branching particle systems with selection, we establish global existence for the solution (u,μ) of the free boundary problem \[ cases ∂t u =∂2x u +u & for t>0 and x>μt,\\ u(x,t)=1 &for t>0 and x ≤ μt, \\ ∂x u(μt,t)=0 & for t>0, \\ u(x,0)=v(x) &for x∈ R, cases \] when the initial condition v:R[0,1] is non-increasing with v(x) 0 as x ∞ and v(x) 1 as x -∞. We construct the solution as the limit of a sequence (un)n 1, where each un is the solution of a Fisher-KPP equation with same initial condition, but with a different non-linear term. Recent results of De Masi et al.~DeMasi2017a show that this global solution can be identified with the hydrodynamic limit of the so-called N-BBM, i.e. a branching Brownian motion in which the population size is kept constant equal to N by killing the leftmost particle at each branching event.