A diffusive Fisher-KPP equation with free boundaries and time-periodic advections

Abstract

We consider a reaction-diffusion-advection equation of the form: ut=uxx-β(t)ux+f(t,u) for x∈ (g(t),h(t)), where β(t) is a T-periodic function representing the intensity of the advection, f(t,u) is a Fisher-KPP type of nonlinearity, T-periodic in t, g(t) and h(t) are two free boundaries satisfying Stefan conditions. This equation can be used to describe the population dynamics in time-periodic environment with advection. Its homogeneous version (that is, both β and f are independent of t) was recently studied by Gu, Lou and Zhou GLZ. In this paper we consider the time-periodic case and study the long time behavior of the solutions. We show that a vanishing-spreading dichotomy result holds when β is small; a vanishing-transition-virtual spreading trichotomy result holds when β is a medium-sized function; all solutions vanish when β is large. Here the partition of β(t) is much more complicated than the case when β is a real number, since it depends not only on the "size" β:= 1T∫0T β(t) dt of β(t) but also on its "shape" β(t) := β(t) - β.