Semi-wave and sharp estimates of propagation for monostable free boundary problems in time-periodic environment

Abstract

We investigate the propagation profile of positive solutions to equation* ut-duxx=f(t,u) for t>0,\ x∈(g(t),h(t)), equation* where f(t,u) is monostable in u and T-periodic in t, and the free boundaries x=g(t), \ x=h(t) are determined by the Stefan condition g'(t)=-μux(t, g(t)),\ h'(t)=-μux(t,h(t)), coupled with u(t, g(t))=u(t, h(t))=0. For a special nonlinearity satisfying the strong KPP condition, the long-time behavior and asymptotic spreading speed of this problem were considered by Du, Guo and Peng DGP. In this paper, by employing new techniques, we extend the results of DGP to general monostable nonlinearities beyond the KPP framework and at the same time we obtain more precise description of the propagation profile: we prove the existence and uniqueness of a semi-wave and show that the spreading solution converges to this semi-wave as time goes to infinity.