Exponential and Algebraical Stability of Traveling Wavefronts in Periodic Spatial-Temporal Environments

Abstract

Global stability of traveling wavefronts in a periodic spatial-temporal environment in n-dimension (n 1) is studied. The wavefront is proved to be exponentially stable in the form of O(e-μ t) for some μ>0, when the wave speed is greater than the critical one, and algebraically stable in the form of O(t-n/2) in the critical case. A new and easy to follow method is developed. These results are then extended to the case of time-periodic media. Finally, we illustrate how the stability result can be directly used to obtain the uniqueness of the wavefront with a given speed.