Persistence and Extinction of Nonlocal Dispersal Evolution Equations in Moving Habitats

Abstract

This paper is devoted to the study of persistence and extinction of a species modeled by nonlocal dispersal evolution equations in moving habitats with moving speed c. It is shown that the species becomes extinct if the moving speed c is larger than the so called spreading speed c*, where c* is determined by the maximum linearized growth rate function. If the moving speed c is smaller than c*, it is shown that the persistence of the species depends on the patch size of the habitat, namely, the species persists if the patch size is greater than some number L* and in this case, there is a traveling wave solution with speed c, and it becomes extinct if the patch size is smaller than L*.