Abstract
In this paper we consider the existence of monotone traveling waves for a class of general integral difference model for populations that allows the dispersal probability to have no continuous density functions but the fecundity functions to generate a monotone dynamical systems. In this setting we deal with the non-compactness of the evolution operator by using the monotone iteration method.
Highlights
In this talk, we consider the existence of monotone traveling waves for a class of general integral difference models for populations, which allow the dispersal probability to have no continuous density functions but the fecundity functions to generate a monotone dynamical system
We deal with the noncompactness of the evolution operator by using the monotone iteration method
Summary
We consider the existence of monotone traveling waves for a class of general integral difference models for populations, which allow the dispersal probability to have no continuous density functions but the fecundity functions to generate a monotone dynamical system.
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