Spatial Dynamics of a Nonlocal Periodic Reaction-Diffusion Model with Stage Structure

@article{Jin2009SpatialDO,
  title={Spatial Dynamics of a Nonlocal Periodic Reaction-Diffusion Model with Stage Structure},
  author={Yu Jin and Xiao-Qiang Zhao},
  journal={SIAM J. Math. Anal.},
  year={2009},
  volume={40},
  pages={2496-2516}
}
In this paper, we investigate a nonlocal periodic reaction-diffusion population model with stage structure. In the case of unbounded spatial domain, we establish the existence of the asymptotic speed of spread and show that it coincides with the minimal wave speed for monotone periodic traveling waves. In the case of bounded spatial domain, we obtain a threshold result on the global attractivity of either zero or a positive periodic solution. 

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