Abstract
In this article, we have proposed a newly delayed cooperative species model with density-dependent diffusion. Firstly, we prove the existence and uniqueness of positive equilibrium of this model through mathematical analysis method. Then, for this model, we investigate the persistence properties in the case of self-diffusion and global stability of positive equilibrium by constructing Lyapunov function. Further, we discuss the existence problem of Hopf bifurcation deduced by delay. Finally, the theoretical results in this article are verified by carrying out some numerical simulations. The research results show that density dependent diffusion does not affect the stability of the positive equilibrium of the model, but delay does.
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