Global bifurcation of co-existence states for a predator–prey–mutualist model with diffusion

## Abstract In this short note, we study a strongly coupled system of partial differential equations which models the dynamics of a two‐predator‐one‐prey ecosystem in which the prey exercises defense switching and the predators collaboratively take advantage of the prey's strategy. We prove the exi

## Abstract This paper studies a three‐species predator‐prey model with cross‐diffusion. In a previous paper 11 of Pang and Wang, it was proved that the system admits global classical solutions if the exponents in cross diffusion term satisfy __m__, __l__ ≥ 1. In the present paper, we continue cons

We consider a predator᎐prey system with one or two delays and a unique positive equilibrium E#. Its dynamics are studied in terms of the local stability of E# and of the description of the Hopf bifurcation that is proven to exist as one of Ž . the delays taken as a parameter crosses some critical va

In this paper, a Lotka-Volterra type reaction-diffusion predator-prey model with stage structure for the prey and nonlocal delays due to gestation of the predator is investigated. In the case of a general domain, sufficient conditions are obtained for the global convergence of positive solutions of