Research Article

Complex Dynamics of a Diffusive Holling-Tanner Predator-Prey Model with the Allee Effect

Figure 7

Turing bifurcation diagram for model (8) using and as parameters. Other parameters are taken as , , ,  and . Above the curve, the positive equilibrium is the only stable solution of model (3). Below the curve, the positive equilibrium loses its stability with respect to model (3), and Turing instability occurs; this domain is called the Turing space.
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