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Theory and Modern Applications

Figure 4 | Advances in Difference Equations

Figure 4

From: Analysis of stability and Hopf bifurcation in a fractional Gauss-type predator–prey model with Allee effect and Holling type-III functional response

Figure 4

Effect of the derivative order α on the dynamic behavior of model (3) with the following parameters: \(s=0.56\), \(r=0.02\), \(K=100\), \(m=2\), \(a=30\), \(p=1\), and \(c=0.5\). (a) Derivative order \(\alpha =0.79\), (b) derivative order \(\alpha =0.80\), (c) derivative order \(\alpha =0.83\), and (d) derivative order \(\alpha =0.95\)

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