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Theory and Modern Applications

Figure 2 | Advances in Difference Equations

Figure 2

From: Backward bifurcation of predator–prey model with anti-predator behaviors

Figure 2

One parameter bifurcation diagram of δ. ‘SN’ is the saddle-node bifurcation. The dash curve represents unstable equilibrium while the solid curve represent stable equilibrium. Here we set \(b=50\) for (A) and \(b=10\) for (B). The other parameter values are: \(\eta =0.01\), \(a=0.22\), \(\beta _{1}=0.2\), \(\beta _{2}=0.1\), \(k=0.4\), \(\gamma =0.45\), \(m_{A}=0.45\), \(m_{J}=0.8\)

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