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Theory and Modern Applications

Figure 3 | Advances in Difference Equations

Figure 3

From: Non-linear population discrete models with two time scales: re-scaling of part of the slow process

Figure 3

Changing local reproductive synchrony into global reproductive asynchrony when going from the local level (isolated identical patches with dynamics defined by matrices (28)) to the global level (represented by system (29)) when we incorporate dispersal. Parameter values: \(s_{1}=s_{2}=s_{3}=0.5\), \(c=1\), \(d=10\), \(\phi=3.1\), \(v_{1}^{1}=0.3\), \(v_{2}^{1}=7/8\), \(v_{3}^{1}=1/8\). Initial conditions are \(X(0)=(0.02,0.02,0.05,0.05,0.02,0.02)\). The simulations have been run until time \(t=10^{6}\) and only the last 8 times are shown

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