New types of 3-D systems of quadratic differential equations with chaotic dynamics based on Ricker discrete population model

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摘要

The wide class of 3-D autonomous systems of quadratic differential equations, in each of which either there is a couple of coexisting limit cycles or there is a couple of coexisting chaotic attractors, is found. In the second case the couple consists of either Lorentz-type attractor and another attractor of a new type or two Lorentz-type attractors. It is shown that the chaotic behavior of any system of the indicated class can be described by the Ricker discrete population model: zi+1 = zi exp(r − zi), r > 0, zi > 0, i = 0, 1, … . The values of parameters, at which in the 3-D system appears either the couple of limit cycles or the couple of chaotic attractors, or only one limit cycle, or only one sphere-shaped chaotic attractor, are indicated. Examples are given.

论文关键词:System of ordinary quadratic differential equations,Linear transformations,Boundedness,Limit cycle,Chaotic attractor,Saddle focus,Ricker discrete population model

论文评审过程:Available online 3 November 2011.

论文官网地址:https://doi.org/10.1016/j.amc.2011.10.037