进化里克尔模型中的不变集、全局动力学和奈马克-萨克分岔

Symmetry Pub Date : 2024-09-02 DOI:10.3390/sym16091139
Rafael Luís, Brian Ryals
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引用次数: 0

摘要

本文研究了基于进化博弈论的达尔文进化策略衍生出的 Ricker 型平面非线性非对称离散模型的局部、全局和分岔特性。我们改变了变量,既减少了参数数量,又使映射的等值线具有对称性。通过这个新模型,我们证明了存在一个前向不变且具有全局吸引力的集合,所有动态都发生在这个集合中。在这个集合中,模型有两个对称的固定点:一个是原点,它总是一个鞍形固定点;另一个是内部固定点,它可能是全局渐近稳定的。此外,我们还观察到了超临界 Neimark-Sacker 分岔的存在,而这种现象在原始的非演化模型中是不存在的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Invariant Sets, Global Dynamics, and the Neimark–Sacker Bifurcation in the Evolutionary Ricker Model
In this paper, we study the local, global, and bifurcation properties of a planar nonlinear asymmetric discrete model of Ricker type that is derived from a Darwinian evolution strategy based on evolutionary game theory. We make a change of variables to both reduce the number of parameters as well as bring symmetry to the isoclines of the mapping. With this new model, we demonstrate the existence of a forward invariant and globally attracting set where all the dynamics occur. In this set, the model possesses two symmetric fixed points: the origin, which is always a saddle fixed point, and an interior fixed point that may be globally asymptotically stable. Moreover, we observe the presence of a supercritical Neimark–Sacker bifurcation, a phenomenon that is not present in the original non-evolutionary model.
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