Bifurcations of Sliding Heteroclinic Cycles in Three-Dimensional Filippov Systems

IF 1.9 4区数学 Q2 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS International Journal of Bifurcation and Chaos Pub Date : 2024-03-06 DOI:10.1142/s0218127424500354

Yousu Huang, Qigui Yang

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Abstract

Global bifurcations with sliding have rarely been studied in three-dimensional piecewise smooth systems. In this paper, codimension-2 bifurcations of nondegenerate sliding heteroclinic cycle $Γ$ are investigated in three-dimensional Filippov systems. Two cases of sliding heteroclinic cycle are discussed: $(C_{1})$ connecting two saddle-foci, $(C_{2})$ connecting one saddle-focus and one saddle. It is proved that at most one sliding homoclinic or one sliding periodic orbit can bifurcate from $Γ$ under certain conditions at the eigenvalues of the equilibria, but they cannot coexist. The asymptotic stability of the sliding periodic orbit and the structural feature of the bifurcation curves of homoclinic orbits are further studied. Finally, two numerical examples corresponding to cases $(C_{1})$ and $(C_{2})$ , respectively, are simulated to verify the theoretical results.

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三维菲利波夫系统中滑动异次元循环的分岔

在三维片状光滑系统中，很少有人研究滑动的全局分岔。本文研究了三维菲利波夫系统中非enerate 滑动异面循环 Γ 的第 2 维分岔。本文讨论了滑动异面循环的两种情况：(C1) 连接两个鞍焦；(C2) 连接一个鞍焦和一个鞍。研究证明，在平衡点特征值的特定条件下，最多有一个滑动同次轨道或一个滑动周期轨道能从Γ分岔出来，但它们不能共存。研究还进一步探讨了滑动周期轨道的渐近稳定性和同次轨道分岔曲线的结构特征。最后，模拟了分别对应于情况 (C1) 和情况 (C2) 的两个数值实例，以验证理论结果。

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来源期刊

International Journal of Bifurcation and Chaos 数学-数学跨学科应用

CiteScore

4.10

自引率

13.60%

发文量

237

审稿时长

2-4 weeks

期刊介绍： The International Journal of Bifurcation and Chaos is widely regarded as a leading journal in the exciting fields of chaos theory and nonlinear science. Represented by an international editorial board comprising top researchers from a wide variety of disciplines, it is setting high standards in scientific and production quality. The journal has been reputedly acclaimed by the scientific community around the world, and has featured many important papers by leading researchers from various areas of applied sciences and engineering. The discipline of chaos theory has created a universal paradigm, a scientific parlance, and a mathematical tool for grappling with complex dynamical phenomena. In every field of applied sciences (astronomy, atmospheric sciences, biology, chemistry, economics, geophysics, life and medical sciences, physics, social sciences, ecology, etc.) and engineering (aerospace, chemical, electronic, civil, computer, information, mechanical, software, telecommunication, etc.), the local and global manifestations of chaos and bifurcation have burst forth in an unprecedented universality, linking scientists heretofore unfamiliar with one another''s fields, and offering an opportunity to reshape our grasp of reality.