标题
A simple three-dimensional quadratic flow with an attracting torus
作者
关键词
-
出版物
PHYSICS LETTERS A
Volume 451, Issue -, Pages 128427
出版商
Elsevier BV
发表日期
2022-09-13
DOI
10.1016/j.physleta.2022.128427
参考文献
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- (2020) Zhen Wang et al. European Physical Journal-Special Topics
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- A Simple Chaotic Flow with a Continuously Adjustable Attractor Dimension
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- (2015) J.C. Sprott et al. PHYSICS LETTERS A
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- (2014) Qingdu Li et al. NONLINEAR DYNAMICS
- Dynamical behaviors of a chaotic system with no equilibria
- (2011) Zhouchao Wei PHYSICS LETTERS A
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