Journal ArticleDOI
Sliding homoclinic bifurcations in a Lorenz-type system: Analytic proofs.
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TLDR
This paper constructs a Poincaré return map that accounts for the presence of sliding motions and derives an explicit scaling factor for period-doubling bifurcations associated with sliding multi-loop homoclinic orbits and the formation of a quasi-attractor.Abstract:
Non-smooth systems can generate dynamics and bifurcations that are drastically different from their smooth counterparts. In this paper, we study such homoclinic bifurcations in a piecewise-smooth analytically tractable Lorenz-type system that was recently introduced by Belykh et al. [Chaos 29, 103108 (2019)]. Through a rigorous analysis, we demonstrate that the emergence of sliding motions leads to novel bifurcation scenarios in which bifurcations of unstable homoclinic orbits of a saddle can yield stable limit cycles. These bifurcations are in sharp contrast with their smooth analogs that can generate only unstable (saddle) dynamics. We construct a Poincare return map that accounts for the presence of sliding motions, thereby rigorously characterizing sliding homoclinic bifurcations that destroy a chaotic Lorenz-type attractor. In particular, we derive an explicit scaling factor for period-doubling bifurcations associated with sliding multi-loop homoclinic orbits and the formation of a quasi-attractor. Our analytical results lay the foundation for the development of non-classical global bifurcation theory in non-smooth flow systems.read more
Citations
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Journal ArticleDOI
Partial synchronization in the second-order Kuramoto model: An auxiliary system method
TL;DR: In this article, the authors developed an auxiliary system method that is based on the analysis of a two-dimensional piecewise-smooth system whose trajectories govern oscillating dynamics of phase differences between oscillators in the coherent cluster.
Journal ArticleDOI
Coexistence of three heteroclinic cycles and chaos analyses for a class of 3D piecewise affine systems.
TL;DR: In this paper , the authors investigate the innovative dynamics of piecewise smooth systems with multiple discontinuous switching manifolds and establish the coexistence of heteroclinic cycles in a class of 3D piecewise affine systems with three switching manifold through rigorous mathematical analysis.
Journal ArticleDOI
Coexisting singular cycles in a class of three-dimensional three-zone piecewise affine systems
Kai Lu,Wenjing Xu +1 more
TL;DR: In this article , the dynamics for a class of three-dimensional (3D) three-zone piecewise affine systems (PWASs) consisting of three sub-systems is investigated.
Journal ArticleDOI
Beyond the Bristol book: Advances and perspectives in non-smooth dynamics and applications.
TL;DR: A detailed review of progress in non-smooth dynamical systems can be found in this article , where the authors cover hidden dynamics, generalizations of sliding motion, effects of noise and randomness, multi-scale approaches, systems with time-dependent switching, and a variety of local and global bifurcations.
Journal ArticleDOI
Modeling, dynamical analysis and numerical simulation of a new 3D cubic Lorenz-like system
TL;DR: In this paper , a 3D cubic Lorenz-like system with high-order nonlinear terms was introduced, which does not belong to the generalized Lorenz systems family. But it is shown that not only the parabolic type equilibria are globally exponentially asymptotically stable, but also there exists a pair of symmetrical heteroclinic orbits with respect to the z-axis.
References
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Deterministic nonperiodic flow
TL;DR: In this paper, it was shown that nonperiodic solutions are ordinarily unstable with respect to small modifications, so that slightly differing initial states can evolve into considerably different states, and systems with bounded solutions are shown to possess bounded numerical solutions.
Book
Differential Equations with Discontinuous Righthand Sides
TL;DR: The kind and level of sophistication of mathematics applied in various sciences has changed drastically in recent years: measure theory is used (non-trivially) in regional and theoretical economics, algebraic geometry interacts with physics, and such new emerging subdisciplines as "experimental mathematics", "CFD", "completely integrable systems", "chaos, synergetics and large-scale order", which are almost impossible to fit into the existing classification schemes.
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An equation for continuous chaos
TL;DR: A prototype equation to the Lorenz model of turbulence contains just one (second-order) nonlinearity in one variable as mentioned in this paper, which allows for a "folded" Poincare map (horseshoe map).
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Quantitative universality for a class of nonlinear transformations
TL;DR: In this article, a large class of recursion relations xn+l = Af(xn) exhibiting infinite bifurcation is shown to possess a rich quantitative structure essentially independent of the recursion function.
Book Review: Nonlinear Oscillations, Dynamical Systems, and Bifurcations of Vector Fields
John Guckenheimer,Philip Holmes +1 more
TL;DR: Guckenheimer and Holmes as discussed by the authors survey the theory and techniques needed to understand chaotic behavior of ODEs and provide a user's guide to an extensive and rapidly growing field.