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Multitudinous potential homoclinic and heteroclinic orbits seized

Haijun Wang, Jun Pan, Guiyao Ke

2024Electronic Research Archive17 citationsDOIOpen Access PDF

Abstract

<abstract><p>Revisiting a newly reported modified Chen system by both the definitions of $ \alpha $-limit and $ \omega $-limit set, Lyapunov function and Hamiltonian function, this paper seized a multitude of pairs of potential heteroclinic orbits to (1) $ E_{0} $ and $ E_{\pm} $, or (2) $ E_{+} $ or (3) $ E_{-} $, and homoclinic and heteroclinic orbits on its invariant algebraic surface $ Q = z - \frac{x^{2}}{2a} = 0 $ with cofactor $ -2a $, which is not available in the existing literature to the best of our knowledge. Particularly, the theoretical conclusions were verified via numerical examples.</p></abstract>

Topics & Concepts

Homoclinic orbitHeteroclinic orbitOmegaInvariant (physics)Heteroclinic cycleMathematicsLimit (mathematics)Heteroclinic bifurcationHamiltonian systemAlgebraic numberMathematical analysisMathematical physicsPhysicsQuantum mechanicsBifurcationPeriod-doubling bifurcationNonlinear systemQuantum chaos and dynamical systemsAdvanced Differential Equations and Dynamical SystemsChaos control and synchronization
Multitudinous potential homoclinic and heteroclinic orbits seized | Litcius