We consider a class of time-periodic switched systems, which are obtained as a perturbation of a planar autonomous reversible system by a periodic forcing term. The model is motivated by an extension of the classical Liénard and Rayleigh equations due to the presence of a relativistic acceleration. Using recent results from the theory of topological horseshoes, we provide a new result of existence of infinitely many subharmonic solutions, as well as more complex dynamics, as illustrated by some numerical examples.
Chaotic Dynamics in a Class of Switched Liénard/Rayleigh Systems with Relativistic Acceleration / Papini, Duccio; Villari, Gabriele; Zanolin, Fabio. - In: LIBERTAS MATHEMATICA. - ISSN 2182-567X. - 43:2(2023), pp. 1-30.
Chaotic Dynamics in a Class of Switched Liénard/Rayleigh Systems with Relativistic Acceleration
Duccio Papini;
2023
Abstract
We consider a class of time-periodic switched systems, which are obtained as a perturbation of a planar autonomous reversible system by a periodic forcing term. The model is motivated by an extension of the classical Liénard and Rayleigh equations due to the presence of a relativistic acceleration. Using recent results from the theory of topological horseshoes, we provide a new result of existence of infinitely many subharmonic solutions, as well as more complex dynamics, as illustrated by some numerical examples.
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