Abstract
We prove the existence of chaotic dynamics in a simple Hamiltonian system of the form $\ddot{x} + q(t) f(x) = 0,$ where $q(t)$ is a periodic function of constant sign. Applications are given to a pendulum equation with variable length.
Citation
Lakshmi Burra. Fabio Zanolin. "Chaotic dynamics in a simple class of Hamiltonian systems with applications to a pendulum with variable length." Differential Integral Equations 22 (9/10) 927 - 948, September/October 2009. https://doi.org/10.57262/die/1356019516
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