Chaotic discretization theorems for forced linear and nonlinear coupled oscillators

Stefano Disca; Vincenzo Coscia

Paper

Chaotic discretization theorems for forced linear and nonlinear coupled oscillators

Abstract

We prove the holding of chaos in the sense of Li-Yorke for a family of four-dimensional discrete dynamical systems that are naturally associated to ODEs systems describing coupled oscillators subject to an external nonconservative force, also giving an example of a discrete map that is Li-Yorke chaotic but not topologically transitive. Analytical results are generalized to a modular definition of the problem and to a system of nonlinear oscillators described by polynomial potentials in one coordinate. We perform numerical simulations looking for a strange attractor of the system; furthermore, we present the bifurcation diagram and perform a bifurcation analysis of the system.