In the present work the spontaneous dynamics of a ring of N Chua’s oscillators, mutually coupled through a resistor Rc in anearest-neighbor configuration, is investigated numerically for different strengths of the coupling. A transition from periodic to chaoticglobal dynamics is observed when the coupling decreases below a critical value and complex patterns in the spatiotemporal dynamics of thering emerge for a small coupling interval after the transition to chaos. The recovered behavior, as well asthe value of the criticalthreshold, appears to be independent of the size of the ring. We also propose aninterpretation of this property, which relates the regularsynchronized dynamics of the ring to the dynamics of the isolated oscillator. Finally,for the ring of the coupled oscillator, a theoretical wavedispersion relation is calculated and successfully compared with the results of thenumerical simulations, analyzed by classicaltechniques adopted for turbulent flows. ©
Spatiotemporal Pattern Formation in a Ring of Chua’s Oscillators
Scuro, Carmelo
;
2021-01-01
Abstract
In the present work the spontaneous dynamics of a ring of N Chua’s oscillators, mutually coupled through a resistor Rc in anearest-neighbor configuration, is investigated numerically for different strengths of the coupling. A transition from periodic to chaoticglobal dynamics is observed when the coupling decreases below a critical value and complex patterns in the spatiotemporal dynamics of thering emerge for a small coupling interval after the transition to chaos. The recovered behavior, as well asthe value of the criticalthreshold, appears to be independent of the size of the ring. We also propose aninterpretation of this property, which relates the regularsynchronized dynamics of the ring to the dynamics of the isolated oscillator. Finally,for the ring of the coupled oscillator, a theoretical wavedispersion relation is calculated and successfully compared with the results of thenumerical simulations, analyzed by classicaltechniques adopted for turbulent flows. ©I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.