Generalized multistability and its control in a laser
Year: 2022
Authors: Meucci R., Ginoux JM., Mehrabbeik M., Jafari S., Sprott JC.
Autors Affiliation: CNR, Ist Nazl Ott, Largo E Fermi 6, I-50125 Florence, Italy; Univ Toulon & Var, Lab CPT, CS 60584, F-83041 Toulon 9, France; Amirkabir Univ Technol, Tehran Polytech, Dept Biomed Engn, Tehran 591634311, Iran; Amirkabir Univ Technol, Hlth Technol Res Inst, Tehran Polytech, Tehran 591634311, Iran; Univ Wisconsin, Dept Phys, 150 Univ Ave Madison, Madison, WI 53706 USA.
Abstract: We revisit the laser model with cavity loss modulation, from which evidence of chaos and generalized multistability was discovered in 1982. Multistability refers to the coexistence of two or more attractors in nonlinear dynamical systems. Despite its relative simplicity, the adopted model shows us how the multistability depends on the dissipation of the system. The model is then tested under the action of a secondary sinusoidal perturbation, which can remove bistability when a suitable relative phase is chosen. The surviving attractor is the one with less dissipation. This control strategy is particularly useful when one of the competing attractors is a chaotic attractor. Published under an exclusive license by AIP Publishing.
Journal/Review: CHAOS
Volume: 32 (8) Pages from: 83111-1 to: 83111-11
KeyWords: Dynamics; AttractorsDOI: 10.1063/5.0093727ImpactFactor: 2.900Citations: 25data from “WEB OF SCIENCE” (of Thomson Reuters) are update at: 2024-11-24References taken from IsiWeb of Knowledge: (subscribers only)Connecting to view paper tab on IsiWeb: Click hereConnecting to view citations from IsiWeb: Click here