Title :
Effectivity of the stabilization of higher periodic orbits of chaotic maps
Author :
Lenz, Henning ; Obradovic, Dragan
Author_Institution :
Corp. Technol. Inf. & Commun., Siemens AG, Munich, Germany
Abstract :
In many cases linear controllers are designed to stabilize nonlinear chaotic systems on periodic orbits. Paskota defined the neighbourhood size, i.e. a measure of the region where a linear controller can effectively stabilize a chaotic system on a fixed point. Generalizing this idea to the stabilization of higher periodic orbits, two performance measures-the neighbourhood size and the contracting region-are defined to determine the effectivity of a linear controller. This leads to a nonlinear constrained optimization problem, which, in general, has to be solved numerically. The effectivity of several linear controllers, when applied to the Henon map and the Ikeda map, is compared
Keywords :
chaos; closed loop systems; discrete time systems; feedback; iterative methods; linearisation techniques; nonlinear dynamical systems; optimisation; robust control; Henon map; Ikeda map; chaotic maps; contracting region; discrete time systems; effectivity; higher periodic orbits; linearisation; neighbourhood size; nonlinear chaotic systems; nonlinear constrained optimization; stabilization; Adaptive control; Chaos; Chaotic communication; Closed loop systems; Communication system control; Communications technology; Control systems; Orbits; Size control; Stability;
Conference_Titel :
Control of Oscillations and Chaos, 1997. Proceedings., 1997 1st International Conference
Conference_Location :
St. Petersburg
Print_ISBN :
0-7803-4247-X
DOI :
10.1109/COC.1997.633524
