Title :
Analysis of discrete and hybrid stochastic systems by nonlinear contraction theory
Author :
Pham, Quang-Cuong
Author_Institution :
Lab. de Physiol. de la Perception et de l´´Action, Coll. de France, Paris
Abstract :
We investigate the stability properties of discrete and hybrid stochastic nonlinear dynamical systems. More precisely, we extend the stochastic contraction theorems (which were formulated for continuous systems) to the case of discrete and hybrid resetting systems. In particular, we show that the mean square distance between any two trajectories of a discrete (or hybrid resetting) contracting stochastic system is upper-bounded by a constant after exponential transients. Using these results, we study the synchronization of noisy nonlinear oscillators coupled by discrete noisy interactions.
Keywords :
continuous systems; discrete systems; nonlinear control systems; oscillators; stability; stochastic systems; synchronisation; continuous systems; discrete stochastic systems; dynamical systems; hybrid stochastic systems; noisy nonlinear oscillators; nonlinear contraction theory; stability; stochastic contraction theorems; synchronization; Continuous time systems; Control systems; Couplings; Jacobian matrices; Nonlinear dynamical systems; Oscillators; Robotics and automation; Stability analysis; Stochastic systems; Symmetric matrices; Discrete systems; hybrid resetting; incremental stability; nonlinear contraction theory; oscillator synchronization; stochastic systems;
Conference_Titel :
Control, Automation, Robotics and Vision, 2008. ICARCV 2008. 10th International Conference on
Conference_Location :
Hanoi
Print_ISBN :
978-1-4244-2286-9
Electronic_ISBN :
978-1-4244-2287-6
DOI :
10.1109/ICARCV.2008.4795665
