Title :
Robust guaranteed cost observer for Markovian jumping systems with state delays
Author :
Fu, Y.M. ; Chai, Q.X. ; Duan, G.-R.
Author_Institution :
Center for Control Theor. & Guidance Technol., Harbin Inst. of Technol., China
Abstract :
This paper deals with the robust guaranteed cost observer with guaranteed cost performance for a class of linear uncertain jump systems with state delay. The transition of the jumping parameters in systems is governed by a finite-state Markov process. Based on stability theory in stochastic differential equations, a sufficient condition on the existence of the proposed robust guaranteed cost observer is derived. Robust guaranteed cost observers are designed in terms of a set of linear coupled matrix inequalities. A convex optimization problem with LMI constraints is formulated to design the suboptimal guaranteed cost observers.
Keywords :
Markov processes; cost optimal control; delays; linear matrix inequalities; observers; robust control; stochastic systems; LMI constraints; Markovian jumping systems; convex optimization; finite-state Markov process; linear coupled matrix inequalities; linear uncertain jump systems; robust guaranteed cost observer; stability theory; state delays; stochastic differential equations; suboptimal guaranteed cost observers; Constraint optimization; Costs; Delay systems; Differential equations; Linear matrix inequalities; Markov processes; Robust stability; Robustness; Stochastic processes; Sufficient conditions; Markov jumping parameters; Stochastic systems; linear matrix inequalities.; robust guaranteed cost observer; time-delay systems;
Conference_Titel :
Control and Automation, 2005. ICCA '05. International Conference on
Print_ISBN :
0-7803-9137-3
DOI :
10.1109/ICCA.2005.1528125
