Title :
Stability probability in sliding mode control of second order Markovian jump systems
Author :
Qing Zhu ; Xinghuo Yu ; Aiguo Song ; Shumin Fei ; Zhiqiang Cao ; Yuequan Yang
Author_Institution :
Sch. of Instrum. Sci. & Eng., Southeast Univ., Nanjing, China
fDate :
May 31 2014-June 2 2014
Abstract :
This paper explores the relationship between system stability conditional probability and the sliding mode control for second order continuous Markovian jump systems. By using the stochastic process theory, multi-step state transition conditional probability function is proposed for the continuous time discrete state Markovian process. A sliding mode control scheme is utilized to stabilize the continuous Markovian jump systems. The system stability conditional probability function is derived. It indicates that the system stability conditional probability is a monotonically bounded non-decreasing non-negative piecewise right continuous function of the control parameter. A numerical example is given to show the feasibility of the theoretical results.
Keywords :
Markov processes; continuous time systems; discrete systems; probability; stability; variable structure systems; continuous time discrete state Markovian process; second order continuous Markovian jump systems; sliding mode control; stability conditional probability; stability conditional probability function system; stochastic process theory; Educational institutions; Manifolds; Numerical stability; Power system stability; Stability analysis; Stochastic processes; Switches; Conditional Probability; Markovian Jump System; Sliding Mode Control; Stochastic Stability;
Conference_Titel :
Control and Decision Conference (2014 CCDC), The 26th Chinese
Conference_Location :
Changsha
Print_ISBN :
978-1-4799-3707-3
DOI :
10.1109/CCDC.2014.6852585
