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

fYear

2014

fDate

May 31 2014-June 2 2014

Firstpage

2453

Lastpage

2458

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;

fLanguage

English

Publisher

ieee

Conference_Titel

Control and Decision Conference (2014 CCDC), The 26th Chinese

Conference_Location

Changsha

Print_ISBN

978-1-4799-3707-3

Type

conf

DOI

10.1109/CCDC.2014.6852585

Filename

6852585