Analysis and Design of Singular Markovian Jump Systems
This monograph is an up-to-date presentation of the analysis and design of singular Markovian jump systems (SMJSs) in which the transition rate matrix of the underlying systems is generally uncertain, partially unknown and designed. The problems addressed include stability, stabilization, H8 control and filtering, observer design, and adaptive control. applications of Markov process are investigated by using Lyapunov theory, linear matrix inequalities (LMIs), S-procedure and the stochastic Barbalat’s Lemma, among other techniques.
Features of the book include:
· study of the stability problem for SMJSs with general transition rate matrices (TRMs);
· stabilization for SMJSs by TRM design, noise control, proportional-derivative and partially mode-dependent control, in terms of LMIs with and without equation constraints;
· mode-dependent and mode-independent H8 control solutions with development of a type of disordered controller;
· observer-based controllers of SMJSs in which both the designed observer and controller are either mode-dependent or mode-independent;
· consideration of robust H8 filtering in terms of uncertain TRM or filter parameters leading to a method for totally mode-independent filtering
· development of LMI-based conditions for a class of adaptive state feedback controllers with almost-certainly-bounded estimated error and almost-certainly-asymptotically-stable corres
ponding closed-loop system states
· applications of Markov process on singular systems with norm bounded uncertainties and time-varying delays
Analysis and Design of Singular Markovian Jump Systems contains valuable reference material for academic researchers wishing to explore the area. The contents are also suitable for a one-semester graduate course.
Expands reader understanding of a class of systems important in control of electrical, economic, chemical-process and mechanical systemsGives examples of application in two classes of singular systemSuitable for use as instructional material in a one-semester graduate course