Paper Info
Title
Optimal H-Infinity State Feedback Sampled-Data Control Design For Markov Jump Linear Systems
Abstract
This paper is entirely devoted to analyse and solve the H-infinity optimal state feedback sampled-data control design problem for continuous-time Markov jump linear systems. This is an important unsolved problem in the context of optimal control theory. To this end, necessary and sufficient optimality conditions are characterised in terms of a specific nonlinear two-point boundary value problem. A global convergent algorithm able to solve iteratively the optimality conditions is provided. Moreover, some mathematical properties of the solution of a differential Riccati equation are raised in order to translate the previous conditions into linear matrix inequalities. This result allows a mode independent feedback control structure for the Markovian system under analysis. A practical application borrowed from the literature is included for illustration.
Year
DOI
Venue
2018
10.1080/00207179.2017.1323352
INTERNATIONAL JOURNAL OF CONTROL
Keywords
Field
DocType
Sampled-data control, Markov jump linear system, hybrid system, differential Riccati equation
Boundary value problem,Mathematical optimization,Optimal control,Nonlinear system,Markov process,Linear-quadratic-Gaussian control,Control theory,Riccati equation,Algebraic Riccati equation,Linear-quadratic regulator,Mathematics
Journal
Volume
Issue
ISSN
91
7
0020-7179
Citations 
PageRank 
References 
1
0.35
4
Authors
3
Name
Order
Citations
PageRank
Gabriela W. Gabriel1223.54
José Claudio Geromel216436.34
Karolos M. Grigoriadis318639.63