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Observer-based H∞ control for discrete-time one-sided Lipschitz Markovian jump delayed systems under partially unknown transition probabilities

Research Output: Contribution to journal Article Peer-review

Abstract

This paper solves H∞ controller-based observer synthesis problem for the discrete-time non-linear Markovian jump systems (MJSs) with time-varying delays and disturbances in the existence of partially unknown transition probabilities. The non-linear function considered in this work is assumed to satisfy the one-sided Lipschitz (OSL) condition, which is less conservative as compared to the global Lipschitz condition. Firstly, by virtue of an appropriately chosen Lyapunov-Krasovskii functional and the improved summation inequality, some sufficient inequality-based conditions for the existence of a state feedback controller have been proposed for OSL MJSs such that the overall closed-loop system is stochastically stable (SS). Secondly, an observer-based H∞ control design problem for the system under consideration has been solved such that the overall error dynamics are SS with disturbance attenuation level γ. The results are formulated in terms of linear matrix inequalities. Finally, a suitable example has been discussed to show the significance of the developed results.

Publication Information

Output type

Research Output: Contribution to journal Article Peer-review

Original language

English

Pages from-to (Number of pages)

Pages 8611-8630

Journal (Volume, Issue Number)

Journal of the Franklin Institute (Volume 357, Issue 13)

Publication milestones

  • Accepted/In press - 18/06/2020
  • Published - 30/06/2020

Publication status

Published - 30/06/2020

ISSN

0016-0032

External Publication IDs

  • ORCID: /0000-0002-8215-4315/work/118801414
  • Scopus: 85088112059