$\mathscr{H}_{2}$ and $\mathscr{H}_{\infty}$ mode-independent state-feedback control of generalized Bernoulli jump systems with uncertain probabilities*

Many practical problems arising in networked control systems can be suitably modeled by linear stochastic systems described in terms of discrete-time generalized Bernoulli models, that are a particular case of the so called Markov jump linear systems. Motivated by real world applications where the transition probability matrix is uncertain, this paper proposes a general framework to deal with the problem of control design for Bernoulli systems, providing synthesis conditions for $\mathscr{H}_{2}$ and $\mathscr{H}_{\infty}$ state-feedback controllers that are sufficient in the uncertain case and also necessary (optimal) for precisely known models. The conditions can be solved in terms of LMI relaxations of increasing accuracy, allowing the user to tradeoff precision and computational cost in the search for better solutions. The networked control of a mechanical plant is presented to illustrate the applicability of the method.

[1]  Jos F. Sturm,et al.  A Matlab toolbox for optimization over symmetric cones , 1999 .

[2]  Márcio F. Braga,et al.  Brief Paper - H 2 control of discrete-time Markov jump linear systems with uncertain transition probability matrix: improved linear matrix inequality relaxations and multi-simplex modelling , 2013 .

[3]  Alim P. C. Gonçalves,et al.  Output Feedback Control applied to Car Pursuit problem with lossy network , 2016, 2016 IEEE Biennial Congress of Argentina (ARGENCON).

[4]  Luca Schenato,et al.  To Zero or to Hold Control Inputs With Lossy Links? , 2009, IEEE Transactions on Automatic Control.

[5]  E. Boukas,et al.  H∞ control for discrete‐time Markovian jump linear systems with partly unknown transition probabilities , 2009 .

[6]  Raja Sengupta,et al.  An H/sub /spl infin// approach to networked control , 2005, IEEE Transactions on Automatic Control.

[7]  Azzedine Boukerche,et al.  Opportunistic Routing in Wireless Networks: Models, Algorithms, and Classifications , 2014 .

[8]  Di Wu,et al.  Opportunistic Routing Algorithm for Relay Node Selection in Wireless Sensor Networks , 2015, IEEE Transactions on Industrial Informatics.

[9]  Ricardo C. L. F. Oliveira,et al.  Robust stability, ℋ2 analysis and stabilisation of discrete-time Markov jump linear systems with uncertain probability matrix , 2009, Int. J. Control.

[10]  Lixian Zhang,et al.  Mode-dependent Hinfinity filtering for discrete-time Markovian jump linear systems with partly unknown transition probabilities , 2009, Autom..

[11]  Alim P. C. Gonçalves,et al.  H∞ robust and networked control of discrete-time MJLS through LMIs , 2012, J. Frankl. Inst..

[12]  Huijun Gao,et al.  Network-Induced Constraints in Networked Control Systems—A Survey , 2013, IEEE Transactions on Industrial Informatics.

[13]  E. Boukas,et al.  Mode-dependent Hºº filtering for discrete-time Markovian jump linear systems with partly unknown transition probabilities. , 2007 .

[14]  Ricardo C. L. F. Oliveira,et al.  Robust LMIs with parameters in multi-simplex: Existence of solutions and applications , 2008, 2008 47th IEEE Conference on Decision and Control.

[15]  Le Van Hien,et al.  Stochastic Stabilization of Discrete-Time Markov Jump Systems with Generalized Delay and Deficient Transition Rates , 2017, Circuits Syst. Signal Process..

[16]  Alim P. C. Gonçalves,et al.  Markov jump linear systems and filtering through network transmitted measurements , 2010, Signal Process..

[17]  Alim P. C. Gonçalves,et al.  Filtering of discrete‐time Markov jump linear systems with uncertain transition probabilities , 2011 .

[18]  E. Boukas,et al.  Stability and Stabilization of Markovian Jump Linear Systems with Partly Unknown Transition Probabilities , 2008 .

[19]  N. E. Wu,et al.  Concepts and methods in fault-tolerant control , 2001, Proceedings of the 2001 American Control Conference. (Cat. No.01CH37148).

[20]  Alim P. C. Gonçalves,et al.  Optimal H2 and H∞ Mode-Independent Control for Generalized Bernoulli Jump Systems , 2014 .

[21]  Tai C Yang,et al.  Networked control system: a brief survey , 2006 .

[22]  Marcelo D. Fragoso,et al.  A Detector-Based Approach for the $H_{2} $ Control of Markov Jump Linear Systems With Partial Information , 2015, IEEE Transactions on Automatic Control.

[23]  Ricardo C. L. F. Oliveira,et al.  Parameter-Dependent LMIs in Robust Analysis: Characterization of Homogeneous Polynomially Parameter-Dependent Solutions Via LMI Relaxations , 2007, IEEE Transactions on Automatic Control.

[24]  João Pedro Hespanha,et al.  A Survey of Recent Results in Networked Control Systems , 2007, Proceedings of the IEEE.

[25]  Marcelo D. Fragoso,et al.  A new approach for the H∞ control of Markov jump linear systems with partial information , 2015, 2015 54th IEEE Conference on Decision and Control (CDC).

[26]  Johan Löfberg,et al.  YALMIP : a toolbox for modeling and optimization in MATLAB , 2004 .

[27]  Ricardo C. L. F. Oliveira,et al.  H∞ state feedback control for MJLS with uncertain probabilities , 2015, Autom..

[28]  Marcelo D. Fragoso,et al.  New methods for mode-independent robust control of Markov jump linear systems , 2014, 53rd IEEE Conference on Decision and Control.