Sliding mode control for mixed logical dynamical systems

In this paper, the problem of sliding mode control (SMC) for mixed logical dynamical (MLD) systems is investigated. The sufficient conditions for the finite-time reachability and the asymptotical stability of the designed sliding mode surface are established, and the finite reaching time is given. A sliding mode controller is designed to force the trajectories of the mixed logical dynamical system to be driven onto a prescribed sliding surface and maintained there for all subsequent time. Finally, a numerical example is performed to verify the effectiveness and applicability of the sliding mode control design technique proposed in this paper.

[1]  Tao Lin,et al.  Mixed logical dynamical model for back bead width prediction of pulsed GTAW process with misalignment , 2010 .

[2]  Jitesh H. Panchal,et al.  An optimal general purpose scheduler for Networked Control Systems , 2014, 2014 IEEE International Conference on Systems, Man, and Cybernetics (SMC).

[3]  Bart De Schutter,et al.  On hybrid systems and closed-loop MPC systems , 2002, IEEE Trans. Autom. Control..

[4]  Weibing Gao,et al.  Discrete-time variable structure control systems , 1995, IEEE Trans. Ind. Electron..

[5]  Hai Lin,et al.  Hybrid Dynamical Systems: An Introduction to Control and Verification , 2014, Found. Trends Syst. Control..

[6]  Alberto Bemporad,et al.  Efficient conversion of mixed logical dynamical systems into an equivalent piecewise affine form , 2004, IEEE Transactions on Automatic Control.

[7]  Guang-Hong Yang,et al.  Design of Approximation Law for Discrete-time Variable Structure Control Systems , 2006, CDC.

[8]  Alberto Bemporad,et al.  HYSDEL-a tool for generating computational hybrid models for analysis and synthesis problems , 2004, IEEE Transactions on Control Systems Technology.

[9]  Zhou De-wen Reaching law of discrete-time variable structure control system , 2008 .

[10]  Ricardo G. Sanfelice,et al.  Optimal control of Mixed Logical Dynamical systems with Linear Temporal Logic specifications , 2008, 2008 47th IEEE Conference on Decision and Control.

[11]  Manfred Morari,et al.  Embedded optimization for mixed logical dynamical systems , 2015, Comput. Chem. Eng..

[12]  Harris Wu,et al.  Robust sliding mode control for uncertain linear discrete systems independent of time-delay , 2011 .

[13]  F. Zheng,et al.  Variable structure control of discrete-time stochastic systems , 1992, [1992] Proceedings of the 31st IEEE Conference on Decision and Control.

[14]  Didier Dumur,et al.  Predictive control for hybrid systems. Implications of polyhedral pre-computations , 2008 .

[15]  Jingjing Du,et al.  Modeling and Control of a Continuous Stirred Tank Reactor Based on a Mixed Logical Dynamical Model , 2007 .

[16]  Daniel W. C. Ho,et al.  Robust observer design for Itô stochastic time-delay systems via sliding mode control , 2006, Syst. Control. Lett..

[17]  Anders P. Ravn,et al.  Active diagnosis of MLD systems using distinguishable steady outputs , 2010, 2010 IEEE International Symposium on Industrial Electronics.

[18]  Yuhong Wang,et al.  Hybrid formal verification of CSTR system based on MLD model , 2011, 2011 Chinese Control and Decision Conference (CCDC).

[19]  Guido O. Guardabassi,et al.  The Regulator Theory for Finite Automata , 1976, Inf. Control..

[20]  Yuhong Wang,et al.  Improvement of optimal algorithm for hybrid system based on MLD model , 2009, 2009 Chinese Control and Decision Conference.

[21]  Long Li,et al.  Hybrid modeling and predictive control of a fractionated satellite system: A mixed logical dynamical approach , 2013, 2013 25th Chinese Control and Decision Conference (CCDC).

[22]  Alberto Bemporad,et al.  Control of systems integrating logic, dynamics, and constraints , 1999, Autom..

[23]  M. Morari,et al.  Optimal controllers for hybrid systems: stability and piecewise linear explicit form , 2000, Proceedings of the 39th IEEE Conference on Decision and Control (Cat. No.00CH37187).

[24]  Shu Li,et al.  Automotive engine idle speed control based on Mixed Logical Dynamical system , 2008, 2008 7th World Congress on Intelligent Control and Automation.

[25]  Hongsheng Xi,et al.  On exponential stability of neutral delay Markovian jump systems with nonlinear perturbations and partially unknown transition rates , 2014 .

[26]  M. Hejri,et al.  Hybrid modeling and control of a DC-DC boost converter via Extended Mixed Logical Dynamical systems (EMLDs) , 2014, The 5th Annual International Power Electronics, Drive Systems and Technologies Conference (PEDSTC 2014).

[27]  Chunyue Song,et al.  MLD-based predictive control of energy management for hybrid electric bus , 2012, Proceedings of the 10th World Congress on Intelligent Control and Automation.

[28]  Ligang Wu,et al.  Sliding mode control of discrete-time switched systems with time-delay , 2013, J. Frankl. Inst..

[29]  Li-mei Xiu MODEL PREDICTIVE CONTROL ALGORITHM FOR A CLASS OF HYBRID SYSTEM , 2002 .

[30]  Dongfeng Wang,et al.  Multiple Models Generalized Predictive Control for Superheated Steam Temperature Based On MLD Model , 2007, 2007 IEEE International Conference on Automation and Logistics.

[31]  Xinghuo Yu,et al.  Finite-time synchronization of neutral complex networks with Markovian switching based on pinning controller , 2015, Neurocomputing.

[32]  J. Lam,et al.  Sliding-mode control for uncertain neutral delay systems , 2004 .

[33]  Yuanqing Xia,et al.  Robust sliding mode control for uncertain time-delay systems: an LMI approach , 2002, Proceedings of the 2002 American Control Conference (IEEE Cat. No.CH37301).