Sliding mode controller design for linear systems with unmeasured states

This paper addresses the optimal controller problem for a linear system over linear observations with respect to different Bolza-Meyer criteria, where 1) the integral control and state energy terms are quadratic and the non-integral term is of the first degree or 2) the control energy term is quadratic and the state energy terms are of the first degree. The optimal solutions are obtained as sliding mode controllers, each consisting of a sliding mode filter and a sliding mode regulator, whereas the conventional feedback LQG controller fails to provide a causal solution. Performance of the obtained optimal controllers is verified in the illustrative example against the conventional LQG controller that is optimal for the quadratic Bolza-Meyer criterion. The simulation results confirm an advantage in favor of the designed sliding mode controllers.

[1]  Antonella Ferrara,et al.  Sliding mode optimal regulator for a bolza-meyer criterion with non-quadratic state energy terms , 2009, 2009 American Control Conference.

[2]  Antonella Ferrara,et al.  Sliding mode regulator as solution to optimal control problem , 2008, 2008 47th IEEE Conference on Decision and Control.

[3]  Igor Boiko Frequency domain precision analysis and design of sliding mode observers , 2010, J. Frankl. Inst..

[4]  Yuanqing Xia,et al.  Robust sliding-mode control for uncertain time-delay systems: an LMI approach , 2003, IEEE Trans. Autom. Control..

[5]  Christopher Edwards,et al.  Sliding mode control : theory and applications , 1998 .

[6]  Antonella Ferrara,et al.  Sliding mode optimal control for linear systems , 2012, J. Frankl. Inst..

[7]  James Lam,et al.  Robust integral sliding mode control for uncertain stochastic systems with time-varying delay , 2005, Autom..

[8]  Hamid Reza Karimi,et al.  A linear matrix inequality approach to robust fault detection filter design of linear systems with mixed time-varying delays and nonlinear perturbations , 2010, J. Frankl. Inst..

[9]  Yuanqing Xia,et al.  Observer-based sliding mode control for a class of discrete systems via delta operator approach , 2010, J. Frankl. Inst..

[10]  Huibert Kwakernaak,et al.  Linear Optimal Control Systems , 1972 .

[11]  Zehui Mao,et al.  Observer based fault-tolerant control for a class of nonlinear networked control systems , 2010, J. Frankl. Inst..

[12]  Michael Basin,et al.  Integral sliding mode design for robust filtering and control of linear stochastic time‐delay systems , 2005 .

[13]  Alessandro Pisano,et al.  Fault diagnosis for the vertical three-tank system via high-order sliding-mode observation , 2010, J. Frankl. Inst..

[14]  Michael Basin,et al.  Optimal and robust integral sliding mode filter design for systems with continuous and delayed measurements , 2002, Proceedings of the 41st IEEE Conference on Decision and Control, 2002..

[15]  Aleksej F. Filippov,et al.  Differential Equations with Discontinuous Righthand Sides , 1988, Mathematics and Its Applications.

[16]  Michael Basin,et al.  Sliding mode mean-module filtering for linear stochastic systems , 2010, 2010 IEEE International Conference on Industrial Technology.

[17]  V. Pugachev,et al.  Stochastic Systems: Theory and Applications , 2002 .

[18]  W. Fleming,et al.  Deterministic and Stochastic Optimal Control , 1975 .

[19]  Yuri B. Shtessel,et al.  Robust adaptive tracking with an additional plant identifier for a class of nonlinear systems , 2010, J. Frankl. Inst..

[20]  Vadim I. Utkin,et al.  Sliding Modes in Control and Optimization , 1992, Communications and Control Engineering Series.

[21]  Michael Basin,et al.  Sliding mode mean-square filtering for linear stochastic systems , 2010, 2010 IEEE International Conference on Industrial Technology.

[22]  K. Åström Introduction to Stochastic Control Theory , 1970 .

[23]  R. E. Kalman,et al.  New Results in Linear Filtering and Prediction Theory , 1961 .

[24]  Yuanqing Xia,et al.  On designing of sliding-mode control for stochastic jump systems , 2006, IEEE Transactions on Automatic Control.

[25]  Yuri B. Shtessel,et al.  Higher order sliding modes , 2008 .