Most Popular Papers

This paper is devoted to trajectory tracking control for nonlinear discrete-time polynomial systems. The proposed approach makes full use of a feedback linearization technique combined with gain-scheduling approach to create a tracking control structure. The synthesized controller is based mainly on the reverse trajectory method which allows estimating domains of attraction around the operating points. A smooth transition from the actual operating conditions to the desired ones is ensured via an accurate geometrical approach. The effectiveness of the control schema is demonstrated through its simulation to a CSTR control problem.
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Discrete-Time Systems; Gain-Scheduling; Nonlinear Polynomial Systems; Reverse Trajectory Method; Trajectory Tracking

A. Isidori, Nonlinear Control Systems, (Second Edit., Springer Verlag, New York. 1998).

R. Genesio, M. Tartaglia, and A. Vicino, On the Estimation of Asymptotic Stability Regions: State of Art and New Proposals, IEEE Trans. on Automatic Control. Vol. 30(Issue 8): 747-755, 1985.

Wuneng Zhou, Lin Pan, Zhong Li, and Wolfgang A. Halang, Non-linear Feedback Control of a Novel Chaotic System, International Journal of Control, Automation, and Systems, Vol. 7(Issue 6): 939-944, 2009.

St. Balint, E. Kaslik, A. M. Baltint, and A. Grigis, Methods for Determination and Approximation of the Domain of Attraction in the Case of Autonomous Discrete Dynamical Systems, (Advances in Difference Equations. 2006).

W.U. Fen and Ke Dong, Gain Sheduling Control of LFT Systems using Parameter Dependant Lyapunov Functions, Automatica. Vol.42 (Issue 2): 39-50, 2006.

Seon Ho Lee, and Jong Tea Lim, Fuzzy estimator for gain scheduling and its application to magnetic suspension, Transaction on Control Automation, and Systems Engineering. Vol.3 (Issue 2): 106-110, 2001.

K. Jouili, S. Charfeddine, and H. Jerbi, An advanced geometric approach of input–output linearization for nonlinear control of a CSTR, in: Proc. of EMS 08, European Symposium on Computer Modeling and Simulation, Liverpool, pp. 353–358, 2008.

K. Jouili, H. Jerbi, and N. BenHadj, Braiek, An Advanced Fuzzy Logic Gain Scheduling Trajectory Control for Nonlinear Systems, Journal Process Control. Vol.20 (Issue 4): 426-440, 2010.

Nguyen Thien Hoang, Hoang Duong Tuan, P., Apkarian, S., Hosoe, Gain-Scheduled Filtering for Time-Varying Discrete Systems, IEEE Trans. on Signal Processing. Vol.52 (Issue 9): 2464-2476, 2004.

Shaosheng Zhou, Baoyong Zhang, and Wei Xing Zheng, Gain- Scheduled H∞ Filtering of Parameter-Varying Discrete-Time Systems via Parameter-Dependent Lyapunov Functions, International Journal of Control, Automation, and Systems.Vol.7 (Issue 3):475-479, 2009.

A. Bacha, H. Jerbi, and N. BenHadj, Braiek, On the Synthesis of a Combined Discrete Reversing Trajectory Method for the Asymptotic Stability Region Estimation of Nonlinear Polynomial Systems, Proc. of the 13th IEEE IFAC International Conf. on Methods, Models in Automation and Robotics, IEEE Conf. number 12469, Szczecin, Poland, pp. 243- 248, 2007.

D.A. Lawrence and W.J. Rugh, Gain Scheduling Dynamic Linear Controllers for a Nonlinear Plant, Proc. of the 32nd IEEE conf., 15-17 December , San Antonio, TX, USA, pp. 1024-1029, 1993.

N. BenHadj, Braiek, Determination of Stability Radius for Discrete Nonlinear Systems, Journal of Systems Analysis Modeling and Simulation, SAMS. Vol. 22, pp. 315-322, 1996.

P. Sarma, Multivariable Gain-Scheduled Fuzzy Logic Control of an Exothermic Reactor, Engineering Applications of Artificial Intelligence. Vol.14 (Issue 4): 457–471, 2001.

L.C. Limquecco, and J.C. Kantor, Nonlinear Output Feedback Control of an Exothermic Reactor, Computers Chemical Engineering Science. Vol. 14, pp. 427–437, 1990.

N. BenHadj, Braiek, A Kronecker Product Approach of Stability Domain Determination of Nonlinear Continuous Systems, Journal of Systems Analysis Modeling and Simulation, SAMS. Vol. 22, pp.11-16, 1996.

J.S. Shamma, and M. Athans, Gain Scheduling: Potential Hazards and Possible Remedies, IEEE Control Systems Magazine. Vol. 12(Issue 3): 101–107, 1992.

S. Haugwitz, P. Hagander, and T. Norèn, Modeling and Control of a Novel heat Exchange Reactor, Control Engineering Practice. Vol.15 (Issue 7): 779–792, 2007.

S. Charfeddine and H. Jerbi, Synthesis of Nonlinear Control System for Disturbance Rejection in Periodic Process, 9th International Multi-Conference on Systems, Signals and Devices, SSD, pp. 1-6, 2012.

K.H. McNichols and M.S. Fadli, Selecting Operating Points for Discrete Time Gain Scheduling, Computers and Electrical Engineering. Vol. 29 (Issue 2): 289-301, 2003.

M.W. McConley, B.D. Appleby, M.A. Dahleh, and E. Feron, A Computationally Efficient Lyapunov-Based Scheduling Procedure for Control of Nonlinear Systems with Stability Guarantees, IEEE Trans. on Automatic Control. Vol. 45(Issue 1): 33-49, 2000.

A. Graham, Kronecker Products and Matrix Calculus with Applications, (Chichester: Ellis Herwood).

N. BenHadj, Braiek and H. Jerbi, A Polynomial Approach of Linearizing Control Synthesis for Nonlinear Analytic Systems, Journal of Systems Analysis Modeling and Simulation, SAMS. Vol. 38, pp. 19-28, 2000.

J.P. Garcia-Sandoval, V. Gonzàlez-Alvarez, B. Castillo-Toledo and C. Pelayo-Ortiz, Robust discrete control of nonlinear processes: Application to chemical reactors, Computers and Chemical Engineering. Vol. 32(Issue 12): 3246-3253, 2008.

A. Bacha, H. Jerbi, and N. BenHadj, Braiek, Backward Iteration Approaches for the Stability Domain of Estimation of Discrete Nonlinear Polynomial Systems, International Journal of Modeling, Identification and Control. Vol.5 (Issue 4): 313-319, 2008.

A. Bacha, H. Jerbi, and N. BenHadj, Braiek, Technique of Stability Domain Determination of Nonlinear Discreet Polynomial System, Proc. of the 17th World Congress the International Federation of Automatic Control Seoul, Korea, pp. 8690-8694, 2008.

E. Noldus, and M. Loccfier, A New Trajectory Reversing Method for the Estimation of Asymptotic Stability Regions, International Journal of Control. Vol. 61(Issue 4): 917-932, 1995.

M. Locufier, and E. Noldus, A New Trajectory Reversing Method for Estimating Stability Regions of Autonomous Nonlinear Systems, Nonlinear Dynamics. Vol.21, pp.265-288, 2000.

Samia, C., Houssem, J., Trajectory tracking and disturbance rejection for nonlinear periodic process: A nonlinear gain-scheduling design, (2012) International Review on Modelling and Simulations (IREMOS), 5 (2), pp. 1075-1083.

K. Jouili, M. Charfeddine, and H. Jerbi, Linearizing Control with a Robust Relative Degree Based on Lyapunov Function: Case of the Ball and Beam system, IREMOS: International Review on Modelling and Simulations Vol.3, (Issue 2): 219-226, 2010.