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Time-Discretization of Time Delayed Non-Affine System via Taylor-Lie Series Using Scaling and Squaring Technique  

Zhang Yuanliang (School of Electronics and Information Engineering, Chonbuk National University)
Chong Kil-To (School of Electronics and Information Engineering, Chonbuk National University)
Publication Information
International Journal of Control, Automation, and Systems / v.4, no.3, 2006 , pp. 293-301 More about this Journal
Abstract
A new discretization method for calculating a sampled-data representation of a nonlinear continuous-time system is proposed. The proposed method is based on the well-known Taylor series expansion and zero-order hold (ZOH) assumption. The mathematical structure of the new discretization method is analyzed. On the basis of this structure, a sampled-data representation of a nonlinear system with a time-delayed input is derived. This method is applied to obtain a sampled-data representation of a non-affine nonlinear system, with a constant input time delay. In particular, the effect of the time discretization method on key properties of nonlinear control systems, such as equilibrium properties and asymptotic stability, is examined. 'Hybrid' discretization schemes that result from a combination of the 'scaling and squaring' technique with the Taylor method are also proposed, especially under conditions of very low sampling rates. Practical issues associated with the selection of the method parameters to meet CPU time and accuracy requirements are examined as well. The performance of the proposed method is evaluated using a nonlinear system with a time-delayed non-affine input.
Keywords
Non-affine; nonlinear system; scaling and squaring technique; stability; Taylor series; time delay; time discretization;
Citations & Related Records
Times Cited By KSCI : 1  (Citation Analysis)
Times Cited By Web Of Science : 2  (Related Records In Web of Science)
Times Cited By SCOPUS : 1
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1 G. F. Franklin, J. D. Powell, and M. L. Workman, Digital Control of Dynamic Systems, Addison-Wesley, New York, 1998
2 R. J. Vaccaro, Digital Control, McGraw-Hill, New York, 1995
3 N. Kazantzis and C. Kravaris, 'Time-discretization of nonlinear control systems via Taylor methods,' Comp. Chem. Engn,. vol. 23, pp. 763-784, 1999   DOI   ScienceOn
4 J. H. Park, K. T. Chong, N. Kazantzis, and A. G. Parlos, 'Time-discretization of nonlinear systems with delayed multi-input using Taylor series,' KSME International Journal, vol. 18, no. 7, pp. 1107-1120, 2004   DOI
5 N. J. Higham, 'The scaling and squaring method for the matrix exponential revisited,' Numerical Analysis Report 452, Manchester Center for Computational Mathematics, July 2004
6 L. Wei, 'Bounded smooth state feedback and a global separation principle for non-affine nonlinear systems,' Systems & Control Letters, vol. 26, pp. 41-53, 1995   DOI   ScienceOn
7 J. H. Park, K. T. Chong, N. Kazantzis, and A. G Parlos, 'Time-discretization of non-affine nonlinear system with delayed input using Taylorseries,' KSME International Journal, vol. 18, no. 8, pp. 1297-1305, 2004   DOI
8 L. Wei, 'Feedback stabilization of general nonlinear control systems: A passive system approach,' Systems & Control Letters, vol. 25, pp. 41-52, 1995   DOI   ScienceOn
9 L. Grüne and P. E. Kloeden, 'Numerical schemes of higher order for a class of nonlinear control systems,' Lecture Notes in Computer Science, vol. 2542, pp. 213-220, 2002
10 N. Kazantzis, K. T. Chong, J. H. Park, and A. G. Parlos, 'Control-relevant discretization of nonlinear systems with time-delay using Taylor-Lie series,' Proc. of American Control Conference, pp. 149-154, 2003
11 M. Vydyasagar, Nonlinear Systems Analysis, Prentice Hall, Englewood Cliffs, New York, 1978
12 N. Kazantzis and C. Kravaris, 'System-theoretic properties of sampled-data representations of nonlinear systems obtained via Taylor-Lie series,' Int. J. Control., vol. 67, pp. 997-1020, 1997   DOI