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Abstrakty
In the present paper finite-dimensional dynamical control systems described by semilinear ordinary differential state equations with multiple point delays in control are considered. It is generally assumed, that the values of admissible controls are in a convex and closed cone with vertex at zero. Using so-called generalized open mapping theorem, sufficient conditions for constrained local relative controllability near the origin are formulated and proved. Roughly speaking, it will be proved that under suitable assumptions constrained global relative controllability of a linear associated approximated dynamical system implies constrained local relative controllability near the origin of the original semilinear dynamical system. This is generalization to the constrained controllability case some previous results concerning controllability of linear dynamical systems with multiple point delays in the control and with unconstrained controls. Moreover, necessary and sufficient conditions for constrained global relative controllability of an associated linear dynamical system with multiple point delays in control are discussed. Simple numerical example, which illustrates theoretical considerations is also given. Finally, some remarks and comments on the existing results for controllability of nonlinear dynamical systems are also presented.
Rocznik
Tom
Strony
333--337
Opis fizyczny
Bibliogr. 19 poz.
Twórcy
autor
- Institute of Control Engineering, Silesian University of Technology, 16 Akademicka St., 44-100 Gliwice, Poland
Bibliografia
- [1] E.N. Chukwu, and S.M. Lenhart, “Controllability questions for nonlinear systems in abstract spaces”, J. Optimization Theory and Applications 68 (3), 437–462 (1991).
- [2] J. Klamka, Controllability of Dynamical Systems, Kluwer Academic Publishers, Dordrecht, 1991.
- [3] J. Klamka, “Controllability of dynamical systems-a survey”, Archives of Control Sciences 2 (3/4), 281–307 (1993).
- [4] K. Naito, “Controllability of semilinear control systems dominated by the linear part”, SIAM J. Control and Optimization 25 (3), 715–722 (1987).
- [5] H.X. Zhou, “Controllability properties of linear and semilinear abstract control systems”, SIAM J. Control and Optimization 22 (3), 405–422 (1984).
- [6] J. Klamka, “Constrained controllability of nonlinear systems”, J. Mathematical Analysis and Applications 201 (2), 365–374 (1996).
- [7] G. Peichl and W. Schappacher, “Constrained controllability in Banach spaces”, SIAM J. Control and Optimization 24 (6), 1261–1275 (1986).
- [8] N.K. Son, “A unified approach to constrained approximate controllability for the heat equations and the retarded equations”, J. Mathematical Analysis and Applications 150 (1), 1–19 (1990).
- [9] J. Klamka, “Positive controllability of positive systems with delays”, Proc. 17-th Int. Sym. on Mathematical Theory of Networks and Systems 79, CD-ROM (2006).
- [10] J. Klamka, “Stochastic controllability of linear systems with state delays, Int. J. Applied Mathematics and Computer Science 17 (1), 5–13 (2007).
- [11] J. Klamka, “Stochastic controllability and minimum energy control of systems with delay in control”, Proc. IASTED Int. Conf. on Circuits Systems and Signals, CD-ROM (2007).
- [12] J. Klamka, “Constrained controllability of semilinear systems with multiple delays in control”, Bull. Pol. Ac.: Tech. 52 (1), 25–30 (2004).
- [13] H. Górecki, A. Korytowski, P. Grabowski, and S. Fuksa, Analysis and Synthesis of Time Delay Systems, John Wiley & Sons, London, 1989.
- [14] H. Górecki, A. Korytowski, J.E. Marshall, and K. Walton, Integral Performance Criteria for Time Delay Systems with Applications, Prentice Hall, London,1992.
- [15] S.M. Robinson, “Stability theory for systems of inequalities. Part II. Differentiable nonlinear systems”, SIAM J. on Numerical Analysis 13 (4), 497–513 (1976).
- [16] J. Klamka, “Constrained exact controllability of semilinear systems with delay in control”, Proc. 10 IEEE Int. Conf. on Methods and Models in Automation and Robotic, MMAR-2004, 77–82 (2004).
- [17] J. Klamka, “Constrained controllability of semilinear systems with delay in control”, Proc. of the 17-th Int. Symp. on Mathematical Theory of Networks and Systems, MTNS–2006, CDROM (2006).
- [18] J. Klamka, “Constrained controllability of semilinear systems with variable delay in control”, Proc. XII Int. IEEE Conf. on Methods and Models in Automation and Robotics, MMAR-2006, CD-ROM (2006).
- [19] J. Klamka, Stochastic controllability of linear systems with delay in control, Bull. Pol. Ac.: Tech. 55 (1), 23–29 (2007).
Typ dokumentu
Bibliografia
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bwmeta1.element.baztech-article-BPG8-0011-0006