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Viability Kernels and Control Sets

Published online by Cambridge University Press:  15 August 2002

Dietmar Szolnoki*
Affiliation:
Universität Augsburg, Institut für Mathematik, Universitätsstraße 14, 86135 Augsburg, Germany; [email protected].
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Abstract

This paper analyzes the relation of viability kernels and control sets of control affine systems. A viability kernel describes the largest closed viability domain contained in some closed subset Q of the state space. On the other hand, control sets are maximal regions of the state space where approximate controllability holds. It turns out that the viability kernel of Q can be represented by the union of domains of attraction of chain control sets, defined relative to the given set Q. In particular, with this result control sets and their domains of attraction can be computed using techniques for the computation of attractors and viability kernels.

Type
Research Article
Copyright
© EDP Sciences, SMAI, 2000

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References

J.-P. AUBIN, Viability Theory. Birkhäuser (1991).
Infinite, F. COLONIUS AND W. KLIEMANN time optimal control and periodicity. Appl. Math. Optim. 20 (1989) 113-130.
height 2pt depth -1.6pt width 23pt, Some, aspects of control systems as dynamical systems. J. Dynam. Differential Equations 5 (1993) 469-494.
height 2pt depth -1.6pt width 23pt, The Dynamics of Control. Birkhäuser (2000) to appear.
HOHMANN, M. DELLNITZ AND A., A subdivision algorithm for the computation of unstable manifolds and global attractors. Numer. Math. 75 (1997) 293-317.
G. HÄCKL, Reachable Sets, Control Sets and Their Computation. Dissertation, Universität Augsburg, ``Augsburger Mathematische Schriften Band 7" (1996).
W. KLIEMANN, Qualitative Theorie Nichtlinearer Stochastischer Systeme. Dissertation, Universität Bremen (1980).
H. NIJMEIJER AND A.J. VAN DER SCHAFT, Nonlinear Dynamical Control Systems. Springer-Verlag (1990).
Approximation, P. SAINT-PIERRE of the viability kernel. Appl. Math. Optim. 29 (1994) 187-209.
height 2pt depth -1.6pt width 23pt, Set-valued numerical analysis for optimal control and differential games (1998) to appear.
D. SZOLNOKI, Berechnung von Viabilitätskernen. Diplomarbeit, Institut für Mathematik, Universität Augsburg, Augsburg (1997).
UPPAL, A., On, W.H. RAY AND A.B. POORE the dynamic behavior of continuous stirred tank reactors. Chem. Engrg. Sci. 19 (1974) 967-985. CrossRef