Hostname: page-component-586b7cd67f-t7czq Total loading time: 0 Render date: 2024-11-23T21:51:59.273Z Has data issue: false hasContentIssue false
  • English
  • Français

Linearization and Boundary Trajectories of Nonsmooth Control Systems

Published online by Cambridge University Press:  20 November 2018

H. Frankowska  and
B. Kaśkosz
H. Frankowska
Affiliation:
Université de Paris-Dauphine, Paris, France
B. Kaśkosz
Affiliation:
University of Rhode Island, Kingston, Rhode Island
Rights & Permissions [Opens in a new window]

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

This paper deals with boundary trajectories of non-smooth control systems and differential inclusions.

Consider a control system

(1.1)

and denote by R(t) its reachable set at time t. Let (z, u*) be a trajectory-control pair. If for every t from the time interval [0, 1], z(t) lies on the boundary of R(t) then z is called a boundary trajectory. It is known that for systems with Lipschitzian in x right-hand side, z is a boundary trajectory if and only if z(1) belongs to the boundary of the set R(1). If z is not a boundary trajectory, that is, z(1) ∊ Int R(1) then the system is said to be locally controllable around z at time 1.

A first-order necessary condition for boundary trajectories of smooth systems comes from the Pontriagin maximum principle, (see e.g. [12]).

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 40 , Issue 3 , 01 June 1988 , pp. 589 - 609
Copyright
Copyright © Canadian Mathematical Society 1988

References

1. Aubin, J. P. and Cellina, A., Differential inclusions (Springer-Verlag, 1984).CrossRefGoogle Scholar
2. Clarke, F. H., Nonsmooth analysis and optimization (Wiley Interscience, 1983).Google Scholar
3. Clarke, F. H., The maximum principle under minimal hypotheses, SIAM J. Control Optim. 14 (1976), 10781091.Google Scholar
4. Clarke, F. H., Necessary conditions for a general control problem, Proc. Int. Symp. on the Calculus of Variations and Control Theory (Academic Press, New York, 1976).Google Scholar
5. Ekeland, I., Nonconvex minimization problems, Bull. Am. Math. Soc. 1 (1979), 443474.Google Scholar
6. Frankowska, H., The maximum principle for the differential inclusions with end point constraints, SIAM J. of Control 25 (1987), (to appear).Google Scholar
7. Frankowska, H., Local controllability and infinitesimal generators of semigroups of set-valued maps, SIAM J. of Control, 24 (1986), (to appear).Google Scholar
8. Frankowska, H., Local controllability of control systems with feedback, submitted.CrossRefGoogle Scholar
9. Gamkrelidze, R. V., On some extremal problems in the theory of differential equations with applications to optimal control, SIAM J. of Control 3 (1965), 106128.Google Scholar
10. Kaskosz, B. and Łojasiewicz, S., A maximum principle for generalized control systems, Nonlinear Analysis, Theory, Meth. & Appl. 9 (1985), 109130.Google Scholar
11. LeDonne, A. and Marchi, V., Representations of Lipschitzian compact-convex valued mappings, Lincei-Rend. Sc.fis.mat. e nat. 68 (1980), 278280.Google Scholar
12. Lee, E. B. and Markus, L., Foundation of optimal control theory, (1969), Wiley.Google Scholar
13. Łojasiewicz, S., Lipschitz selections of orientor fields (to appear).Google Scholar
14. McMullen, P. and Schneider, R., Valuations of convex bodies, in Convexity and its applications (Birkhàuser, Basel, 1983).Google Scholar
15. Olech, C., Existence theory in optimal control, Control Theory and Topics in Functional Analysis, 1, Internat. At. Energy Agency, Vienna (1976), 291328.Google Scholar
16. Vitale, R., The Steiner point in infinite dimensions, Israel J. of Math. 52 (1985), 245250.Google Scholar
17. Warga, J., Optimal control of differential and functional equations (Academic Press, New York, 1972).Google Scholar
18. Warga, J., Derivative containers, inverse functions and controllability, Proc. Int. Symp. on the Calculus of Variations and Control Theory (Academic Press, New York, 1976).Google Scholar
19. Warga, J., Optimization and controllability without differentiability assumptions, SIAM J. on Control 21 (1983), 837855.Google Scholar
20. Warga, J., Controllability, extremality and abnormality in nonsmooth optimal control, J. Opt. Theory and Appl. 41 (1983), 239259.Google Scholar