Abstract
This chapter describes solutions to the earlier described problems of Parts I, II when treated within the realistic class of ordinary functions. These are fast controls—the piecewise-constant approximations of the ideal precursors.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Notes
- 1.
Symbol \(\mathop {\dot{-}}\) denotes the geometric (Minkowski) difference of the sets: \(A \mathop {\dot{-}}B = {\left\{ x \;\big |\; x + B \subseteq A \right\} }\).
References
Basar, T., Bernhard, P.: \(H^{\infty }\) Optimal Control and Related Mini max Design Problems. SCFA. Birkhäuser, Basel (1995)
Daryin, A.N., Kurzhanskii, A.B.: Control synthesis in a class of higher-order distributions. Differ. Equ. 43(11), 1479–1489 (2007)
Daryin, A.N., Kurzhanski, A.B.: Impulse control inputs and the theory of fast controls. In: Proceedings of 17th IFAC World Congress, pp. 4869–4874. IFAC, Seoul (2008)
Daryin, A.N., Minaeva, YuYu.: Approximation of impulse controls by physically realizable fast controls. Comput. Math. Model. 22(3), 278–287 (2011)
Daryin, A.N., Minaeva, YuYu.: Synthesis of impulse and fast controls under uncertainty. Dokl. Math. 84(3), 902–905 (2011)
Evans, L.C., Souganidis, P.E.: Differential games and representation formulas for solutions of Hamilton-Jacobi-Isaacs equations. Indiana Univ. Math. J. 33(5), 773–797 (1984)
Gel’fand, I.M., Shilov, G.E.: Generalized Functions. Volume I: Properties and Operations. Academic Press, New York (1964)
Krasovski, N.N.: Rendezvous Game Problems. National technical information service. Springfield, Massachusetts (1971)
Krasovski, N.N., Subbotin, A.I.: Game-Theoretic Control Problems. Springer, New York (1988)
Kurzhanski, A.B.: Pontryagin’s alternated integral and the theory of control synthesis. Proc. Steklov’s Math. Inst. 224, 234–248 (1999)
Kurzhanski, A.B.: The problem of measurement feedback control. J. Appl. Math. Mech. 68(4), 487–501 (2004)
Kurzhanski, A.B., Daryin, A.N.: Dynamic programming for impulse controls. Ann. Rev. Control 32(2), 213–227 (2008)
Kurzhanski, A.B., Daryin, A.N.: Attenuation of uncertain disturbances through fast control inputs. In: Proceedings of COSY-2011, pp. 49–52. Ohrid, Macedonia (2011)
Leitmann, G.: Optimality and reachability with feedback controls. In: Blaquiere, A., Leitmann, G. (eds.) Dynamical Syatems and Microphysics: Control Theory and Mechanics. Acdemic Press, Orlando (1982)
Neustadt, L.W.: Optimization, a moment problem and nonlinear programming. SIAM J. Control 2(1), 33–53 (1964)
Schwartz, L.: Méthodes mathématiques pour les sciences physiques. Hermann, Paris (1961)
Stengel, R.F.: Optimal Control and Estimation. Dover Pub. Inc., New York (1994)
Vostrikov, I.V., Daryin, A.N., Kurzhanski, A.B.: On the damping of a ladder-type vibration system subjected to uncertain perturbations. Differ. Equ. 42(11), 1524–1535 (2006)
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
Copyright information
© 2020 Springer-Verlag London Ltd., part of Springer Nature
About this chapter
Cite this chapter
Kurzhanski, A.B., Daryin, A.N. (2020). Closed-Loop Fast Controls. In: Dynamic Programming for Impulse Feedback and Fast Controls. Lecture Notes in Control and Information Sciences, vol 468. Springer, London. https://doi.org/10.1007/978-1-4471-7437-0_12
Download citation
DOI: https://doi.org/10.1007/978-1-4471-7437-0_12
Published:
Publisher Name: Springer, London
Print ISBN: 978-1-4471-7436-3
Online ISBN: 978-1-4471-7437-0
eBook Packages: Intelligent Technologies and RoboticsIntelligent Technologies and Robotics (R0)