Abstract
We consider an approach to the estimation of attainability sets of a control system for solving various control problems. The approach is based on two types of extension of the system, by weakening the finite constraints describing the set of velocities and by diminishing the order of the differential constraint. By combining extensions of both types, one can obtain a sufficiently wide class of estimates from which one can then choose the most effective estimates from the viewpoint of accuracy or simplicity.
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Kurzhanskii, A.B., Upravlenie i nablyudenie v usloviyakh neopredelennosti (Control and Observation Under Conditions of Indeterminacy), Moscow: Nauka, 1977.
Kurzhanski, A.B. and Varaiya, P., On Ellipsoidal Techniques for Reachability Analysis, Optim. Methods Softw., 2002, vol. 17, pp. 177–206.
Kurzhanskii, A.B. and Dar’in, A.N., Synthesis of Controls in the Class of Generalized Higher-Order Functions, Differ. Uravn., 2007, vol. 43, no. 11, pp. 1443–1453.
Kurzhanskii, A.B. and Tochilin, P.A., Weakly Invariant Sets of Hybrid Systems, Differ. Uravn., 2008, vol. 44, no. 11, pp. 1523–1533.
Gurman, V.I., Printsip rasshireniya v zadachakh upravleniya (The Extension Principle in Control Problems), Moscow: Nauka, 1997.
Veliov, V., Second Order Discrete Approximations to Strongly Convex Differential Inclusions, Systems Control Lett., 1989, vol. 13, pp. 263–269.
Gurman, V.I., Trushkova, E.A., and Blinov, A.O., Approximate Optimization of the Control on the Basis of Transformations of the Plant Model, Avtomat. i Telemekh., 2009, no. 5, pp. 13–23.
Gurman, V.I. and Sachkov, Yu.L., Representation and Realization of Generalized Solutions of Controlled Systems with an Unbounded Hodograph, Avtomat. i Telemekh., 2008, no. 4, pp. 72–80.
Gurman, V.I. and Ni, Min’ Kan’, Realization of Sliding Modes as Generalized Solutions of Optimal Control Systems, Differ. Uravn., 2008, vol. 44, no. 3, pp. 51–59.
Khrustalev, M.M., An Accurate Description of Reachibility Sets and Conditions for the Global Optimality of Dynamical Systems, Avtomat. i Telemekh., 1988, no. 5, pp. 62–70.
Chernous’ko, F.L., Otsenivanie fazovogo sostoyaniya dinamicheskikh sistem. Metod ellipsov (Estimation of the Phase State of Dynamical Systems. The Method of Ellipsoids), Moscow: Nauka, 1988.
Konstantinov, G.N. and Sidorenko, G.V., External Estimates for the Attainability Sets of Controlled Systems, Izv. Akad. Nauk SSSR Tekhn. Kibernet., 1986, no. 3, pp. 28–34.
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Original Russian Text © V.I. Gurman, E.A. Trushkova, 2009, published in Differentsial’nye Uravneniya, 2009, Vol. 45, No. 11, pp. 1601–1609.
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Gurman, V.I., Trushkova, E.A. Estimates for attainability sets of control systems. Diff Equat 45, 1636–1644 (2009). https://doi.org/10.1134/S0012266109110093
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DOI: https://doi.org/10.1134/S0012266109110093