Abstract
We study the input tracking problem for a parabolic equation on an infinite time interval on the basis of the measurement of phase coordinates. We suggest an algorithm stable under information noises and roundoff errors for the solution of the problem on the basis of constructions of dynamic inversion theory.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Osipov, Yu.S. and Kryazhimskii, A.V., Inverse Problems for Ordinary Differential Equations: Dynamical Solutions, Basel, 1995.
Osipov, Yu.S., Vasil’ev, F.P., and Potapov, M.M., Osnovy metoda dinamicheskoi regulyarizatsii (Foundations of the Method of Dynamic Regularization), Moscow, 1999.
Osipov, Yu.S., Kryazhimskii, A.V., and Maksimov, V.I., Metody dinamicheskogo vosstanovleniya vkhodov upravlyaemykh sistem (Methods of Dynamic Reconstruction of Inputs of Control Systems), Ekaterinburg, 2011.
Maksimov, V.I., Zadachi dinamicheskogo vosstanovleniya vkhodov beskonechnomernykh sistem (Problems of Dynamic Reconstruction of Inputs of Infinite-Dimensional Systems), Ekaterinburg, 2000.
Krasovskii, N.N. and Subbotin, A.I., Pozitsionnye differentsial’nye igry (Positional Differential Games), Moscow: Nauka, 1974.
Grigorenko, N.L., Matematicheskie metody upravleniya neskol’kimi dinamicheskimi protsessami (Mathematical Control Methods for Several Dynamical Systems), Moscow, 1990.
Izbrannyetrudy Yu.S. Osipova (Selected Works by Yu.S. Osipov), Moscow, 2009.
Luk’yanova, L.N., Zadacha ukloneniya ot stolknoveniya. Lineinaya teoriya i prilozheniya (Problem of Deviation from Impact. Linear Theory and Applications), Moscow, 2009.
Maksimov, V.I., The Tracking of the Trajectory of a Dynamical System, J. Appl. Math. Mech., 2011, vol. 75, no. 6, pp. 667–674.
Kryazhimskiy, A.V. and Maksimov, V.I., Resource-Saving Tracking Problem with Infinite Time Horizon, Differ. Equ., 2011, vol. 47, no. 7, pp. 1004–1013.
Blizorukova, M.S. and Maksimov, V.I., On Reconstruction of an Input of a Parabolic Equation on an Infinite Time Interval, Russ. Math., 2014, vol. 58, no. 8, pp. 24–34.
Maksimov, V.I., Regularized Extremal Shift in Problems of Stable Control, IFIP Adv. in Inform. Commun. Technology, 2013, vol. 391 AICT, pp. 112–121.
Maksimov, V.I., Regularized Extremal Shift in Problems of Stable Control, in System Model. Optim., 2012, pp. 112–121.
Akca, H. and Maksimov, V., On Tracking of Solutions of Parabolic Variational Inequalities, TWMS J. Eng. Math., 2012, vol. 2, no. 2, pp. 185–194.
Krasovskii, N.N., Nekotorye zadachi teorii ustoichivosti dvizheniya (Certain Problems in the Theory of Stability of Motion), Moscow: Gosudarstv. Izdat. Fiz.-Mat. Lit., 1959.
Banks, H.T. and Kappel, F., Spline Approximation for Functional-Differential Equations, J. Differential Equations, 1979, vol. 34, no. 3, pp. 496–522.
Bernier, C. and Manitius, A., On Semigroups in R n × L p Corresponding to Differential Equations with Delays, Canad. J. Math., 1978, vol. 14, pp. 897–914.
Author information
Authors and Affiliations
Corresponding author
Additional information
Original Russian Text © M.S. Blizorukova, V.I. Maksimov, 2016, published in Differentsial’nye Uravneniya, 2016, Vol. 52, No. 8, pp. 1082–1092.
Rights and permissions
About this article
Cite this article
Blizorukova, M.S., Maksimov, V.I. Input tracking for a parabolic equation on an infinite time interval. Diff Equat 52, 1043–1053 (2016). https://doi.org/10.1134/S0012266116080103
Received:
Published:
Issue Date:
DOI: https://doi.org/10.1134/S0012266116080103