Abstract
Using regularization procedures, the problem of identification of the parameters of nonlinear objects with minimal a priori information on the probabilistic characteristics of the measurement noise and disturbandes is solved on the basis of the conception of the inverse problems of dynamics. The algorithm which is obtained remains stable in the presence of errors in the input data and is oriented towards the contemporary capabilities of computer engineering. Results of a numerical experiment are presented.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Krut’ko, P.D., Obratnye zadachi dinamiki upravlyaemykh sistem. Nelineinye modeli (Inverse Problems of the Dynamics of Controlled Systems. Nonlinear Models), Moscow: Nauka, 1988.
Tikhonov, V.I. and Kul’man, N.K., Nelineynaya filtratsiya i kvazikogerentnyi priem signalov (Nonlinear Filtration and Quasi-Coherent Signal Reception), Moscow: Nauka, 1975.
Vapnik, V.N., Vosstanovlenie zavisimostei po empiricheskim dannym (Establishing Relations from Empirical Data), Moscow: Nauka, 1979.
Tikhonov, A.N. and Ufimtsev, M.V., Statisticheskaya obrabotka rezul’tatov eksperimentov (Statistical Processing of the Results of Experiments), Moscow: Izd-vo Moscow State University, 1988.
Tikhonov, A.N. and Arsenin, V.Ya., Metody reshenii nekorrektnykh zadach (Solution Methods for Ill-Posed Problems), Moscow: Nauka, 1986.
Burlai, I.V., Regular Methods of Estimating the State of Objects in Dynamical and Kinematic Formulations, Teor. sistemy upravleniya, 2000, no. 3.
Sage, A. and Melsa, J., Estimation Theory with Application to Communications and Control, New York: McGraw-Hill, 1971.
Sage, A. and Melsa, J., System Identification, New York: Academic Press, 1971.
Lebedev, A.A. and Gerasyuta, N.F., Ballistika raket (Ballistics of Rockets), Moscow: Mashinostroenie, 1970.
Yaroshevskii, V.A., Vkhod v atmosfery kosmicheskikh letatel’nykh apparatov (Entry of Space Vehicles into the Earth’s Atmosphere), Moscow: Nauka, 1988.
Author information
Authors and Affiliations
Additional information
Original Russian Text © I.V. Burlai, M.A. Titov, 2007, published in Avtomatika i Vychislitel’naya Tekhnika, 2007, No. 2, pp. 16–25.
About this article
Cite this article
Burlai, I.V., Titov, M.A. Regularization of problem of processing measurement data under conditions of a priori uncertainty. Aut. Conrol Comp. Sci. 41, 68–75 (2007). https://doi.org/10.3103/S0146411607020022
Received:
Issue Date:
DOI: https://doi.org/10.3103/S0146411607020022