A standard optimization principle is used with nonclassical target functions concerned with the generalized work in a method of synthesizing a quasioptimal monitoring and control system for a technical object in the case when there is a lack of adequate mathematical model for the object’s behavior.
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References
A. A. Krasovskii, Analytic Design of Automatic Flight Control Systems [in Russian], Nauka, Moscow (1973).
A. A. Krasovskii,V. N. Bukov, and V. S. Shendrik, Universal Algorithms for Optimal Control of Continuous Processes [in Russian], Nauka, Moscow (1977).
V. N. Brandin, A. A. Vasil’ev, and S. T. Khudyakov, The Principles of Experimental Cosmic Ballistics [in Russian], Mashinostroenie, Moscow (1974).
P. Eichof, Principles of Control-System Identification [Russian translation], Mir, Moscow (1975).
Yu. G. Bulychev, I. V. Burlai, and A. A. Manin, Avtom. Telemekh., No. 7, 37 (1994).
Yu. G. Bulychev, Zh. Vychisl. Matem. Matem. Fiziki, 28, No. 10, 1482 (1988).
Yu. G. Bulychev, Zh. Vychisl. Matem. Matem. Fiziki, 30, No. 9, 1305 (1991).
Yu. G. Bulychev, Zh. Vychisl. Matem. Matem. Fiziki, 34, No. 4, 520 (1994).
Yu. V. Linnik, Least-Squares Fitting and the Principles of Observation Processing Theory [in Russian], Fizmatlit, Moscow (1962).
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Translated from Metrologiya, No. 2, pp. 3–21, February, 2009.
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Bulychev, Y.G., Lapsar, A.P. Technical object monitoring and control under conditions of structural uncertainty with an extended measurement model. Meas Tech 52, 237–249 (2009). https://doi.org/10.1007/s11018-009-9258-7
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DOI: https://doi.org/10.1007/s11018-009-9258-7