Summary
The above problem can serve as a basis for finding optimum versions of newly designed regulators (according to a given quality criterion). The number of independent variables can be changed. The search region can also be changed accordingly. It is possible, after solving the problem with respect to one quality criterion, to solve it for another criterion, preserving the first one at the same time within the required limits.
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Literature cited
V. A. Shpolyanskii, B. M. Chernyagin, and V. I. Denisov, Collection: Watches and Watch Mechanisms, No. 5 [in Russian] (1964).
V. A. Shpolyanskii, B. M. Chernyagin, and V. I. Denisov, Collection: Watches and Watch Mechanisms, No. 5 [in Russian] (1963).
J. B. Dennis, Mathematical Programming and Electrical Circuits [Russian translation], IL, Moscow (1961).
S. Carlin, Mathematical Methods in the Theory of Games, Programming, and Economics [Russian translation], Izd. “Mir,” Moscow (1964).
E. D. But, Digital Methods [in Russian], Fizmatgiz, Moscow (1959).
G. Zoitendeyck, Possible-Directions Methods [Russian translation], IL, Moscow (1963).
I. B. Motskus, A. V. Alishauskas, and F. P. Yushka, Zh. vychis. mat. i mat. fiz.,2, 5 (1962).
I. B. Motskus, Tekhnicheskaya kibernetika, No. 3 (1965).
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Prokhorov, V.A. Optimization of the design parameters of a tuning-fork escapement regulator. Meas Tech 9, 1281–1284 (1966). https://doi.org/10.1007/BF00988739
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DOI: https://doi.org/10.1007/BF00988739