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Analysis and synthesis of control systems
Quasi-terminal controllers synthesis
V. K. Zavadsky, V. P. Ivanov, E. B. Kablova, L. G. Clenovaya V.A. Trapeznikov Institute of Control Sciences of Russian Academy of Sciences, Moscow, Russia
Abstract:
In the class of linear algorithms of linear stationary multi-connected objects control the subclass is distinguished of quasi-terminal algorithms with implicit aiming at the boundary conditions moving along the program of the required change of the state vector coordinates and being at a fixed interval from the current time. Aiming is realized by calculating the programs of changing the future control vector components in the form of power series segments that depend on the future time and provide a solution of the two-point boundary value problem. In idealized model conditions of the complete controllability and the availability of an accurate information about the control object state and equations, as well as of the instantaneous and accurate implementation of the calculated commands, the quasi-terminal algorithm provides the asymptotic stability of a closed multi-connected system and as high pre-set rate of transients convergence as needed, regardless of whether the control object model is stable. The relatively simple and easy to implement in MATLAB non-optimization method of algorithm synthesis is suggested based on the use of the matrix representation of the control object model in the state space and of the apparatus of exponential functions of matrices. Quasi-terminal algorithms can be used in multi-connected stabilization systems and, in particular, in stabilization systems of mobile terminal objects with respect to trajectories calculated by the terminal control system.
Keywords:
terminal control, predictive model, asymptotic stability.
Received: 28.12.2017 Revised: 05.04.2019 Accepted: 28.05.2019
Citation:
V. K. Zavadsky, V. P. Ivanov, E. B. Kablova, L. G. Clenovaya, “Quasi-terminal controllers synthesis”, Probl. Upr., 2019, no. 5, 29–36
Linking options:
https://www.mathnet.ru/eng/pu1155 https://www.mathnet.ru/eng/pu/v5/p29
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