Correction of the optimal regulator based on solving the inverse problem of optimal stabilization with vector control

Objective. The problem of designing controllers that implement a given programmed movement of a controlled object and the problem of determining the movement of a dynamic system are two main problems in classical control theory. This article discusses the solution of direct and inverse optimal stabilization problems. The state vector is assumed to be completely available for measurement.

Method. Based on the optimality ratio linking the weight coefficients of the quadratic quality functional and the optimal gain matrix, which closes the control object, it is proposed to use a numerical method for determining the functional matrices. Mathematical models of autonomous fully controlled objects were used for the study, the formation of which was carried out randomly, in particular, according to the normal distribution law.

Result. The initial stage of the solution is associated with modal synthesis, the result of which is a proportional regulator that provides stabilization of the control object by the location of the poles of the synthesized system. The next step is to determine the weighting coefficients of the functional by numerically solving the optimality ratio. The final stage is the solution of the direct optimal stabilization problem, which is based on the Lagrange variational problem. As a result, the optimal regulator is calculated, which, when switched on in a closed system instead of a modal one, reduces the duration of the transient process.

Conclusion. The proposed approach of the authors allows minimizing to a certain extent the transients of the adjusted control system.

1. Petersen I. R., Hollot C. V. A Riccati equation approach to the stabilization of uncertain linear systems / I. R. Petersen, C. V. Hollot. Automatica. 1986; 22(4): 397-411.

2. Mishin P. A., Nemchinova P. A. Analytical control of solving the problem of optimal stabilization of a stationary object with vector control. E-Scio. 2022;4 (67): 231-238. (In Russ )

3. Mishin P. A., Nemchinova P. A. Analytical control of solving the problem of optimal stabilization of a stationary object with vector control. Mathematics and mathematical modeling. 2022; 377-378. (In Russ )

4. Afonin V. V. Analytical control of solving the problem of optimal stabilization of a stationary object with scalar control. Bulletin of the Mordovian University. 1998;3-4:122-123. (In Russ )

5. Mishin P. A., P. A. Nemchinova. Analysis of the accuracy of calculating the optimal regulator based on the optimality ratio in matlab and Python,. E-Scio. 2022;11 (74):511-518. (In Russ )

6. Afonin V. V., Muryumin S. M. Optimality relations in a linear-quadratic control problem. Journal of the Middle Volga Mathematical Society. 2014;16(2):118-120. (In Russ )

7. Bakhvalov N. S., Zhidkov N. P., Kobelkov G. M. Numerical methods. M.: Binom. Laboratory of Knowledge, 2003; 632. (In Russ )

8. Balashevich N. V., Gabasov R., Kirillova F. M. Numerical methods of software and positional optimization of linear control systems. Journal of Computational Mathematics and Mathematical Physics. 2000; 40(6): 838-859. (In Russ )

9. Kireev V.I., Panteleev A.V. Numerical methods in examples and problems. Higher School,2008;480.(In Russ )

10. Polyak B. T., Shcherbakov P. S. Difficult problems of linear control theory. Some approaches to the solution. Automation and telemechanics. 2005; 5:7-46. (In Russ )

11. S. Boyd, L. El Ghaoui, E. Ferron, V. Balakrishnan. Linear matrix inequalities in system and control theory. SIAM, 1994;193.

12. Polyak B.T., Shcherbakov P.S. Optimization and asymptotic stability. International Journal of Control. 2016; 1–7.

13. Yurevich E. I. Theory of automatic control. M.: Energiya, 1969; 375. (In Russ )

14. Zubov N.E., Ryabchenko V.N. On the calculation of a pseudo-inverse matrix. General case. Bulletin of the Bauman Moscow State Technical University. The series «Natural Sciences». 2018;1 (76):16-25.(In Russ )

15. Germanenko M. I., Panyukov A.V. Parallel algorithms for error-free calculation of the Moore-Penrose matrix. Parallel computing technologies. 2008; 215-215. (In Russ )

16. Veremey E. Spectral approach to H-optimization of plasma control. International Journal of Modern Physics A. 2009; 24(5):1009-1018.

17. Apolonsky V.V., Tararykin S.V. Methods of synthesis of reduced state regulators of linear dynamical systems. Proceedings of the Russian Academy of Sciences.Theory and control systems.2014;6:25-33.(In Russ )

18. Antonik V. G., Urgent V. A. Projection method in linear-quadratic optimal control problems. Journal of Computational Mathematics and Mathematical Physics. 1998; 38 (4): 564-572. (In Russ )

19. Romanova I.K. On one approach to determining the weight coefficients of the state space method. Science and Education: Scientific Edition of Bauman Moscow State Technical University.2015;4:105-129(In Russ )

20. Afonin V. V., Mishin P. A., Mishina P. A. Variational approach to synthesis of optimal regulator in the stabilization problem. E-Scio. 2023;1 (76): 299-315.(In Russ )