A. S. Antipin, O. O. Vasilieva, “Dynamic method of multipliers in terminal control”, Zh. Vychisl. Mat. Mat. Fiz., 55:5 (2015), 776–797; Comput. Math. Math. Phys., 55:5 (2015), 766

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Zhurnal Vychislitel'noi Matematiki i Matematicheskoi Fiziki, 2015, Volume 55, Number 5, Pages 776–797
DOI: https://doi.org/10.7868/S0044466915050051 (Mi zvmmf10201)

This article is cited in 10 scientific papers (total in 10 papers)

Dynamic method of multipliers in terminal control

A. S. Antipin^ab, O. O. Vasilieva^ba

^a Dorodnicyn Computing Center, Federal Research Center "Computer Science and Control" of Russian Academy of Sciences, ul. Vavilova 40, Moscow, 119333, Russia
^b Department of Mathematics, Universidad del Valle, 100-00 Calle 13, Cali, 760032, Colombia

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DOI: https://doi.org/10.7868/S0044466915050051

Abstract: A method for solving the terminal control problem with a fixed time interval and fixed initial conditions is proposed. The solution to the boundary value problem posed at the right end of the time interval determines the terminal conditions. This boundary value problem is a finite-dimensional convex programming problem. The dynamics of the terminal control problem is described by a linear controllable system of differential equations. This system is interpreted as a conventional system of linear equality constraints. Then the terminal control problem can be regarded as a dynamic convex programming problem posed in an infinite-dimensional functional Hilbert space. In this paper, the functional problem is treated as a saddle-point problem rather than optimization problem. Accordingly, a saddle-point approach to solving the problem is proposed. This approach is based on maximizing the dual function generated by the modified Lagrangian function of the convex programming problem posed in the functional space. The convergence of the proposed methods is also proved in the functional space. This convergence has the additional property of being monotone in norm with respect to controls, phase trajectories, adjoint functions, as well as finite-dimensional terminal variables.

Key words: linear problem, terminal control, Lagrangian function, modified Lagrangian function, saddle-point method, convergence.

Received: 11.11.2014

English version:
Computational Mathematics and Mathematical Physics, 2015, Volume 55, Issue 5, Pages 766–787
DOI: https://doi.org/10.1134/S096554251505005X

Bibliographic databases:

Document Type: Article

UDC: 519.626

MSC: Primary 49M27; Secondary 49M05

Language: Russian

Citation: A. S. Antipin, O. O. Vasilieva, “Dynamic method of multipliers in terminal control”, Zh. Vychisl. Mat. Mat. Fiz., 55:5 (2015), 776–797; Comput. Math. Math. Phys., 55:5 (2015), 766–787

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Linking options:

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This publication is cited in the following 10 articles:

Anatoly Antipin, Elena Khoroshilova, Lecture Notes in Computer Science, 13781, Optimization and Applications, 2022, 108
Anatoly Antipin, Elena Khoroshilova, Lecture Notes in Computer Science, 13078, Optimization and Applications, 2021, 151
A. S. Antipin, E. V. Khoroshilova, “Dynamics, phase constraints, and linear programming”, Comput. Math. Math. Phys., 60:2 (2020), 184–202
A. Antipin, E. Khoroshilova, “Controlled dynamic model with boundary-value problem of minimizing a sensitivity function”, Optim. Lett., 13:3, SI (2019), 451–473
A. S. Antipin, V. Jaćimović, M. Jaćimović, “Dynamics and variational inequalities”, Comput. Math. Math. Phys., 57:5 (2017), 784–801
E. Khoroshilova, “Minimizing a sensitivity function as boundary-value problem in terminal control”, 2017 Constructive Nonsmooth Analysis and Related Topics, CNSA 2017, Dedicated to the Memory of V. F. Demyanov, ed. L. Polyakova, IEEE, 2017, 149–151
Elena Khoroshilova, 2017 Constructive Nonsmooth Analysis and Related Topics (dedicated to the memory of V.F. Demyanov) (CNSA), 2017, 1
A. Antipin, E. Khoroshilova, “On methods of terminal control with boundary-value problems: lagrange approach”, Optimization and Its Applications in Control and Data Sciences: in Honor of Boris T. Polyak'S 80Th Birthday, Springer Optimization and Its Applications, 115, ed. B. Goldengorin, Springler, 2016, 17–49
A. S. Antipin, E. V. Khoroshilova, “Mnogokriterialnaya kraevaya zadacha v dinamike”, Tr. IMM UrO RAN, 21, no. 3, 2015, 20–29
Anatoly S. Antipin, Elena V. Khoroshilova, “Linear programming and dynamics”, Ural Math. J., 1:1 (2015), 3–19

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

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