Optimal Traction Control during High-Speed Maneuvering in Dry Friction Conditions

S. A. Reshmin; Решмин С. А.

doi:10.31857/S0032823523040112

Optimal Traction Control during High-Speed Maneuvering in Dry Friction Conditions

Autores: Reshmin S.¹
Afiliações:
1. Ishlinsky Institute for Problems in Mechanics RAS
Edição: Volume 87, Nº 4 (2023)
Páginas: 604-617
Seção: Articles
URL: https://journals.rcsi.science/0032-8235/article/view/138881
DOI: https://doi.org/10.31857/S0032823523040112
EDN: https://elibrary.ru/MKNJAE
ID: 138881

Citar

Texto integral

Acesso aberto
Acesso é fechado

Acesso está concedido
Acesso é fechado

Somente assinantes

Resumo
Sobre autores
Bibliografia
Arquivos suplementares
Estatísticas

Resumo

The problem of controlling the direction of the traction force during the motion of an inertial object is considered. The maximal possible value of the traction force is constant and is determined by the maximal dry friction force. At a finite time interval, the problem of bringing an object to a given rectilinear trajectory with simultaneous velocity maximization in the appropriate direction is considered.

Palavras-chave

optimal control, maximum principle, bilinear tangent law, dry friction, wheel systems, high-speed maneuver, motion in a plane

Sobre autores

S. Reshmin

Ishlinsky Institute for Problems in Mechanics RAS

Autor responsável pela correspondência
Email: reshmin@ipmnet.ru
Russia, Moscow

Bibliografia

Pontryagin L.S., Boltyanskii V.G., Gamkrelidze R.V., Mishchenko E.F. The Mathematical Theory of Optimal Processes. N.Y.: Gordon&Breach, 1986. xxiv+360 p.
Roitenberg Ya.N. Automatic Control. Moscow: Nauka, 1971. 396 p. (in Russian)
Isaev V.K. L.S. Pontryagins’s maximum principle and optimal programming of rocket thrust // Automation & Remote Control, 1961, vol. 22, no. 8, pp. 881–893.
Bryson A.E., Ho Y.-C. Applied Optimal Control: Optimization, Estimation, and Control. Waltham, Mass.: Blaisdell Pub. Co., 1969. 481 p.
Afanas’ev V.N., Kolmanovskii V.B., Nosov V.R. Mathematical Theory of Control System Design. Moscow: Vysshaya shkola, 2003. 614 p. (in Russian)
Zhuravlev V.Ph. Friction laws in the case of combination of slip and spin // Mech. Solids, 2003, vol. 38, no. 4, pp. 52–58.
Zhuravlev V.Ph. On the dry frictions model in the rigid body dynamics problems // Uspekhi Mekh., 2005, no. 3, pp. 157–168.
Andronov V.V., Zhuravlev V.Ph. Dry Friction in Problems of Mechanics. Moscow; Izhevsk: R&C Dyn., 2010. 184 p. (in Russian)
Zhuravlev V.Ph. Flat dynamics of a homogeneous parallelepiped with dry friction // Mech. Solids, 2021, vol. 56, no. 1, pp. 1–3.
Rozenblat G.M. On optimal rotation of a rigid body by applying internal forces // Dokl. Math., 2022, vol. 106, no. 1, pp. 291–297.
Krasovskii N.N. Game-Theoretic Problems on the Encounter of Motions. Moscow: Nauka, 1970. 420 p. (in Russian)
Reshmin S.A. Synthesis of control of a manipulator with two links // J. Computer & Syst. Sci. Int., 1997, vol. 36, no. 2, pp. 299–303.
Reshmin S.A., Chernousko F.L. Control synthesis in a nonlinear dynamic system based on a decomposition // JAMM, 1998, vol. 62, no. 1, pp. 115–122.
Anan’evskii I.M., Reshmin S.A. Decomposition-based continuous control of mechanical systems // J. Computer & Syst. Sci. Int., 2014, vol. 53, no. 4, pp. 473–486.