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Russia Moscow
Year
2017
Volume
27
Issue
3
Pages
414-430
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Section Mechanics
Title Modeling of the Ball and Beam system dynamics as a nonlinear mechatronic system with geometric constraint
Author(-s) Krasinskii A.Ya.a, Il'ina A.N.b, Krasinskaya E.M.c
Affiliations Moscow State University of Food Productiona, Moscow Aviation Instituteb, Bauman Moscow State Technical Universityc
Abstract The Ball and Beam system with a nonlinear geometric constraint is considered. Two possible equilibrium positions of this system are found from the complete constraint equation. The structures of the equations of disturbed motion are analyzed in a neighborhood of the equilibrium positions, using equations without Lagrange multipliers in the form of M.F. Shul'gin. The possibility of linearization of the constraint equation is discussed. The stabilization problem is solved for every equilibrium position and two possible variants of the redundant coordinate. Stabilizing control (voltage at the armature of the drive motor) is calculated via solving linear-quadratic problems by N.N.Krasovsky's method for corresponding control subsystems. The coincidence of controls as time functions for the same equilibrium is shown for different choices of the redundant coordinate, and the stabilizing controls are linear functions of different phase variables. The graphs of transient processes in systems closed by the obtained controls are given. The asymptotic stability of both equilibrium positions in a complete nonlinear closed system follows from the previously proved theorem on asymptotic stability in the presence of zero roots of the characteristic equation corresponding to redundant coordinates.
Keywords geometric constraints, redundant coordinate, M.F. Shul'gin's equations of motion, Ball and Beam, stability, stabilization, equilibrium
UDC 531.36
MSC 70Q05, 70E50, 70H14
DOI 10.20537/vm170310
Received 16 August 2017
Language Russian
Citation Krasinskii A.Ya., Il'ina A.N., Krasinskaya E.M. Modeling of the Ball and Beam system dynamics as a nonlinear mechatronic system with geometric constraint, Vestnik Udmurtskogo Universiteta. Matematika. Mekhanika. Komp'yuternye Nauki, 2017, vol. 27, issue 3, pp. 414-430.
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