On the Hadamard-Hamel problem and the dynamics of wheeled vehicles. (English. Russian original) Zbl 1367.70034
Regul. Chaotic Dyn. 20, No. 6, 752-766 (2015); translation in Nelineĭn. Din. 12, No. 1, 145-163 (2016).
Summary: In this paper, we develop the results obtained by J. Hadamard and G. Hamel concerning the possibility of substituting nonholonomic constraints into the Lagrangian of the system without changing the form of the equations of motion. We formulate the conditions for correctness of such a substitution for a particular case of nonholonomic systems in the simplest and universal form. These conditions are presented in terms of both generalized velocities and quasi-velocities. We also discuss the derivation and reduction of the equations of motion of an arbitrary wheeled vehicle. In particular, we prove the equivalence (up to additional quadratures) of problems of an arbitrary wheeled vehicle and an analogous vehicle whose wheels have been replaced with skates. As examples, we consider the problems of a one-wheeled vehicle and a wheeled vehicle with two rotating wheel pairs.
MSC:
| 70F25 | Nonholonomic systems related to the dynamics of a system of particles |
| 37J60 | Nonholonomic dynamical systems |
| 37N05 | Dynamical systems in classical and celestial mechanics |
| 70E55 | Dynamics of multibody systems |
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