Abstract:
We consider the controlled motion in an ideal incompressible fluid of a rigid body with moving internal masses and an internal rotor in the presence of circulation of the fluid velocity around the body. The controllability of motion (according to the Rashevskii–Chow theorem) is proved for various combinations of control elements. In the case of zero circulation, we construct explicit controls (gaits) that ensure rotation and rectilinear (on average) motion. In the case of nonzero circulation, we examine the problem of stabilizing the body (compensating the drift) at the end point of the trajectory. We show that the drift can be compensated for if the body is inside a circular domain whose size is defined by the geometry of the body and the value of circulation.
The work of E.V. Vetchanin (Sections 2, 4 and Conclusions) is supported by the Russian Science Foundation under grant 14-19-01303 and performed at the Kalashnikov Izhevsk State Technical University. The work of A.A. Kilin (Sections 1 and 3) is supported by the Russian Science Foundation under grant 15-12-20035 and performed at the Udmurt State University.
Citation:
E. V. Vetchanin, A. A. Kilin, “Controlled motion of a rigid body with internal mechanisms in an ideal incompressible fluid”, Modern problems of mechanics, Collected papers, Trudy Mat. Inst. Steklova, 295, MAIK Nauka/Interperiodica, Moscow, 2016, 321–351; Proc. Steklov Inst. Math., 295 (2016), 302–332
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