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pro vyhledávání: '"B. I. Konosevich"'
Autor:
B. I. Konosevich, Yu. B. Konosevich
Publikováno v:
Mechanics of Solids. 57:1830-1847
Autor:
B. I. Konosevich, Yu. B. Konosevich
Publikováno v:
Mechanics of Solids. 56:40-54
This article is the second part of the work, published in the form of two articles. The case, which remained unexplored in the first part, is considered, when for an unperturbed value of the constant of the cyclic integral, the mechanical reduced pot
Autor:
B. I. Konosevich, Yu. B. Konosevich
Publikováno v:
Mechanics of Solids. 55:258-272
We study the dynamics of a gimbal-mounted gyroscope, which has a vertical external gimbal axis and is equipped with a synchronous electric drive that rotates a gyroscope (electric motor rotor). A mathematical model of the electric motor that includes
Autor:
B. I. Konosevich, Yu. B. Konosevich
Publikováno v:
Mechanics of Solids. 49:361-369
We consider an unbalanced gimbal gyro with vertical outer suspension axis mounted on an immovable base in the gravity field and supplied with an electric motor. The equations of motion of such a system admit a family of solutions describing its stead
Autor:
B. I. Konosevich
Publikováno v:
International Applied Mechanics. 50:446-458
The error of the Wentzel–Kramers–Brillouin solution of the equations describing the angular motion of the axis of symmetry of rotation of a rigid body (projectile) is estimated. It is established that order of this estimate does not depend on whe
Autor:
B. I. Konosevich, Yu. B. Konosevich
Publikováno v:
Mechanics of Solids. 48:285-297
A gimbal gyro on an immovable base in the gravity field and with vertical outer suspension axis is considered. The rotor is driven by an asynchronous or synchronous electric motor, and there is no friction or any controlling torques on the suspension
Autor:
A. O. Ignat'ev, B. I. Konosevich
Publikováno v:
Ukrainian Mathematical Journal. 51:1448-1453
We consider a system of ordinary autonomous differential equations that has an invariant set. We obtain sufficient conditions for the stability of this system under constantly acting perturbations.
Autor:
B. I. Konosevich, L. G. Lobas
Publikováno v:
Soviet Applied Mechanics. 8:460-461