Classification of the motions of three bodies in a plane

The problem of the motion of a heavy rigid body, supported on a rough horizontal plane at three of its points, is considered. The contacts at the support points are assumed to be unilateral and subject to the law of dry (Coulomb) friction. The dynamics of possible motions of such a body under the ac

The general (unrestricted) three-body problem is investigated in the case when the force of mutual attraction between the bodies is proportional to the nth power of their distance, where n is an arbitrary real number. A new description is given of the plane problem, based on the introduction of the

The three-dimensional inertial motion of pyramidal bodies, optimal in their depth of penetration, formed from parts of planes tangential to a circular cone and having a base in the form of a rhombus or a star, consisting of four symmetrical cycles, is investigated using the numerical solution of the

The stability of the steady motions by inertia of a combination of three point masses, forming an open chain, is investigated using the Routh-Lyapunov theorem. The problem is investigated in two different formulations: in the first formulation the mean mass is fixed with respect to a thread, and in