Reverse motions of mechanical systems

A method of constructing and classifying all symmetric periodic motions of a revers~le mechanical system is proposed. The principal solution of the above problem is given for the Hill problem, the restricted three-body problem (including the photogravitational problem), the problem of a heavy rigid

A reversible mechanical system which allows of first integrals is studied. It is established that, for symmetric motions, the constants of the asymmetric integrals are equal to zero. The form of the integrals of a reversible linear periodic system corresponding to zero characteristic exponents and t

A theory of the symmetric periodic motions (SPMs) of a reversible second-order system is presented which covers both oscillations and rotations. The structural stability property of the generating autonomous reversible system, which lies in the fact that the presence or absence of SPMs in a perturbe

Autonomous systems or systems that are periodic with respect to the independent variable t, specified on R t x ~n (Tn is a torus of dimension n) are considered. In this paper 2nk-periodic rotational motions (including oscillatory motions), closed on R t x ~ (in a time A t = 2nk, k ~ N, for a system