On construction of a field of forces along given trajectories in the presence of random perturbations
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KU Publ.
Abstract
In this paper, a force field is constructed along a given integral manifold in the presence of random perturbing
forces. In this case, two types of integral manifolds are considered separately: 1) trajectories that depend
on generalized coordinates and do not depend on generalized velocities, and 2) trajectories that depend on
both generalized coordinates and generalized velocities. The construction of the force field is carried out
in the class of second-order stochastic Ito differential equations. It is assumed that the functions in the
right-hand sides of the equation must be continuous in time and satisfy the Lipschitz condition in generalized
coordinates and generalized velocities. Also this functions satisfy the condition for linear growth in
generalized coordinates and generalized velocities.These assumptions ensure the existence and uniqueness
up to stochastic equivalence of the solution to the Cauchy problem of the constructed equations in the
phase space, which is a strictly Markov process continuous with probability 1. To solve the two posed
problems, stochastic differential equations of perturbed motion with respect to the integral manifold are
constructed. Moreover, in the case when the trajectories depend on generalized coordinates and do not
depend on generalized velocities, the second order equations of perturbed motion are constructed, and
in the case when the trajectories depend on both generalized coordinates and generalized velocities, the
first order equations of perturbed motion are constructed. And further, in both cases by Erugin’s method
necessary and sufficient conditions for solving the posed problems are derived.
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Citation
Tleubergenov M.I. On construction of a field of forces along given trajectories in the presence of random perturbations/M.I. Tleubergenov, G.K. Vassilina, G.A. Tuzelbaeva//Қарағанды университетінің хабаршысы. Математика сериясы.= Вестник Карагандинского университета. Серия Математика. = Bulletin of the Karaganda University. Mathematics Series. -2021. №1. Р.98-103.