In this paper we consider a nonlinear non-autonomous system ordinary differential equations (ODE) and the corresponding Liouville equation. Initial data of the ODE system is random and lie in a given region with a known initial distribution law. For non-linear non-autonomous ODE system introduces the concept of ε is a statistical stability of the solution, which allows us to study the behavior of solutions of the system of ODE’s with nondeterministic initial data. Such a study is carried out using the probability density function of distribution of the ensemble of data points in the ODE system. The notion of ε is a statistical stability of the solution allows to operate directly from the set of trajectories movement of the ODE system, the i...
We investigate the perturbation of the non-linear differential equation dx(t)dt = f(x(t)) by random ...
This paper concerns comparisons between attractors for random dynamical systems and their correspond...
Nonlinear discrete (finite-difference) system of equations subject to the influence of a random dist...
Given a random system, a Liouville’s equation is an exact partial differential equation that descri...
International audienceThe aim of this paper is to study the asymptotic uniform stability in probabil...
The concepts of stability in probability of nontrivial solutions for stochastic nonlinear systems ar...
[EN] In this paper, the first probability density function of the solution stochastic process to ra...
AbstractThe equationx″+a2(t)x=0,a(t):=ak>0if tk−1⩽t<tk(k∈N) is considered where {ak}k=1∞ is given an...
[EN] This paper deals with the explicit determination of the first probability density function of t...
AbstractThe method of Lyapunov functions (Lyapunov's second or direct method) was originally develop...
[EN] Solving a random differential equation means to obtain an exact or approximate expression for t...
PreprintGiven a homogeneous linear discrete or continuous dynamical system, its stability index is g...
The paper deals with finding stationary distributions in normal stochastic (Ito) systems. The stocha...
A common process in ODE theory is to linearize an ODE system about an equilibrium point to determine...
Given a homogeneous linear discrete or continuous dynamical system, its stability index is given by ...
We investigate the perturbation of the non-linear differential equation dx(t)dt = f(x(t)) by random ...
This paper concerns comparisons between attractors for random dynamical systems and their correspond...
Nonlinear discrete (finite-difference) system of equations subject to the influence of a random dist...
Given a random system, a Liouville’s equation is an exact partial differential equation that descri...
International audienceThe aim of this paper is to study the asymptotic uniform stability in probabil...
The concepts of stability in probability of nontrivial solutions for stochastic nonlinear systems ar...
[EN] In this paper, the first probability density function of the solution stochastic process to ra...
AbstractThe equationx″+a2(t)x=0,a(t):=ak>0if tk−1⩽t<tk(k∈N) is considered where {ak}k=1∞ is given an...
[EN] This paper deals with the explicit determination of the first probability density function of t...
AbstractThe method of Lyapunov functions (Lyapunov's second or direct method) was originally develop...
[EN] Solving a random differential equation means to obtain an exact or approximate expression for t...
PreprintGiven a homogeneous linear discrete or continuous dynamical system, its stability index is g...
The paper deals with finding stationary distributions in normal stochastic (Ito) systems. The stocha...
A common process in ODE theory is to linearize an ODE system about an equilibrium point to determine...
Given a homogeneous linear discrete or continuous dynamical system, its stability index is given by ...
We investigate the perturbation of the non-linear differential equation dx(t)dt = f(x(t)) by random ...
This paper concerns comparisons between attractors for random dynamical systems and their correspond...
Nonlinear discrete (finite-difference) system of equations subject to the influence of a random dist...