A number of random processes in various fields of science is described by phenomenological equations of motion containing stochastic forces, the best known example being the Langevin equation (LE) for the Brownian motion (BM) of particles. Long ago Vladimirsky (1942) in a little known paper proposed a simple method for solving such equations. The method, based on the classical Gibbs statistics, consists in converting the stochastic LE into a deterministic equation for the mean square displacement of the particle, and is applicable to linear equations with any kind of memory in the dynamics of the system. This approach can be effectively used in solving many of the problems currently considered in the literature. We apply it to the descripti...
In the frames of classical mechanics, the generalized Langevin equation is derived for an arbitrary ...
Memory effects are a key feature in the description of the dynamical systems governed by the general...
In many branches of physics, one must often deal with processes involving a huge number of degrees o...
A number of random processes in various fields of science is described by phenomenological equations...
The experimental access to short timescales has pointed to the inadequacy of the standard Langevin t...
The Langevin equation was proposed in 1908 by Paul Langevin, to describe Brownian motion, that is th...
Starting from a Langevin equation with memory describing the attraction of a particle to a...
International audienceCan Brownian motion arise from a deterministic system of particles? This paper...
An analysis of Brownian motion based upon a ''Langevin equation'' form of Newton's second law provid...
We propose an approach for generation of deterministic Brownian motion. By adding an additional degr...
This paper presents the results of the estimations made in the process arising from the solution of ...
In the present work the generalized Langevin equation is solved for the motion of a charged Brownian...
In this paper we revisit the Brownian motion on the basis of the fractional Langevin equation which ...
We start by considering the Brownian motion of a large spherical particle of mass M immersed in a no...
The increasingly widespread occurrence in complex fluids of particle motion that is both Brownian an...
In the frames of classical mechanics, the generalized Langevin equation is derived for an arbitrary ...
Memory effects are a key feature in the description of the dynamical systems governed by the general...
In many branches of physics, one must often deal with processes involving a huge number of degrees o...
A number of random processes in various fields of science is described by phenomenological equations...
The experimental access to short timescales has pointed to the inadequacy of the standard Langevin t...
The Langevin equation was proposed in 1908 by Paul Langevin, to describe Brownian motion, that is th...
Starting from a Langevin equation with memory describing the attraction of a particle to a...
International audienceCan Brownian motion arise from a deterministic system of particles? This paper...
An analysis of Brownian motion based upon a ''Langevin equation'' form of Newton's second law provid...
We propose an approach for generation of deterministic Brownian motion. By adding an additional degr...
This paper presents the results of the estimations made in the process arising from the solution of ...
In the present work the generalized Langevin equation is solved for the motion of a charged Brownian...
In this paper we revisit the Brownian motion on the basis of the fractional Langevin equation which ...
We start by considering the Brownian motion of a large spherical particle of mass M immersed in a no...
The increasingly widespread occurrence in complex fluids of particle motion that is both Brownian an...
In the frames of classical mechanics, the generalized Langevin equation is derived for an arbitrary ...
Memory effects are a key feature in the description of the dynamical systems governed by the general...
In many branches of physics, one must often deal with processes involving a huge number of degrees o...