We analyze diffusion in a finite domain with a position-dependent diffusion coefficient in terms of a stochastic hopping process. Via a coordinate transformation, we map the original system onto a problem with constant diffusion but nontrivial potential. In this way we show that a regime with enhanced diffusion acts as a potential barrier. We compute first-passage time distributions, hopping rates, and eigenvalues of the Fokker-Planck operator, and thereby verify that diffusion with a heat barrier is equivalent to a hopping process between metastable states
We study the real time dynamics of a quantum system with potential barrier coupled to a heat-bath en...
We study the emergence of diffusion for a quantum particle moving in a finite and translationally in...
We characterize the locked-to-running transition of a Brownian particle in a tilted washboard potent...
We analyze diffusion in a finite domain with a position-dependent diffusion coefficient in terms of ...
We use the Fokker-Planck equation to study the diffusion process driven for a metastable potential w...
We study two important aspects of the diffusion of a free particle in the presence of a time-depende...
Employing time-dependent projection formalism, a Fokker-Planck equation with non-Markovian transport...
The localized function formalism, introduced to transform diffusion equations with multistable poten...
This paper deals with the problem of a particle that diffuses in a potential with a reflecting barri...
We show that the hopping dynamics of two strongly connected particles can be mapped exactly to singl...
International audienceDynamics of a particle diffusing in a confinement can be seen a sequence of bu...
The random walk numerical simulation (RWNS) method is used to compute diffusion coefficients for ho...
Abstract. We consider a point particle moving in a random distribution of obstacles described by a p...
The one-dimensional overdamped Brownian motion in a symmetric periodic potential modulated by extern...
This paper presents a study of the behavior of a one-dimensional system, with two potential minima s...
We study the real time dynamics of a quantum system with potential barrier coupled to a heat-bath en...
We study the emergence of diffusion for a quantum particle moving in a finite and translationally in...
We characterize the locked-to-running transition of a Brownian particle in a tilted washboard potent...
We analyze diffusion in a finite domain with a position-dependent diffusion coefficient in terms of ...
We use the Fokker-Planck equation to study the diffusion process driven for a metastable potential w...
We study two important aspects of the diffusion of a free particle in the presence of a time-depende...
Employing time-dependent projection formalism, a Fokker-Planck equation with non-Markovian transport...
The localized function formalism, introduced to transform diffusion equations with multistable poten...
This paper deals with the problem of a particle that diffuses in a potential with a reflecting barri...
We show that the hopping dynamics of two strongly connected particles can be mapped exactly to singl...
International audienceDynamics of a particle diffusing in a confinement can be seen a sequence of bu...
The random walk numerical simulation (RWNS) method is used to compute diffusion coefficients for ho...
Abstract. We consider a point particle moving in a random distribution of obstacles described by a p...
The one-dimensional overdamped Brownian motion in a symmetric periodic potential modulated by extern...
This paper presents a study of the behavior of a one-dimensional system, with two potential minima s...
We study the real time dynamics of a quantum system with potential barrier coupled to a heat-bath en...
We study the emergence of diffusion for a quantum particle moving in a finite and translationally in...
We characterize the locked-to-running transition of a Brownian particle in a tilted washboard potent...