We present a technique to resolve the rare event problem for a Langevin equation describing a system with thermally activated transitions. A transition event within a given time interval (0,tf) can be described by a transition path that has an activation part during (0,tM) and a deactivation part during (tM,tf)(0<tM<tf). The activation path is governed by a Langevin equation with negative friction while the deactivation path by the standard Langevin equation with positive friction. Each transition path carries a given statistical weight from which rate constants and related physical quantities can be obtained as averages over all possible paths. We demonstrate how this technique can be used to calculate activation rates of a particle in a t...
In the last decade great efforts have been made to efficiently study the behaviors of rare-event sys...
In this thesis, we shall discuss the Langevin equation. While the equation is well known in Statisti...
Cette thèse aborde l étude de phénomènes physiques fondamentaux, avec des applications aux matériaux...
An efficient method to compute the thermal rate constant for rare events within the correlation func...
Adaptive Langevin dynamics is a method for sampling the Boltzmann-Gibbs distribution at prescribed t...
In this article, we present several algorithms for stochastic dynamics, including Langevin dynamics ...
In the last decade great efforts have been made to efficiently study the behaviors of rare-event sy...
© 2016 Author(s).The recrossing correction to the transition state theory estimate of a thermal rate...
Kinetic rates at different temperatures and the associated Arrhenius parameters, whenever Arrhenius ...
© 2005 American Institute of Physics. The electronic version of this article is the complete one and...
Activated processes driven by rare fluctuations are discussed in this thesis. Understanding the dyna...
We consider the problem of building a continuous stochastic model, i.e., a Langevin or Fokker-Planck...
We introduce a new approach to evaluate transition rates for rare events in complex many-particle sy...
An increase in the rates of activated processes with the coupling to the solvent has long been predi...
This thesis is dedicated to the study of the sharp asymptotic behaviour in the low temperature reg...
In the last decade great efforts have been made to efficiently study the behaviors of rare-event sys...
In this thesis, we shall discuss the Langevin equation. While the equation is well known in Statisti...
Cette thèse aborde l étude de phénomènes physiques fondamentaux, avec des applications aux matériaux...
An efficient method to compute the thermal rate constant for rare events within the correlation func...
Adaptive Langevin dynamics is a method for sampling the Boltzmann-Gibbs distribution at prescribed t...
In this article, we present several algorithms for stochastic dynamics, including Langevin dynamics ...
In the last decade great efforts have been made to efficiently study the behaviors of rare-event sy...
© 2016 Author(s).The recrossing correction to the transition state theory estimate of a thermal rate...
Kinetic rates at different temperatures and the associated Arrhenius parameters, whenever Arrhenius ...
© 2005 American Institute of Physics. The electronic version of this article is the complete one and...
Activated processes driven by rare fluctuations are discussed in this thesis. Understanding the dyna...
We consider the problem of building a continuous stochastic model, i.e., a Langevin or Fokker-Planck...
We introduce a new approach to evaluate transition rates for rare events in complex many-particle sy...
An increase in the rates of activated processes with the coupling to the solvent has long been predi...
This thesis is dedicated to the study of the sharp asymptotic behaviour in the low temperature reg...
In the last decade great efforts have been made to efficiently study the behaviors of rare-event sys...
In this thesis, we shall discuss the Langevin equation. While the equation is well known in Statisti...
Cette thèse aborde l étude de phénomènes physiques fondamentaux, avec des applications aux matériaux...