An analytical expression is derived for the transition path time distribution for a one-dimensional particle crossing of a parabolic barrier. Two cases are analyzed: (i) a non-Markovian process described by a generalized Langevin equation with a power-law memory kernel and (ii) a Markovian process with a noise violating the fluctuation-dissipation theorem, modeling the stochastic dynamics generated by active forces. In case i, we show that the anomalous dynamics strongly affect the short time behavior of the distributions, but this happens only for very rare events not influencing the overall statistics. At long times the decay is always exponential, in disagreement with a recent study suggesting a stretched exponential decay. In case ii, t...
In this paper the authors analyze the long time behavior of certain Markov chains, namely jump proce...
A general theory is derived for the moments of the first passage time of a one-dimensional Markov pr...
In molecular dynamics, statistics of transitions, such as the mean transition time, are macroscopic ...
We derive an analytical expression for the transition path time (TPT) distribution for a one-dimensi...
Biomolecular folding, at least in simple systems, can be described as a two state transition in a fr...
We study the non-Markovian Langevin dynamics of a massive particle in a one-dimensional double-well ...
We investigate non-Markovian barrier-crossing kinetics of a massive particle in one dimension in the...
We study the mean first-passage time τMFP for the barrier crossing of a single massive particle with...
The first-passage time, defined as the time a random walker takes to reach a target point in a confi...
Activated processes driven by rare fluctuations are discussed in this thesis. Understanding the dyna...
Abstract. Driven diffusive systems are often used as simple discrete models of collective transport ...
We study two important aspects of the diffusion of a free particle in the presence of a time-depende...
Abstract. We study Fluctuation Relations (FRs) for dynamics that are anomalous, in the sense that th...
The stochastic dynamics toward the final attractor in exponential distributed timedelay non-linear m...
The standard setup for single-file diffusion is diffusing particles in one dimension which cannot ov...
In this paper the authors analyze the long time behavior of certain Markov chains, namely jump proce...
A general theory is derived for the moments of the first passage time of a one-dimensional Markov pr...
In molecular dynamics, statistics of transitions, such as the mean transition time, are macroscopic ...
We derive an analytical expression for the transition path time (TPT) distribution for a one-dimensi...
Biomolecular folding, at least in simple systems, can be described as a two state transition in a fr...
We study the non-Markovian Langevin dynamics of a massive particle in a one-dimensional double-well ...
We investigate non-Markovian barrier-crossing kinetics of a massive particle in one dimension in the...
We study the mean first-passage time τMFP for the barrier crossing of a single massive particle with...
The first-passage time, defined as the time a random walker takes to reach a target point in a confi...
Activated processes driven by rare fluctuations are discussed in this thesis. Understanding the dyna...
Abstract. Driven diffusive systems are often used as simple discrete models of collective transport ...
We study two important aspects of the diffusion of a free particle in the presence of a time-depende...
Abstract. We study Fluctuation Relations (FRs) for dynamics that are anomalous, in the sense that th...
The stochastic dynamics toward the final attractor in exponential distributed timedelay non-linear m...
The standard setup for single-file diffusion is diffusing particles in one dimension which cannot ov...
In this paper the authors analyze the long time behavior of certain Markov chains, namely jump proce...
A general theory is derived for the moments of the first passage time of a one-dimensional Markov pr...
In molecular dynamics, statistics of transitions, such as the mean transition time, are macroscopic ...