The framework of transition path theory (TPT) is developed in the context of continuous-time Markov chains on discrete state-spaces. Under assumption of ergodicity, TPT singles out any two subsets in the state-space and analyzes the statistical properties of the associated reactive trajectories, i.e., those trajectories by which the random walker transits from one subset to another. TPT gives properties such as the probability distribution of the reactive trajectories, their probability current and flux, and their rate of occurrence and the dominant reaction pathways. In this paper the framework of TPT for Markov chains is developed in detail, and the relation of the theory to electric resistor network theory and data analysis tools ...
International audienceWe are interested in the connection between a metastable continuous state spac...
We describe state-reduction algorithms for the analysis of first-passage processes in discrete- and ...
Transition states are defined as points in configuration space with the highest probability that tra...
In this thesis, we present the framework of transition path theory (TPT) for time continuous Markov ...
Title Table of contents i 1\. Introduction 1 2\. Theory: Time-continuous Markov Processes 9 ...
We construct a statistical theory of reactive trajectories between two pre-specified sets A and B, i...
We present a comprehensive theory for analysis and understanding of transition events between an ini...
Transition path theory (TPT) has been recently introduced as a theoretical framework to describe the...
We present a comprehensive theory for analysis and understanding of transition events between an ini...
The transition mechanism of jump processes between two different subsets in state space reveals impo...
Given two distinct subsets A, B in the state space of some dynamical system, transition path theory ...
Many applications involve analysing dynamical systems that undergo rare transitions between two meta...
We are interested in the connection between a metastable continuous state space Markov process (sati...
Finite Markov chains are probabilistic network models that are commonly used as representations of d...
Given two distinct subsets A, B in the state space of some dynamical system, transition path theory...
International audienceWe are interested in the connection between a metastable continuous state spac...
We describe state-reduction algorithms for the analysis of first-passage processes in discrete- and ...
Transition states are defined as points in configuration space with the highest probability that tra...
In this thesis, we present the framework of transition path theory (TPT) for time continuous Markov ...
Title Table of contents i 1\. Introduction 1 2\. Theory: Time-continuous Markov Processes 9 ...
We construct a statistical theory of reactive trajectories between two pre-specified sets A and B, i...
We present a comprehensive theory for analysis and understanding of transition events between an ini...
Transition path theory (TPT) has been recently introduced as a theoretical framework to describe the...
We present a comprehensive theory for analysis and understanding of transition events between an ini...
The transition mechanism of jump processes between two different subsets in state space reveals impo...
Given two distinct subsets A, B in the state space of some dynamical system, transition path theory ...
Many applications involve analysing dynamical systems that undergo rare transitions between two meta...
We are interested in the connection between a metastable continuous state space Markov process (sati...
Finite Markov chains are probabilistic network models that are commonly used as representations of d...
Given two distinct subsets A, B in the state space of some dynamical system, transition path theory...
International audienceWe are interested in the connection between a metastable continuous state spac...
We describe state-reduction algorithms for the analysis of first-passage processes in discrete- and ...
Transition states are defined as points in configuration space with the highest probability that tra...