The graph transformation (GT) algorithm robustly computes the mean first-passage time to an absorbing state in a finite Markov chain. Here we present a concise overview of the iterative and block formulations of the GT procedure and generalize the GT formalism to the case of any path property that is a sum of contributions from individual transitions. In particular, we examine the path action, which directly relates to the path probability, and analyze the first-passage path ensemble for a model Markov chain that is metastable and therefore numerically challenging. We compare the mean first-passage path action, obtained using GT, with the full path action probability distribution simulated efficiently using kinetic path sampling, and with v...
We present a comprehensive theory for analysis and understanding of transition events between an ini...
Consider a finite state irreducible Markov process with transition graph G and invariant probability...
AbstractWe discuss the State Reduction/GTH (Grassmann, Taksar, Heyman) algorithm for recursively fin...
We describe state-reduction algorithms for the analysis of first-passage processes in discrete- and ...
Finite Markov chains are probabilistic network models that are commonly used as representations of d...
International audienceMarkov chains can accurately model the state-to-state dynamics of a wide range...
Abstract. The effective application of Markov chains has been paid much attention, and it has raised...
The problem of flickering trajectories in standard kinetic Monte Carlo (kMC) simulations prohibits s...
The transition mechanism of jump processes between two different subsets in state space reveals impo...
M.Sc. (Mathematics)In chapter 1, we give the reader some background concerning digraphs that are use...
This paper presents different methods for computing the k-transition probability matrix pk for small...
application/pdfThe graph Gt+1 is defined recursively from Gt by some stochastic rules. We call this ...
We face a generalization of the problem of finding the distribution of how long it takes to reach a ...
It is shown that a stationary distribution of a regular Markov chain can be obtained directly from i...
Given a strongly stationary Markov chain (discrete or continuous) and a finite set of stopping rules...
We present a comprehensive theory for analysis and understanding of transition events between an ini...
Consider a finite state irreducible Markov process with transition graph G and invariant probability...
AbstractWe discuss the State Reduction/GTH (Grassmann, Taksar, Heyman) algorithm for recursively fin...
We describe state-reduction algorithms for the analysis of first-passage processes in discrete- and ...
Finite Markov chains are probabilistic network models that are commonly used as representations of d...
International audienceMarkov chains can accurately model the state-to-state dynamics of a wide range...
Abstract. The effective application of Markov chains has been paid much attention, and it has raised...
The problem of flickering trajectories in standard kinetic Monte Carlo (kMC) simulations prohibits s...
The transition mechanism of jump processes between two different subsets in state space reveals impo...
M.Sc. (Mathematics)In chapter 1, we give the reader some background concerning digraphs that are use...
This paper presents different methods for computing the k-transition probability matrix pk for small...
application/pdfThe graph Gt+1 is defined recursively from Gt by some stochastic rules. We call this ...
We face a generalization of the problem of finding the distribution of how long it takes to reach a ...
It is shown that a stationary distribution of a regular Markov chain can be obtained directly from i...
Given a strongly stationary Markov chain (discrete or continuous) and a finite set of stopping rules...
We present a comprehensive theory for analysis and understanding of transition events between an ini...
Consider a finite state irreducible Markov process with transition graph G and invariant probability...
AbstractWe discuss the State Reduction/GTH (Grassmann, Taksar, Heyman) algorithm for recursively fin...