Reversibility is a key concept in Markov models and Master-equation models of molecular kinetics. The analysis and interpretation of the transition matrix encoding the kinetic properties of the model relies heavily on the reversibility property. The estimation of a reversible transition matrix from simulation data is therefore crucial to the successful application of the previously developed theory. In this work we discuss methods for the maximum likelihood estimation of transition matrices from finite simulation data and present a new algorithm for the estimation if reversibility with respect to a given stationary vector is desired. We also develop new methods for the Bayesian posterior inference of reversible transition matrices with and ...
This dissertation describes the research that we have done concerning reversible Markov chains. We f...
Markov (state) models (MSMs) and related models of molecular kinetics have recently received a surge...
Markov state models (MSMs) have been successful in computing metastable states, slow relaxation time...
Reversibility is a key concept in Markov models and master-equation models of molecular kinetics. Th...
In many applications one is interested in finding a simplified model which captures the essential dy...
Direct simulation of biomolecular dynamics in thermal equilibrium is challenging due to the metastab...
The problem of estimating a Markov transition matrix to statistically describe the dynamics underlyi...
Direct simulation of biomolecular dynamics in thermal equilibrium is challenging due to the metastab...
Markov state models of molecular kinetics (MSMs), in which the long-time statistical dynamics of a m...
The slow processes of molecular dynamics (MD) simulations—governed by dominant eigenvalues and eigen...
• Modelling physical systems e.g transitions of a macromolecule conformation at fixed temperature. •...
1 Introduction 2 Theory 2.1 Molecular dynamics 2.1.1 Langevin dynamics 2.1.2 Brownian dynamics 2.2 T...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
AbstractIn this paper, we present a Gaussian Markov random field (GMRF) model for the transition mat...
Discrete-state Markov (or master equation) models provide a useful simplified representation for cha...
This dissertation describes the research that we have done concerning reversible Markov chains. We f...
Markov (state) models (MSMs) and related models of molecular kinetics have recently received a surge...
Markov state models (MSMs) have been successful in computing metastable states, slow relaxation time...
Reversibility is a key concept in Markov models and master-equation models of molecular kinetics. Th...
In many applications one is interested in finding a simplified model which captures the essential dy...
Direct simulation of biomolecular dynamics in thermal equilibrium is challenging due to the metastab...
The problem of estimating a Markov transition matrix to statistically describe the dynamics underlyi...
Direct simulation of biomolecular dynamics in thermal equilibrium is challenging due to the metastab...
Markov state models of molecular kinetics (MSMs), in which the long-time statistical dynamics of a m...
The slow processes of molecular dynamics (MD) simulations—governed by dominant eigenvalues and eigen...
• Modelling physical systems e.g transitions of a macromolecule conformation at fixed temperature. •...
1 Introduction 2 Theory 2.1 Molecular dynamics 2.1.1 Langevin dynamics 2.1.2 Brownian dynamics 2.2 T...
We introduce a natural conjugate prior for the transition matrix of a reversible Markov chain. This ...
AbstractIn this paper, we present a Gaussian Markov random field (GMRF) model for the transition mat...
Discrete-state Markov (or master equation) models provide a useful simplified representation for cha...
This dissertation describes the research that we have done concerning reversible Markov chains. We f...
Markov (state) models (MSMs) and related models of molecular kinetics have recently received a surge...
Markov state models (MSMs) have been successful in computing metastable states, slow relaxation time...