The Markovian invariant measure is a central concept in many disciplines. Conventional numerical techniques for data-driven computation of invariant measures rely on estimation and further numerical processing of a transition matrix. Here we show how the quality of data-driven estimation of a transition matrix crucially depends on the validity of the statistical independence assumption for transition probabilities. Moreover, the cost of the invariant measure computation in general scales cubically with the dimension - and is usually unfeasible for realistic highdimensional systems. We introduce a method relaxing the independence assumption of transition probabilities that scales quadratically in situations with latent variables. Applicatio...
The purpose of this work is to shed light on an algorithm designed to extract effective macroscopic ...
Markov state models of molecular kinetics (MSMs), in which the long-time statistical dynamics of a m...
Markov state models (MSMs), which model conformational dynamics as a network of transitions between ...
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...
In many domains where mathematical modelling is applied, a deterministic description of the system a...
Reversibility is a key concept in Markov models and master-equation models of molecular kinetics. Th...
We consider a continuous-time Markov process on a large continuous or discrete state space. The proc...
We present a novel method for the identification of the most important metastable states of a system...
Many complex systems occurring in various application share the property that the underlying Markov ...
Discrete-state Markov (or master equation) models provide a useful simplified representation for cha...
In many applications one is interested in finding a simplified model which captures the essential dy...
Invariant measures of dynamical systems generated e. g. by dierence equa-tions can be computed by di...
This paper deals with the computation of invariant measures and stationary expectations for discrete...
The invariant measure is a fundamental object in the theory of Markov processes. In finite dimension...
The purpose of this work is to shed light on an algorithm designed to extract effective macroscopic ...
Markov state models of molecular kinetics (MSMs), in which the long-time statistical dynamics of a m...
Markov state models (MSMs), which model conformational dynamics as a network of transitions between ...
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...
In many domains where mathematical modelling is applied, a deterministic description of the system a...
Reversibility is a key concept in Markov models and master-equation models of molecular kinetics. Th...
We consider a continuous-time Markov process on a large continuous or discrete state space. The proc...
We present a novel method for the identification of the most important metastable states of a system...
Many complex systems occurring in various application share the property that the underlying Markov ...
Discrete-state Markov (or master equation) models provide a useful simplified representation for cha...
In many applications one is interested in finding a simplified model which captures the essential dy...
Invariant measures of dynamical systems generated e. g. by dierence equa-tions can be computed by di...
This paper deals with the computation of invariant measures and stationary expectations for discrete...
The invariant measure is a fundamental object in the theory of Markov processes. In finite dimension...
The purpose of this work is to shed light on an algorithm designed to extract effective macroscopic ...
Markov state models of molecular kinetics (MSMs), in which the long-time statistical dynamics of a m...
Markov state models (MSMs), which model conformational dynamics as a network of transitions between ...