It is well-known that discrete-time finite-state Markov Chains, which are described by one-sided conditional probabilities which describe a dependence on the past as only dependent on the present, can also be described as one-dimensional Markov Fields, that is, nearest-neighbor Gibbs measures for finite-spin models, which are described by two-sided conditional probabilities. In such Markov Fields the time interpretation of past and future is being replaced by the space interpretation of an interior volume, surrounded by an exterior to the left and to the right. If we relax the Markov requirement to weak dependence, that is, continuous dependence, either on the past (generalising the Markov-Chain description) or on the external configuration...
It is known that the joint measures on the product of spin-space and disorder space are very often n...
Many Markov chains with a single absorbing state have a unique limiting conditional distribution (LC...
PhD Theses.We aim to explore the validity of recently proposed ‘thermodynamic uncertainty relations...
It is well-known that discrete-time finite-state Markov Chains, which are described by one-sided con...
In this review-type paper written at the occasion of the Oberwolfach workshop One-sided vs. Two-side...
Thesis (M.A.)--Boston University N.B.: Page 3 of Abstract is incorrectly labeled as Page 2. No cont...
31 pagesInternational audienceWe discuss the relationship between discrete-time processes (chains) a...
We establish an equivalence-singularity dichotomy for a large class of one-dimensional Markov measur...
yesA time-dependent finite-state Markov chain that uses doubly stochastic transition matrices, is co...
Markov Chains (MCs) are used ubiquitously to model dynamical systems with uncertain dynamics. In man...
The finite-volume microscopic behaviour of a system in equilibrium is de¬termined by the Boltzmann-G...
This article presents an equivalence notion of finite order stochastic processes. Local dependence m...
Many systems in nature and laboratories are far from equilibrium and exhibit significant fluctuation...
Many systems in nature and laboratories are far from equilibrium and exhibit significant fluctuation...
It is known that the joint measures on the product of spin-space and disorder space are very often n...
It is known that the joint measures on the product of spin-space and disorder space are very often n...
Many Markov chains with a single absorbing state have a unique limiting conditional distribution (LC...
PhD Theses.We aim to explore the validity of recently proposed ‘thermodynamic uncertainty relations...
It is well-known that discrete-time finite-state Markov Chains, which are described by one-sided con...
In this review-type paper written at the occasion of the Oberwolfach workshop One-sided vs. Two-side...
Thesis (M.A.)--Boston University N.B.: Page 3 of Abstract is incorrectly labeled as Page 2. No cont...
31 pagesInternational audienceWe discuss the relationship between discrete-time processes (chains) a...
We establish an equivalence-singularity dichotomy for a large class of one-dimensional Markov measur...
yesA time-dependent finite-state Markov chain that uses doubly stochastic transition matrices, is co...
Markov Chains (MCs) are used ubiquitously to model dynamical systems with uncertain dynamics. In man...
The finite-volume microscopic behaviour of a system in equilibrium is de¬termined by the Boltzmann-G...
This article presents an equivalence notion of finite order stochastic processes. Local dependence m...
Many systems in nature and laboratories are far from equilibrium and exhibit significant fluctuation...
Many systems in nature and laboratories are far from equilibrium and exhibit significant fluctuation...
It is known that the joint measures on the product of spin-space and disorder space are very often n...
It is known that the joint measures on the product of spin-space and disorder space are very often n...
Many Markov chains with a single absorbing state have a unique limiting conditional distribution (LC...
PhD Theses.We aim to explore the validity of recently proposed ‘thermodynamic uncertainty relations...