Add to ORKGInternational audienceThe problem of characterization of Gibbs random fields is considered. Various Gibbsianness criteria are obtained using the earlier developed one-point framework which in particular allows to describe random fields by means of either one-point conditional or one-point finite-conditional distributions. The main outcome are the criteria in terms of one-point finite-conditional distribution, one of which can be taken as a purely probabilistic definition of Gibbs random field
AbstractWe consider two possible extensions of the standard definition of Gibbs measures for lattice...
AbstractTo every Markov process with a symmetric transition density, there correspond two random fie...
Ende der sechziger Jahre wurde die Idee der Gibbs-Maße als stochastische Felder von Dobrushin, Lanfo...
In this paper, we show that the methods of mathematical statistical physics can be successfully appl...
A new approach towards description of random fields on the $\nu$ -dimensional integer lattice $Z^\nu...
In this paper we present a new point of view on the mathematical foundations of statistical physics ...
We consider two possible extensions of the standard definition of Gibbs measures for lattice spin sy...
In this paper, we consider the direct and inverse problems of the description of lattice positive ra...
An approach to the definition of infinite-volume Gibbs states for the (quenched) random-field Ising ...
We consider the i.i.d. Bernoulli field μ p on Z d with occupation density p ∈ [0,1]. To each realiza...
It is known that the joint measures on the product of spin-space and disorder space are very often n...
A random field specification is a consistent family of conditional probability distributions paramet...
We consider the locally thinned Bernoulli field on ℤ d, which is the lattice version of the Type-I M...
31 pagesInternational audienceWe discuss the relationship between discrete-time processes (chains) a...
AbstractStarting from a principle of large deviations for the empirical field of a Gibbs measure, we...
AbstractWe consider two possible extensions of the standard definition of Gibbs measures for lattice...
AbstractTo every Markov process with a symmetric transition density, there correspond two random fie...
Ende der sechziger Jahre wurde die Idee der Gibbs-Maße als stochastische Felder von Dobrushin, Lanfo...
In this paper, we show that the methods of mathematical statistical physics can be successfully appl...
A new approach towards description of random fields on the $\nu$ -dimensional integer lattice $Z^\nu...
In this paper we present a new point of view on the mathematical foundations of statistical physics ...
We consider two possible extensions of the standard definition of Gibbs measures for lattice spin sy...
In this paper, we consider the direct and inverse problems of the description of lattice positive ra...
An approach to the definition of infinite-volume Gibbs states for the (quenched) random-field Ising ...
We consider the i.i.d. Bernoulli field μ p on Z d with occupation density p ∈ [0,1]. To each realiza...
It is known that the joint measures on the product of spin-space and disorder space are very often n...
A random field specification is a consistent family of conditional probability distributions paramet...
We consider the locally thinned Bernoulli field on ℤ d, which is the lattice version of the Type-I M...
31 pagesInternational audienceWe discuss the relationship between discrete-time processes (chains) a...
AbstractStarting from a principle of large deviations for the empirical field of a Gibbs measure, we...
AbstractWe consider two possible extensions of the standard definition of Gibbs measures for lattice...
AbstractTo every Markov process with a symmetric transition density, there correspond two random fie...
Ende der sechziger Jahre wurde die Idee der Gibbs-Maße als stochastische Felder von Dobrushin, Lanfo...