International audienceWe establish the Level-1 and Level-3 Large Deviation Principles (LDPs) for invariant measures on shift spaces over finite alphabets under very general decoupling conditions for which the thermodynamic formalism does not apply. Such decoupling conditions arise naturally in multifractal analysis, in Gibbs states with hard-core interactions, and in the statistics of repeated quantum measurement processes. We also prove the LDP for the entropy production of pairs of such measures and derive the related Fluctuation Relation. The proofs are based on Ruelle-Lanford functions, and the exposition is essentially self-contained
We consider the evolution of an asymptotically decoupled probability measure v on Ising spin configu...
Abstract. Let X = {Xt}t∈Zd ∼ P and Y = {Yt}t∈Zd ∼ Q be two independent stationary random fields with...
ABSTRACT. – We prove large deviation principles (LDP) for m-fold products of empirical measures and ...
For the spaceXin a large class of finite alphabet shift spaces (lattice models) and the class of fun...
We consider expansive homeomorphisms with the specification property. We give a new simple proof of ...
We consider expansive homeomorphisms with the specification property. We give a new simple proof of ...
AbstractFor a wide class of measures, the multifractal spectrum is shown to exist iff an appropriate...
We consider dynamical systems whose sets of orbits verify an approximate prod-uct property. This all...
Seja $\\Sigma_(\\mathbb)$ um shift enumerável topologicamente mixing com a propriedade BIP sobre o ...
We consider a system of independent particles and a system of reacting particles on a discrete state...
This is an introductory course on the methods of computing asymptotics of probabilities of rare even...
For almost every trajectory segment over a finite time span of a finite Markov chain with any given ...
A basic result of large deviations theory is Sanov\u2019s theorem, which states that the sequence of...
We consider a system of independent particles on a finite state space, and prove a dynamic large-de...
We consider a system of stochastic interacting particles in Rd and we describe large deviation asymp...
We consider the evolution of an asymptotically decoupled probability measure v on Ising spin configu...
Abstract. Let X = {Xt}t∈Zd ∼ P and Y = {Yt}t∈Zd ∼ Q be two independent stationary random fields with...
ABSTRACT. – We prove large deviation principles (LDP) for m-fold products of empirical measures and ...
For the spaceXin a large class of finite alphabet shift spaces (lattice models) and the class of fun...
We consider expansive homeomorphisms with the specification property. We give a new simple proof of ...
We consider expansive homeomorphisms with the specification property. We give a new simple proof of ...
AbstractFor a wide class of measures, the multifractal spectrum is shown to exist iff an appropriate...
We consider dynamical systems whose sets of orbits verify an approximate prod-uct property. This all...
Seja $\\Sigma_(\\mathbb)$ um shift enumerável topologicamente mixing com a propriedade BIP sobre o ...
We consider a system of independent particles and a system of reacting particles on a discrete state...
This is an introductory course on the methods of computing asymptotics of probabilities of rare even...
For almost every trajectory segment over a finite time span of a finite Markov chain with any given ...
A basic result of large deviations theory is Sanov\u2019s theorem, which states that the sequence of...
We consider a system of independent particles on a finite state space, and prove a dynamic large-de...
We consider a system of stochastic interacting particles in Rd and we describe large deviation asymp...
We consider the evolution of an asymptotically decoupled probability measure v on Ising spin configu...
Abstract. Let X = {Xt}t∈Zd ∼ P and Y = {Yt}t∈Zd ∼ Q be two independent stationary random fields with...
ABSTRACT. – We prove large deviation principles (LDP) for m-fold products of empirical measures and ...