Add to ORKGAbstract. We consider Glauber dynamics reversible with respect to Gibbs measures with heavy tails in the case when spins are unbounded. The interactions are bounded and of finite range. The self potential enters into two classes of measures, κ-concave probability measures and sub-exponential laws, for which it is known that no exponential decay can occur. Using coercive inequalities we prove that, for κ-concave probability measures, the associated infinite volume semi-group decays to equilibrium polynomially and stretched exponentially for sub-exponential laws. This improves and extends previous results by Bobkov and Zegarlinski. 1
Abstract: We consider Ising-spin systems starting from an initial Gibbs measure ν and evolving under...
The finite-volume microscopic behaviour of a system in equilibrium is de¬termined by the Boltzmann-G...
AbstractWe study coercive inequalities in Orlicz spaces associated to the probability measures on fi...
We consider Glauber dynamics reversible with respect to Gibbs measures with heavy tails. Spins are u...
Kondratiev Y, Kuna T, Ohlerich N. Spectral gap for Glauber type dynamics for a special class of pote...
We consider a one-dimensional lattice system of unbounded, real-valued spins with arbitrarystrong, q...
AbstractThe Glauber dynamics investigated in this paper are spatial birth and death processes in a c...
We extend classical results of Holley-Stroock on the characterization of extreme Gibbs states for th...
In a statistical mechanics model with unbounded spins, we prove uniqueness of the Gibbs measure unde...
Albeverio S, Kondratiev Y, Röckner M. Ergodicity of L(2)-semigroups and extremality of Gibbs states....
We consider Ising-spin systems starting from an initial Gibbs measure ν and evolving under a spin-fl...
AbstractWe consider a ferromagnetic lattice spin system with unbounded spins and investigate the rel...
We consider Ising-spin systems starting from an initial Gibbs measure 1) and evolving under a spin-f...
© 2018, Springer International Publishing AG, part of Springer Nature. We prove a general stability ...
AbstractWe extend the classical results of Holley–Stroock on the characterization of extreme Gibbs s...
Abstract: We consider Ising-spin systems starting from an initial Gibbs measure ν and evolving under...
The finite-volume microscopic behaviour of a system in equilibrium is de¬termined by the Boltzmann-G...
AbstractWe study coercive inequalities in Orlicz spaces associated to the probability measures on fi...
We consider Glauber dynamics reversible with respect to Gibbs measures with heavy tails. Spins are u...
Kondratiev Y, Kuna T, Ohlerich N. Spectral gap for Glauber type dynamics for a special class of pote...
We consider a one-dimensional lattice system of unbounded, real-valued spins with arbitrarystrong, q...
AbstractThe Glauber dynamics investigated in this paper are spatial birth and death processes in a c...
We extend classical results of Holley-Stroock on the characterization of extreme Gibbs states for th...
In a statistical mechanics model with unbounded spins, we prove uniqueness of the Gibbs measure unde...
Albeverio S, Kondratiev Y, Röckner M. Ergodicity of L(2)-semigroups and extremality of Gibbs states....
We consider Ising-spin systems starting from an initial Gibbs measure ν and evolving under a spin-fl...
AbstractWe consider a ferromagnetic lattice spin system with unbounded spins and investigate the rel...
We consider Ising-spin systems starting from an initial Gibbs measure 1) and evolving under a spin-f...
© 2018, Springer International Publishing AG, part of Springer Nature. We prove a general stability ...
AbstractWe extend the classical results of Holley–Stroock on the characterization of extreme Gibbs s...
Abstract: We consider Ising-spin systems starting from an initial Gibbs measure ν and evolving under...
The finite-volume microscopic behaviour of a system in equilibrium is de¬termined by the Boltzmann-G...
AbstractWe study coercive inequalities in Orlicz spaces associated to the probability measures on fi...