AbstractWe consider a conservative stochastic lattice gas dynamics reversible with respect to the canonical Gibbs measure of the bond dilute Ising model on Zd at inverse temperature β. When the bond dilution density p is below the percolation threshold, we prove that, for any ε>0, any particle density and any β, with probability one, the logarithmic Sobolev constant of the generator of the dynamics in a box of side L centered at the origin cannot grow faster that L2+ε
Consider a zero range process in a box of diameter L, with rates satisfying the same hypotesis of [L...
We study the long-time behavior of the dynamics of interacting planar Brownian particles, confined b...
We consider a system of interacting particles on a finite subset of diameter L of the d-dimensional ...
AbstractWe consider a conservative stochastic lattice gas dynamics reversible with respect to the ca...
We consider a conservative stochastic spin exchange dynamics reversible with respect to the canonica...
Let μgcΛL,λμΛL,λgc denote the grand canonical Gibbs measure of a lattice gas in a cube of sizeL wit...
We study by Monte Carlo simulations the influence of bond dilution on the three-dimensional Ising mo...
We investigate global persistence properties for the non-equilibrium critical dynamics of the random...
In models in statistical physics, the dynamics often slows down tremendously near the critical point...
AbstractWe consider a ferromagnetic lattice spin system with unbounded spins and investigate the rel...
Stochastic lattice gases with degenerate rates, namely conservative particle systems where the excha...
We study the statistical mechanics of a one-dimensional log gas or β-ensemble with general potential...
Consider a low temperature stochastic Ising model in the phase coexistence regime with Markov semig...
We propose conjecture that characterizes reversible measure (Gibbs state) of lattice system (non-con...
The Logarithmic Linear Relaxation (LLR) algorithm is an efficient method for computing densities of ...
Consider a zero range process in a box of diameter L, with rates satisfying the same hypotesis of [L...
We study the long-time behavior of the dynamics of interacting planar Brownian particles, confined b...
We consider a system of interacting particles on a finite subset of diameter L of the d-dimensional ...
AbstractWe consider a conservative stochastic lattice gas dynamics reversible with respect to the ca...
We consider a conservative stochastic spin exchange dynamics reversible with respect to the canonica...
Let μgcΛL,λμΛL,λgc denote the grand canonical Gibbs measure of a lattice gas in a cube of sizeL wit...
We study by Monte Carlo simulations the influence of bond dilution on the three-dimensional Ising mo...
We investigate global persistence properties for the non-equilibrium critical dynamics of the random...
In models in statistical physics, the dynamics often slows down tremendously near the critical point...
AbstractWe consider a ferromagnetic lattice spin system with unbounded spins and investigate the rel...
Stochastic lattice gases with degenerate rates, namely conservative particle systems where the excha...
We study the statistical mechanics of a one-dimensional log gas or β-ensemble with general potential...
Consider a low temperature stochastic Ising model in the phase coexistence regime with Markov semig...
We propose conjecture that characterizes reversible measure (Gibbs state) of lattice system (non-con...
The Logarithmic Linear Relaxation (LLR) algorithm is an efficient method for computing densities of ...
Consider a zero range process in a box of diameter L, with rates satisfying the same hypotesis of [L...
We study the long-time behavior of the dynamics of interacting planar Brownian particles, confined b...
We consider a system of interacting particles on a finite subset of diameter L of the d-dimensional ...