Results 31 to 40 of about 67 (63)
METASTABILITY OF THE CONTACT PROCESS ON FAST EVOLVING SCALE-FREE NETWORKS
, 2018 We study the contact process in the regime of small infection rates on finite scale-free networks with stationary dynamics based on simultaneous updating of all connections of a vertex.
Linker, Amitai +2 more
core +1 more source
A characterization of grand canonical Gibbs measures by duality
, 2007 We introduce Skorohod type integral operators that satisfy an integration by parts formula under Gibbs measures and obtain a characterization of grand canonical Gibbs measures by duality, without use of a differential structure on the underlying ...
Nicolas Privault
core
Hydrodynamic Scaling, Convex Duality, and Asymptotic Shapes of Growth Models
, 1996 . We present a technique for simultaneously deriving two related results: Hydrodynamic scaling limits for one-dimensional asymmetric particle systems and asymptotic shapes for growth models.
Timo Seppäläinen
core
Convergence to Equilibrium of Random Ising Models in the Griffiths' Phase
, 1998 . We consider Glauber--type dynamics for disordered Ising spin systems with nearest neighbor pair interactions in the Griffiths' phase. We prove that in a nontrivial portion of the Griffiths' phase the system has exponentially decaying ...
C. Maes +5 more
core
Stochastic Stability of Weakly Coupled Lattice Maps
, 1997 We consider a stochastic perturbation of weakly coupled expanding circle maps. We construct the dynamics and its natural invariant measure via a polymer expansion and show the stochastic stability of the system.
C. Maes, A. Van Moffaert
core
RANDOM WALK ON A PERTURBATION OF THE INFINITELY-FAST MIXING INTERCHANGE PROCESS
, 2018 International audienceWe consider a random walk in dimension d ≥ 1 in a dynamic random environment evolving as an interchange process with rate γ > 0. We only assume that the annealed drift is non–zero.
Salvi, Michele, Simenhaus, François
core
Large deviations from the hydrodynamical limit of mean zero asymmetric zero range processes
We prove an upper and a lower bound, which coincide for smooth profiles, of large deviations from the hydrodynamical limit of the empirical measure for a class of zero range processes in infinite volume starting from equilibrium.
Landim, C., Benois, O., Kipnis, C.
core
Semi-Quenched Invariance Principle for the Random Lorentz Gas: Beyond the Boltzmann-Grad Limit. [PDF]
Entropy (Basel)Tóth B.
europepmc +1 more source