Infinite volume asymptotics of the ground state energy in a scaled poissonian potential
Information recovery from randomly mixed-up message text.
Intégrabilité des temps de renouvellement des files d'attente et applications
Integrability of exit times and ballisticity for random walks in Dirichlet environment.
Interacting brownian particles and Gibbs fields on pathspaces
In this paper, we prove that the laws of interacting brownian particles are characterized as Gibbs fields on pathspace associated to an explicit class of hamiltonian functionals. More generally, we show that a large class of Gibbs fields on pathspace corresponds to brownian diffusions. Some applications to time reversal in the stationary and non stationary case are presented.
Interacting Brownian particles and Gibbs fields on pathspaces
In this paper, we prove that the laws of interacting Brownian particles are characterized as Gibbs fields on pathspace associated to an explicit class of Hamiltonian functionals. More generally, we show that a large class of Gibbs fields on pathspace corresponds to Brownian diffusions. Some applications to time reversal in the stationary and non stationary case are presented.
Interlacement percolation on transient weighted graphs.
Interloss time in loss system.
Intermittency and ageing for the symbiotic branching model
For the symbiotic branching model introduced in [Stochastic Process. Appl.114 (2004) 127–160], it is shown that ageing and intermittency exhibit different behaviour for negative, zero, and positive correlations. Our approach also provides an alternative, elementary proof and refinements of classical results concerning second moments of the parabolic Anderson model with brownian potential. Some refinements to more general (also infinite range) kernels of recent ageing results of [Ann. Inst. H. Poincaré...
Intermittency on catalysts: three-dimensional simple symmetric exclusion.
Internal diffusion-limited aggregation on non-amenable graphs.
Internal DLA in a random environment
Intersection probabilities for a chordal SLE path and a semicircle.
Interval partitions and pair interactions
Introduction à une formulation stochastique d'une réaction magnétocatalytique
Invariance principle for Mott variable range hopping and other walks on point processes
We consider a random walk on a homogeneous Poisson point process with energy marks. The jump rates decay exponentially in the -power of the jump length and depend on the energy marks via a Boltzmann-like factor. The case corresponds to the phonon-induced Mott variable range hopping in disordered solids in the regime of strong Anderson localization. We prove that for almost every realization of the marked process, the diffusively rescaled random walk, with an arbitrary start point, converges to...
Invariance principle for the random conductance model with dynamic bounded conductances
We study a continuous time random walk in an environment of dynamic random conductances in . We assume that the conductances are stationary ergodic, uniformly bounded and bounded away from zero and polynomially mixing in space and time. We prove a quenched invariance principle for , and obtain Green’s functions bounds and a local limit theorem. We also discuss a connection to stochastic interface models.
Inverspositive Operatoren und Taubersätze in der Erneuerungstheorie.
Is the fuzzy Potts model gibbsian?
Isomorphs of a class of queueing systems.