Corrigendum on T. Kumagai, Random Walks on Disordered Media and their Scaling Limits.

the generating secants connect the points of contact of parallel tangents of the given oval then they envelop a curve, which contains information about the oval analogously to

We derive laws of the iterated logarithm for random walks on random conductance mod- els under the assumption that the random walks enjoy long time sub-Gaussian heat kernel

space (X,T) with values in a separable metric space Y is cliquish (has the Baire property) iff it is a uniform (pointwise) limit of sequence {f.:n > 1} of simply

The name comes form the planar case: a frontier rancher who is walking about and at each step increases his ranch by dragging with him the fence that defines it, so that the ranch

KMS-MSJ Joint Meeting 2012.. Physicists) Analyze RW on disordered media Survey: Ben-Avraham and S... (Use HK

We report on recent work, [1], concerning lower bounds on the localization length of eigenfunctions in the three-dimensional Anderson model at weak disorders, that uses an extension

Fur- thermore, we will discuss models with decaying random potential in 2-D, and study the relationship between decay exponent, scattering, and conjec- tural localization..

Before explaining RW on random media (random graphs), let us first explain simple random walk (SRW) on the d-dimensional square lattice Z d and Brownian motion on the Euclidean space