Mott law as lower bound for a random walk in a random environment
Abstract
We consider a random walk on the support of an ergodic stationary simple point process on R-d, >= 2, which satisfies a mixing condition w.r.t. the translations or has a strictly positive density uniformly on large enough cubes. Furthermore the point process is furnished with independent random bounded energy marks. The transition rates of the random walk decay exponentially in the jump distances and depend on the energies through a factor of the Boltzmann-type. This is an effective model for the phonon-induced hopping of electrons in disordered solids within the regime of strong Anderson localization. We show that the rescaled random walk converges to a Brownian motion whose diffusion coefficient is bounded below by Mott's law for the variable range hopping conductivity at zero frequency. The proof of the lower bound involves estimates for the supercritical regime of an associated site percolation problem.
Más información
Título según WOS: | ID WOS:000235307600002 Not found in local WOS DB |
Título de la Revista: | COMMUNICATIONS IN MATHEMATICAL PHYSICS |
Volumen: | 263 |
Número: | 1 |
Editorial: | Springer |
Fecha de publicación: | 2006 |
Página de inicio: | 21 |
Página final: | 64 |
DOI: |
10.1007/s00220-005-1492-5 |
Notas: | ISI |