Spectral diffusion in random media: a master equation approach

The present paper deals with diffusion in a porous solid, which is considered as a discrete random medium composed of random structural elements (pores) chaotically connected with each

## Abstract Collisional energy transfer plays a key role in recombination, unimolecular, and chemical activation reactions. For master equation simulations of such reaction systems, it is conventionally assumed that the rate constant for inelastic energy transfer collisions is independent of the ex

## Communicated by P. Werner In the present work, the problem of electromagnetic wave propagation in three-dimensional stratified media is studied. The method of decoupling the electric and magnetic fields is implemented, and the spectral approach is adopted, componentwise, to the vector equation

The localized function formalism, introduced to transform diffusion equations with multistable potentials into discrete master equations, is applied to the Fokker-Planck equation in underdamped conditions when the energy becomes the slow variable. The resulting transition rates describe the kinetic