Correlated random walks, hyperbolic systems and Fokker-Planck equations

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

Reaction random-walk systems are hyperbolic models to describe spatial motion (in one dimension) with finite speed and reactions of particles. Here we present two approaches which relate reaction random-walk equations with reaction diffusion equations. First, we consider the case of high particle sp

An alternative description of stochastic processes in nonlinear systems is considered. It is shown that among the possible forms of the Fokker-Planck and the Langevin equations (Ito, Stratonovich, and kinetic forms) the kinetic form is more natural from the point of view of the statistical theory. A