Localization of a diffusion process in a one-dimensional brownian environment

An analytical study of Brownian motion in a dispersion of fluid drops is considered. The droplets, which are spherical and may differ in radius, are assumed to be close enough to interact hydrodynamically. Based on Einstein's description of Brownian motion that invokes an equilibrium and in which dr

Sarh processes X were first described by WILLIAN FELLER in a purely analytical way, using the generalized second-order differential operator U,D;. In the rase of natural boundaries of the state space R and a trivial road map p(xj =x, these diffusion processes are martingales. In the present paper it

Spatially honiogeneous branching processes in Euclidean space Rd are usually defined in such a way that the evolution law Ex,: of a "particle" 6, a t position x Rd a t time t doesn't depend on x or t , of. MATTHES, KERSTAN and MECKE [8; Chapter 121 or DAWSON [2]. To model a homogeneous "random cnvir