A note on mean volume and surface densities for a class of birth-and-growth stochastic processes

Abstract

Many real phenomena may be modelled as locally finite unions of d-dimensional time dependent random closed sets in Rd, described by birth-and-growth stochastic processes, so that their mean volume and surface densities, as well as the so called mean extended volume and surface densities, may be studied in terms of relevant quantities characterizing the process. We extend here known results in the Poissonian case to a wider class of birth-and-growth stochastic processes, proving in particular the absolute continuity of the random time of capture of a point x∈d by processes of this class.