Investigation of Overexponential Growth of Mean Particle Flux with Multiplication in Random Medium

Abstract

A new correlative-grid approximation for a homogeneous isotropic random field of density is introduced for effective numerical-analytical investigation of overexponential growth of the mean flux of particles with multiplication in a random medium. In this case, the complexity of realization of a particle trajectory is independent of the correlation scale. For the correlative-grid approximation, the possibility of a Gaussian asymptotics of the average rate of particle multiplication is proved for a random field of limited density. It ensures a superexponential growth of the flux in some initial time interval. An estimate of further overexponential flux growth is constructed based on some test computations.