First Passage Time Distribution and Number of Returns for Ultrametric Random Walk

Abstract

In this paper, we consider a homogeneous Markov process (t;ω) on an ultrametric space Qp, with distribution density f(x,t), x in Qp, t in R+, satisfying the ultrametric diffusion equation df(x,t)/dt =-Df(x,t). We construct and examine a random variable τ (ω) that has the meaning the first passage times. Also, we obtain a formula for the mean number of returns on the interval (0,t] and give its asymptotic estimates for large t.