The sojourn time problem for a p-adic random walk and its applications to the spectral diffusion of proteins

Abstract

We consider the problem of the distribution of the sojourn time in a compact set Zp in the case of a p-adic random walk. We rely on the results of our previous studies of the distribution of the first return time for a p-adic random walk and the results of Takacs on the study of the sojourn time problem for a wide class of random processes. For a p-adic random walk we find the mean sojourn time of the trajectory in Zp and the asymptotics as t→∞ of arbitrary moments of the distribution of the sojourn time in Zp. We also discuss some possible applications of our results to the modeling of relaxation processes related to the conformational dynamics of protein.