Fluctuations of Multi-Dimensional Kingman-L\'Evy Processes

Abstract

In the recent paper Ng5 we have introduced a method of studying the multi-dimensional Kingman convolutions and their associated stochastic processes by embedding them into some multi-dimensional ordinary convolutions which allows to study multi-dimensional Bessel processes in terms of the cooresponding Brownian motions. Our further aim in this paper is to introduce k-dimensional Kingman-L\'evy (KL) processes and prove some of their fluctuation properties which are analoguous to that of k-symmetric L\'evy processes. In particular, the L\'evy-It\o decomposition and the series representation of Rosi\'nski type for k-dimensional KL-processes are obtained.