On $\mathbb{R}^d$-valued multi-self-similar Markov processes
Abstract
An -valued Markov process , is said to be multi-self-similar with index if the identity in law where , is satisfied for all and all starting point . Multi-self-similar Markov processes were introduced by Jacobsen and Yor \cite{jy} in the aim of extending the Lamperti transformation of positive self-similar Markov processes to -valued processes. This paper aims at giving a complete description of all -valued multi-self-similar Markov processes. We show that their state space is always a union of open orthants with 0 as the only absorbing state and that there is no finite entrance law at 0 for these processes. We give conditions for these processes to satisfy the Feller property. Then we show that a Lamperti-type representation is also valid for -valued multi-self-similar Markov processes. In particular, we obtain a one-to-one relationship between this set of processes and the set of Markov additive processes with values in . We then apply this representation to study the almost sure asymptotic behavior of multi-self-similar Markov processes.
Keywords
Cite
@article{arxiv.1809.02085,
title = {On $\mathbb{R}^d$-valued multi-self-similar Markov processes},
author = {Loïc Chaumont and Salem Lamine},
journal= {arXiv preprint arXiv:1809.02085},
year = {2018}
}