Some probabilistic properties of fractional point processes

Abstract

This paper studies the first hitting times of generalized Poisson processes Nf(t), related to Bernstein functions f. For the space-fractional Poisson processes, Nα(t), t>0 (corresponding to f= xα), the hitting probabilities P\Tkα<∞\ are explicitly obtained and analyzed. The processes Nf(t) are time-changed Poisson processes N(Hf(t)) with subordinators Hf(t) and here we study N(Σj=1n Hfj(t)) and obtain probabilistic features of these extended counting processes. A section of the paper is devoted to processes of the form N(|GH,(t)|) where GH,(t) are generalized grey Brownian motions. This involves the theory of time-dependent fractional operators of the McBride form. While the time-fractional Poisson process is a renewal process, we prove that the space-time Poisson process is no longer a renewal process.