Canonical correlations for dependent gamma processes
Abstract
The present paper provides a characterisation of exchangeable pairs of random measures whose identical margins are fixed to coincide with the distribution of a gamma completely random measure, and whose dependence structure is given in terms of canonical correlations. It is first shown that canonical correlation sequences for the finite-dimensional distributions of are moments of means of a Dirichlet process having random base measure. Necessary and sufficient conditions are further given for canonically correlated gamma completely random measures to have independent joint increments. Finally, time-homogeneous Feller processes with gamma reversible measure and canonical autocorrelations are characterised as Dawson--Watanabe diffusions with independent homogeneous immigration, time-changed via an independent subordinator. It is thus shown that Dawson--Watanabe diffusions subordinated by pure drift are the only processes in this class whose time-finite-dimensional distributions have, jointly, independent increments.
Cite
@article{arxiv.1601.06079,
title = {Canonical correlations for dependent gamma processes},
author = {Dario Spanò and Antonio Lijoi},
journal= {arXiv preprint arXiv:1601.06079},
year = {2016}
}