A moment problem for random discrete measures
Abstract
Let be a locally compact Polish space. A random measure on is a probability measure on the space of all (nonnegative) Radon measures on . Denote by the cone of all Radon measures on which are of the form , where, for each , and is the Dirac measure at . A random discrete measure on is a probability measure on . The main result of the paper states a necessary and sufficient condition (conditional upon a mild a priori bound) when a random measure is also a random discrete measure. This condition is formulated solely in terms of moments of the random measure . Classical examples of random discrete measures are completely random measures and additive subordinators, however, the main result holds independently of any independence property. As a corollary, a characterisation via a moments is given when a random measure is a point process.
Cite
@article{arxiv.1310.7872,
title = {A moment problem for random discrete measures},
author = {Yuri Kondratiev and Tobias Kuna and Eugene Lytvynov},
journal= {arXiv preprint arXiv:1310.7872},
year = {2015}
}