English

A moment problem for random discrete measures

Probability 2015-03-17 v4

Abstract

Let XX be a locally compact Polish space. A random measure on XX is a probability measure on the space of all (nonnegative) Radon measures on XX. Denote by K(X)\mathbb K(X) the cone of all Radon measures η\eta on XX which are of the form η=isiδxi\eta=\sum_{i}s_i\delta_{x_i}, where, for each ii, si>0s_i>0 and δxi\delta_{x_i} is the Dirac measure at xiXx_i\in X. A random discrete measure on XX is a probability measure on K(X)\mathbb K(X). The main result of the paper states a necessary and sufficient condition (conditional upon a mild a priori bound) when a random measure μ\mu is also a random discrete measure. This condition is formulated solely in terms of moments of the random measure μ\mu. 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.

Keywords

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}
}
R2 v1 2026-06-22T01:56:44.728Z