Measure-valued P\'olya processes
Abstract
A P\'olya urn process is a Markov chain that models the evolution of an urn containing some coloured balls, the set of possible colours being for . At each time step, a random ball is chosen uniformly in the urn. It is replaced in the urn and, if its colour is , balls of colour are also added (for all ). We introduce a model of measure-valued processes that generalises this construction. This generalisation includes the case when the space of colours is a (possibly infinite) Polish space . We see the urn composition at any time step as a measure -- possibly non atomic -- on . In this generalisation, we choose a random colour according to the probability distribution proportional to , and add a measure in the urn, where the quantity of a Borel set models the added weight of "balls" with colour in . We study the asymptotic behaviour of these measure-valued P\'olya urn processes, and give some conditions on the replacements measures for the sequence of measures to converge in distribution, possibly after rescaling. For certain models, related to branching random walks, is shown to converge almost surely under some moment hypothesis; a particular case of this last result gives the almost sure convergence of the (renormalised) profile of the random recursive tree to a standard Gaussian.
Keywords
Cite
@article{arxiv.1610.09057,
title = {Measure-valued P\'olya processes},
author = {Cécile Mailler and Jean-François Marckert},
journal= {arXiv preprint arXiv:1610.09057},
year = {2017}
}