Exchangeable Markov processes on graphs: Feller case
Probability
2015-09-23 v1
Abstract
The transition law of every exchangeable Feller process on the space of countable graphs is determined by a -finite measure on the space of -valued arrays. In discrete-time, this characterization amounts to a construction from an independent, identically distributed sequence of exchangeable random functions. In continuous-time, the behavior is enriched by a L\'evy--It\^o-type decomposition of the jump measure into mutually singular components that govern global, vertex-level, and edge-level dynamics. Furthermore, every such process almost surely projects to a Feller process in the space of graph limits.
Cite
@article{arxiv.1509.06701,
title = {Exchangeable Markov processes on graphs: Feller case},
author = {Harry Crane},
journal= {arXiv preprint arXiv:1509.06701},
year = {2015}
}