English

The structure of combinatorial Markov processes

Probability 2016-05-27 v2 Logic

Abstract

Every exchangeable Feller process taking values in a suitably nice combinatorial state space can be constructed by a system of iterated random Lipschitz functions. In discrete time, the construction proceeds by iterated application of independent, identically distributed functions, while in continuous time the random functions occur as the atoms of a time homogeneous Poisson point process. We further show that every exchangeable Feller process projects to a Feller process in an appropriate limit space, akin to the projection of partition-valued processes into the ranked-simplex and graph-valued processes into the space of graph limits. Together, our main theorems establish common structural features shared by all exchangeable combinatorial Feller processes, regardless of the dynamics or resident state space, thereby generalizing behaviors previously observed for exchangeable coalescent and fragmentation processes as well as other combinatorial stochastic processes. If, in addition, an exchangeable Feller process evolves on a state space satisfying the nn-disjoint amalgamation property for all n1n\geq1, then its jump measure can be decomposed explicitly in the sense of L\'evy--It\^o--Khintchine.

Keywords

Cite

@article{arxiv.1603.05954,
  title  = {The structure of combinatorial Markov processes},
  author = {Harry Crane and Henry Towsner},
  journal= {arXiv preprint arXiv:1603.05954},
  year   = {2016}
}

Comments

58 pages

R2 v1 2026-06-22T13:14:09.996Z