English

Exchangeable interval hypergraphs and limits of ordered discrete structures

Probability 2018-02-27 v1

Abstract

A hypergraph (V,E)(V,E) is called an interval hypergraph if there exists a linear order ll on VV such that every edge eEe\in E is an interval w.r.t. ll; we also assume that {j}E\{j\}\in E for every jVj\in V. Our main result is a de Finetti-type representation of random exchangeable interval hypergraphs on N\mathbb{N} (EIHs): the law of every EIH can be obtained by sampling from some random compact subset KK of the triangle {(x,y):0xy1}\{(x,y):0\leq x\leq y\leq 1\} at iid uniform positions U1,U2,U_1,U_2,\dots, in the sense that, restricted to the node set [n]:={1,,n}[n]:=\{1,\dots,n\} every non-singleton edge is of the form e={i[n]:x<Ui<y}e=\{i\in[n]:x<U_i<y\} for some (x,y)K(x,y)\in K. We obtain this result via the study of a related class of stochastic objects: erased-interval processes (EIPs). These are certain transient Markov chains (In,ηn)nN(I_n,\eta_n)_{n\in\mathbb{N}} such that InI_n is an interval hypergraph on V=[n]V=[n] w.r.t. the usual linear order (called interval system). We present an almost sure representation result for EIPs. Attached to each transient Markov chain is the notion of Martin boundary. The points in the boundary attached to EIPs can be seen as limits of growing interval systems. We obtain a one-to-one correspondence between these limits and compact subsets KK of the triangle with (x,x)K(x,x)\in K for all x[0,1]x\in[0,1]. Interval hypergraphs are a generalizations of hierarchies and as a consequence we obtain a representation result for exchangeable hierarchies, which is close to a result of Forman, Haulk and Pitman. Several ordered discrete structures can be seen as interval systems with additional properties, i.e. Schr\"oder trees and binary trees. We describe limits of Schr\"oder trees as certain tree-like compact sets. Considering binary trees we thus obtain a homeomorphic description of the Martin boundary of R\'emy's tree growth chain, which has been analyzed by Evans, Gr\"ubel and Wakolbinger.

Keywords

Cite

@article{arxiv.1802.09015,
  title  = {Exchangeable interval hypergraphs and limits of ordered discrete structures},
  author = {Julian Gerstenberg},
  journal= {arXiv preprint arXiv:1802.09015},
  year   = {2018}
}

Comments

36 pages, 11 figures

R2 v1 2026-06-23T00:32:43.617Z