English

A Zero-One Law for Virtual Markov Chains

Probability 2022-02-08 v1

Abstract

A virtual Markov chain (VMC) is a sequence {XN}N=0\{X_N\}_{N=0}^{\infty} of Markov chains (MCs) coupled together on the same probability space such that XNX_N has state space {0,1,,N}\{0,1,\ldots, N\} and such that removing all instances of N + 1N~+~1 from the sample path of XN+1X_{N+1} results in the sample path of XNX_N almost surely. In this paper, we prove an exact characterization of the triviality of the σ\sigma-algebra N=0σ(XN,XN+1,)\bigcap_{N=0}^{\infty}\sigma(X_N,X_{N+1},\ldots). The main tool for doing this is a decomposition theorem that the σ\sigma-algebra generated by a VMC is equal to the σ\sigma-algebra generated by a certain countably infinite collection of independent constituent MCs. These constituents are so-called staircase MCs (SMCs), which are defined to be inhomoheneous Markov chains on the non-negative integers which transition only by holding or by jumping to a value equal to the current index. We also develop some general aspects of the theory of SMCs, including a connection with some classical but very much under-appreciated aspects of convex analysis.

Keywords

Cite

@article{arxiv.2202.02638,
  title  = {A Zero-One Law for Virtual Markov Chains},
  author = {Adam Quinn Jaffe},
  journal= {arXiv preprint arXiv:2202.02638},
  year   = {2022}
}

Comments

24 pages, 3 figures

R2 v1 2026-06-24T09:22:02.124Z