A Zero-One Law for Markov Chains

Abstract

We prove an analog of the classical Zero-One Law for both homogeneous and nonhomogeneous Markov chains (MC). Its almost precise formulation is simple: given any event A from the tail σ-algebra of MC (Zn), for large n, with probability near one, the trajectories of the MC are in states i, where P(A|Zn=i) is either near 0 or near 1. A similar statement holds for the entrance σ-algebra, when n tends to -∞. To formulate this second result, we give detailed results on the existence of nonhomogeneous Markov chains indexed by Z- or Z in both the finite and countable cases. This extends a well-known result due to Kolmogorov. Further, in our discussion, we note an interesting dichotomy between two commonly used definitions of MCs.