Exact Coupling of Random Walks on Polish Groups

Abstract

Exact coupling of random walks is studied. Conditions for admitting a successful exact coupling are given that are necessary and in the Abelian case also sufficient. In the Abelian case, it is shown that a random walk S with step-length distribution μ started at 0 admits a successful exact coupling with a version Sx started at x if and only if there is n≥ 1 with μn μn(x+·) ≠ 0. Moreover, when a successful exact coupling exists, the total variation distance between Sn and Sxn is determined to be O(n-1/2) if x has infinite order, or O(n) for some ∈ (0,1) if x has finite order. In particular, this paper solves a problem posed by H. Thorisson on successful exact coupling of random walks on R. It is also noted that the set of such x for which a successful exact coupling can be constructed is a Borel measurable group. Lastly, the weaker notion of possible exact coupling and its relationship to successful exact coupling are studied.