Decoupling for Markov Chains
Abstract
Consider a Markov chain (Xi)i0 with invariant measure μ that admits the representation Xi+1=(Xi,Ui), where (Ui)i0 are i.i.d. random variables and is a measurable map. We introduce a tangent-decoupled process ( Xi)i0 obtained by replacing (Ui) with an independent copy. Conditional on the realized backbone (Xi), the sequence (f( Xi)) is independent. Although ( Xi) is not Markovian, under the same ergodicity assumptions that ensure a law of large numbers for (Xi), the empirical averages n-1Σi=1n f( Xi) converge almost surely to μ(f). In addition, for every f∈ L2(μ) and every N1, Var\!(Σi=1N f(Xi)) \;\; 2\,Var\!(Σi=1N f( Xi)), and therefore σf2 2\,σf\,2 for the corresponding time-average variance constants. The inequality requires neither reversibility nor mixing assumptions. Its proof identifies the two sequences as tangent in the sense of decoupling theory and applies the sharp L2 tangent decoupling inequality of de la Pe\~na, Yao, and Alemayehu (2025).
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