Rates of memory loss for null recurrent Markov chains
Abstract
Orey (1962) proved that for an irreducible, aperiodic, and recurrent Markov chain with transition operator P, the sequence Pn (μ - ) converges to zero in total variation for any two probability measures μ and . In other words, all such Markov chains exhibit memory loss. While the rates of memory loss have been extensively studied for positive recurrent chains, there is a surprising lack of results for null recurrent chains. In this work, we prove the first estimates of memory loss rates in the null recurrent case.
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