Exponential forgetting of smoothing distributions for pairwise Markov models

Abstract

We consider a bivariate Markov chain Z=\Zk\k ≥ 1=\(Xk,Yk)\k ≥ 1 taking values on product space Z= X × Y, where X is possibly uncountable space and Y=\1,…, | Y|\ is a finite state-space. The purpose of the paper is to find sufficient conditions that guarantee the exponential convergence of smoothing, filtering and predictive probabilities: n≥ t\|P(Yt:∞∈ ·|Xl:n)-P(Yt:∞∈ ·|Xs:n) \| TV ≤ Ks αt, a.s. Here t≥ s≥ l≥ 1, Ks is σ(Xs:∞)-measurable finite random variable and α∈ (0,1) is fixed. In the second part of the paper, we establish two-sided versions of the above-mentioned convergence. We show that the desired convergences hold under fairly general conditions. A special case of above-mentioned very general model is popular hidden Markov model (HMM). We prove that in HMM-case, our assumptions are more general than all similar mixing-type of conditions encountered in practice, yet relatively easy to verify.