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Geometric ergodicity of Harris recurrent Marcov chains with applications to renewal theory

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  • Nummelin, Esa
  • Tuominen, Pekka

Abstract

Let (Xn) be a positive recurrent Harris chain on a general state space, with invariant probability measure [pi]. We give necessary and sufficient conditions for the geometric convergence of [lambda]Pnf towards its limit [pi](f), and show that when such convergence happens it is, in fact, uniform over f and in L1([pi])-norm. As a corollary we obtain that, when (Xn) is geometrically ergodic, [is proportional to] [pi](dx)||Pn(x,·)-[pi]|| converges to zero geometrically fast. We also characterize the geometric ergodicity of (Xn) in terms of hitting time distributions. We show that here the so-called small sets act like individual points of a countable state space chain. We give a test function criterion for geometric ergodicity and apply it to random walks on the positive half line. We apply these results to non-singular renewal processes on [0,[infinity]) providing a probabilistic approach to the exponencial convergence of renewal measures.

Suggested Citation

  • Nummelin, Esa & Tuominen, Pekka, 1982. "Geometric ergodicity of Harris recurrent Marcov chains with applications to renewal theory," Stochastic Processes and their Applications, Elsevier, vol. 12(2), pages 187-202, March.
    • Handle: RePEc:eee:spapps:v:12:y:1982:i:2:p:187-202
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    Cited by:

    1. Duffie, Darrell & Singleton, Kenneth J, 1993. "Simulated Moments Estimation of Markov Models of Asset Prices," Econometrica, Econometric Society, vol. 61(4), pages 929-952, July.
    2. Konstantin Avrachenkov & Alexey Piunovskiy & Yi Zhang, 2018. "Hitting Times in Markov Chains with Restart and their Application to Network Centrality," Methodology and Computing in Applied Probability, Springer, vol. 20(4), pages 1173-1188, December.
    3. Richard C. Bradley, 2021. "On some basic features of strictly stationary, reversible Markov chains," Journal of Time Series Analysis, Wiley Blackwell, vol. 42(5-6), pages 499-533, September.
    4. Kevei, Péter, 2018. "Ergodic properties of generalized Ornstein–Uhlenbeck processes," Stochastic Processes and their Applications, Elsevier, vol. 128(1), pages 156-181.
    5. Leblanc, Frédérique, 1996. "Wavelet linear density estimator for a discrete-time stochastic process: Lp-losses," Statistics & Probability Letters, Elsevier, vol. 27(1), pages 71-84, March.
    6. Achim Wübker, 2013. "Asymptotic Optimality of Isoperimetric Constants," Journal of Theoretical Probability, Springer, vol. 26(1), pages 198-221, March.
    7. Allam, Abdelazziz & Mourid, Tahar, 2002. "Geometric absolute regularity of Banach space-valued autoregressive processes," Statistics & Probability Letters, Elsevier, vol. 60(3), pages 241-252, December.
    8. Djellout, H. & Guillin, A., 2001. "Moderate deviations for Markov chains with atom," Stochastic Processes and their Applications, Elsevier, vol. 95(2), pages 203-217, October.

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