GEOMETRIC ERGODICITY AND HYBRID MARKOV CHAINS

被引:185
|
作者
Roberts, Gareth O. [1 ]
Rosenthal, Jeffrey S. [2 ]
机构
[1] Univ Cambridge, Stat Lab, Cambridge CB2 1SB, England
[2] Univ Toronto, Dept Stat, Toronto, ON M5S 3G3, Canada
来源
ELECTRONIC COMMUNICATIONS IN PROBABILITY | 1997年 / 2卷
关键词
Ergodicity; Markov Chain; Monte Carlo;
D O I
10.1214/ECP.v2-981
中图分类号
O21 [概率论与数理统计]; C8 [统计学];
学科分类号
020208 ; 070103 ; 0714 ;
摘要
Various notions of geometric ergodicity for Markov chains on general state spaces exist. In this paper, we review certain relations and implications among them. We then apply these results to a collection of chains commonly used in Markov chain Monte Carlo simulation algorithms, the so-called hybrid chains. We prove that under certain conditions, a hybrid chain will "inherit" the geometric ergodicity of its constituent parts.
引用
收藏
页码:13 / 25
页数:13
相关论文
共 50 条
  • [1] Equivalences of Geometric Ergodicity of Markov Chains
    Gallegos-Herrada, Marco A.
    Ledvinka, David
    Rosenthal, Jeffrey S.
    [J]. JOURNAL OF THEORETICAL PROBABILITY, 2024, 37 (02) : 1230 - 1256
  • [2] GEOMETRIC ERGODICITY IN DENUMERABLE MARKOV CHAINS
    VEREJONES, D
    [J]. QUARTERLY JOURNAL OF MATHEMATICS, 1962, 13 (49): : 7 - &
  • [3] CONDITIONS OF GEOMETRIC ERGODICITY FOR ENUMERABLE MARKOV CHAINS
    POPOV, NN
    [J]. DOKLADY AKADEMII NAUK SSSR, 1977, 234 (02): : 316 - 319
  • [4] Geometric ergodicity for classes of homogeneous Markov chains
    Galtchouk, L.
    Pergamenshchikov, S.
    [J]. STOCHASTIC PROCESSES AND THEIR APPLICATIONS, 2014, 124 (10) : 3362 - 3391
  • [5] Extremal indices, geometric ergodicity of Markov chains, and MCMC
    Roberts G.O.
    Rosenthal J.S.
    Segers J.
    Sousa B.
    [J]. Extremes, 2006, 9 (3-4) : 213 - 229
  • [6] Erratum to: Extremal indices, geometric ergodicity of Markov chains, and MCMC
    Gareth O. Roberts
    Jeffrey S. Rosenthal
    Johan Segers
    Bruno Sousa
    [J]. Extremes, 2010, 13 (3) : 373 - 374
  • [7] Geometric ergodicity and the spectral gap of non-reversible Markov chains
    Kontoyiannis, I.
    Meyn, S. P.
    [J]. PROBABILITY THEORY AND RELATED FIELDS, 2012, 154 (1-2) : 327 - 339
  • [8] GEOMETRIC ERGODICITY OF MARKOV-CHAINS WITH THE ARBITRARY PHASE-SPACE
    POPOV, NN
    [J]. DOKLADY AKADEMII NAUK SSSR, 1979, 247 (04): : 798 - 802
  • [9] GEOMETRIC ERGODICITY AND R-POSITIVITY FOR GENERAL MARKOV-CHAINS
    NUMMELIN, E
    TWEEDIE, RL
    [J]. ANNALS OF PROBABILITY, 1978, 6 (03): : 404 - 420
  • [10] Geometric ergodicity and the spectral gap of non-reversible Markov chains
    I. Kontoyiannis
    S. P. Meyn
    [J]. Probability Theory and Related Fields, 2012, 154 : 327 - 339
12345