Exponential inequalities for unbounded functions of geometrically ergodic Markov chains: applications to quantitative error bounds for regenerative Metropolis algorithms

Wintenberger Olivier

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Exponential inequalities for unbounded functions of geometrically ergodic Markov chains: applications to quantitative error bounds for regenerative Metropolis algorithms

机译：几何遍历马尔可夫链的无穷函数的指数不等式：应用于再生Metropolis算法的定量误差范围

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The aim of this note is to investigate the concentration properties of unbounded functions of geometrically ergodic Markov chains. We derive concentration properties of centred functions with respect to the square of Lyapunov's function in the drift condition satisfied by the Markov chain. We apply the new exponential inequalities to derive confidence intervals for Markov Chain Monte Carlo algorithms. Quantitative error bounds are provided for the regenerative Metropolis algorithm of [Brockwell and Kadane Identification of regeneration times in MCMC simulation, with application to adaptive schemes. J Comput Graphical Stat. 2005;14(2)].

机译：本注释的目的是研究几何遍历马尔可夫链的无界函数的浓度特性。在马尔可夫链满足的漂移条件下，我们得出中心函数相对于李雅普诺夫函数平方的集中性质。我们应用新的指数不等式来推导马尔可夫链蒙特卡罗算法的置信区间。为MCMC模拟中的[Brockwell和Kadane的再生时间识别]的Metropolis算法提供了定量误差范围，并将其应用于自适应方案。 J Comput图形统计。 2005; 14（2）]。

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来源
《Statistics》 |2017年第3期|222-234|共13页
作者
Wintenberger Olivier;
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作者单位

Sorbonne Univ, LSTA, Paris, France|Univ Copenhagen, Dept Math Sci, Copenhagen, Denmark;

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收录信息美国《科学引文索引》(SCI);
原文格式 PDF
正文语种 eng
中图分类
关键词
Markov chains; exponential inequalities; Metropolis algorithm; confidence interval;

机译：马尔可夫链;指数不等式;Metropolis算法;置信区间;

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专利

1. Introduction to 'Quantitative bounds of convergence for geometrically ergodic Markov Chain in the Wasserstein distance with application to the Metropolis adjusted Langevin algorithm' by A. Durmus, E. Moulines [J] . Heikki Haario Statistics and computing . 2015,第1期

机译：A. Durmus，E. Moulines所著的“ Wasserstein距离上的几何遍历马尔可夫链的收敛量化界及其在大都会调整的Langevin算法中的应用”简介
2. Quantitative bounds of convergence for geometrically ergodic Markov chain in the Wasserstein distance with application to the Metropolis Adjusted Langevin Algorithm [J] . Alain Durmus, Eric Moulines Statistics and computing . 2015,第1期

机译：Wasserstein距离上几何遍历马尔可夫链的收敛定量界及其在大都会调整的Langevin算法中的应用。
3. Generalization bounds of ERM algorithm with V-geometrically Ergodic Markov chains [J] . Zou B., Xu Z., Chang X. Advances in computational mathematics . 2012,第1期

机译：V几何遍历马尔可夫链的ERM算法的广义界
4. Applications of differential inequalities to bounding the rate of convergence for continuous-time Markov chains [C] . Alexander Zeifman, Yacov Satin, Ksenia Kiseleva, International Conference of Numerical Analysis and Applied Mathematics . 2019

机译：差分不等式对连续时间马尔可夫链的收敛速率的应用
5. Geometric bounds for Markov chain and brief applications in Monte Carlo methods. [D] . Zhang, Beijia. 2010

机译：马尔可夫链的几何边界及其在蒙特卡洛方法中的简要应用。
6. Estimates and Standard Errors for Ratios of Normalizing Constants from Multiple Markov Chains via Regeneration [O] . Hani Doss, Aixin Tan -1

机译：通过再生从多个马尔可夫链归一化常数的比率的估计和标准误差
7. Exponential inequalities for unbounded functions of geometrically ergodic Markov chains: applications to quantitative error bounds for regenerative Metropolis algorithms [O] . Olivier Wintenberger 2016

机译：几何ergodic Markov链条未绑定功能的指数不等式：对再生大都市算法定量误差界的应用

Exponential inequalities for unbounded functions of geometrically ergodic Markov chains: applications to quantitative error bounds for regenerative Metropolis algorithms

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