The Stationary Bootstrap

This article introduces a resampling procedure called the stationary bootstrap as a means of calculating standard errors of estimators and constructing confidence regions for parameters based on weakly dependent stationary observations. Previously, a technique based on resampling blocks of consecuti...

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Veröffentlicht in:	Journal of the American Statistical Association 1994-12, Vol.89 (428), p.1303-1313
Hauptverfasser:	Politis, Dimitris N., Romano, Joseph P.
Format:	Artikel
Sprache:	eng
Schlagworte:	Approximate confidence limit Approximation Bootstrap resampling Confidence interval Estimators Exact sciences and technology Mathematical theorems Mathematics Nonparametric inference Probability and statistics Sample mean Sampling Sampling distributions Sciences and techniques of general use Statistical methods Statistical variance Statistics Steepest descent method Theory and Methods Time Series
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creator	Politis, Dimitris N. Romano, Joseph P.
description	This article introduces a resampling procedure called the stationary bootstrap as a means of calculating standard errors of estimators and constructing confidence regions for parameters based on weakly dependent stationary observations. Previously, a technique based on resampling blocks of consecutive observations was introduced to construct confidence intervals for a parameter of the m-dimensional joint distribution of m consecutive observations, where m is fixed. This procedure has been generalized by constructing a "blocks of blocks" resampling scheme that yields asymptotically valid procedures even for a multivariate parameter of the whole (i.e., infinite-dimensional) joint distribution of the stationary sequence of observations. These methods share the construction of resampling blocks of observations to form a pseudo-time series, so that the statistic of interest may be recalculated based on the resampled data set. But in the context of applying this method to stationary data, it is natural to require the resampled pseudo-time series to be stationary (conditional on the original data) as well. Although the aforementioned procedures lack this property, the stationary procedure developed here is indeed stationary and possesses other desirable properties. The stationary procedure is based on resampling blocks of random length, where the length of each block has a geometric distribution. In this article, fundamental consistency and weak convergence properties of the stationary resampling scheme are developed.
doi_str_mv	10.1080/01621459.1994.10476870
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Previously, a technique based on resampling blocks of consecutive observations was introduced to construct confidence intervals for a parameter of the m-dimensional joint distribution of m consecutive observations, where m is fixed. This procedure has been generalized by constructing a "blocks of blocks" resampling scheme that yields asymptotically valid procedures even for a multivariate parameter of the whole (i.e., infinite-dimensional) joint distribution of the stationary sequence of observations. These methods share the construction of resampling blocks of observations to form a pseudo-time series, so that the statistic of interest may be recalculated based on the resampled data set. But in the context of applying this method to stationary data, it is natural to require the resampled pseudo-time series to be stationary (conditional on the original data) as well. Although the aforementioned procedures lack this property, the stationary procedure developed here is indeed stationary and possesses other desirable properties. The stationary procedure is based on resampling blocks of random length, where the length of each block has a geometric distribution. 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P.</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>The Stationary Bootstrap</atitle><jtitle>Journal of the American Statistical Association</jtitle><date>1994-12-01</date><risdate>1994</risdate><volume>89</volume><issue>428</issue><spage>1303</spage><epage>1313</epage><pages>1303-1313</pages><issn>0162-1459</issn><eissn>1537-274X</eissn><coden>JSTNAL</coden><abstract>This article introduces a resampling procedure called the stationary bootstrap as a means of calculating standard errors of estimators and constructing confidence regions for parameters based on weakly dependent stationary observations. Previously, a technique based on resampling blocks of consecutive observations was introduced to construct confidence intervals for a parameter of the m-dimensional joint distribution of m consecutive observations, where m is fixed. This procedure has been generalized by constructing a "blocks of blocks" resampling scheme that yields asymptotically valid procedures even for a multivariate parameter of the whole (i.e., infinite-dimensional) joint distribution of the stationary sequence of observations. These methods share the construction of resampling blocks of observations to form a pseudo-time series, so that the statistic of interest may be recalculated based on the resampled data set. But in the context of applying this method to stationary data, it is natural to require the resampled pseudo-time series to be stationary (conditional on the original data) as well. Although the aforementioned procedures lack this property, the stationary procedure developed here is indeed stationary and possesses other desirable properties. The stationary procedure is based on resampling blocks of random length, where the length of each block has a geometric distribution. In this article, fundamental consistency and weak convergence properties of the stationary resampling scheme are developed.</abstract><cop>Alexandria, VA</cop><pub>Taylor & Francis Group</pub><doi>10.1080/01621459.1994.10476870</doi><tpages>11</tpages><oa>free_for_read</oa></addata></record>
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subjects	Approximate confidence limit Approximation Bootstrap resampling Confidence interval Estimators Exact sciences and technology Mathematical theorems Mathematics Nonparametric inference Probability and statistics Sample mean Sampling Sampling distributions Sciences and techniques of general use Statistical methods Statistical variance Statistics Steepest descent method Theory and Methods Time Series
title	The Stationary Bootstrap
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