Construction of exact simultaneous confidence bands for a simple linear regression model
Construction of exact simultaneous confidence bands for a simple linear regression model
A simultaneous confidence band provides a variety of inferences on the unknown components of a regression model. There are several recent papers using confidence bands for various inferential purposes; see for example, Sun et al. (1999), Spurrier (1999), Al-Saidy et al. (2003), Liu et al. (2004), Bhargava & Spurrier (2004), Piegorsch et al. (2005) and Liu et al. (2007). Construction of simultaneous confidence bands for a simple linear regression model has a rich history, going back to the work of Working & Hotelling (1929). The purpose of this article is to consolidate the disparate modern literature on simultaneous confidence bands in linear regression, and to provide expressions for the construction of exact 1 ?? level simultaneous confidence bands for a simple linear regression model of either one-sided or two-sided form. We center attention on the three most recognized shapes: hyperbolic, two-segment, and three-segment (which is also referred to as a trapezoidal shape and includes a constant-width band as a special case). Some of these expressions have already appeared in the statistics literature, and some are newly derived in this article. The derivations typically involve a standard bivariate t random vector and its polar coordinate transformation.
simple linear regression, simultaneous inferences, bivariate normal, bivariate t, polar coordinators
39-57
Liu, Wei
b64150aa-d935-4209-804d-24c1b97e024a
Lin, Shan
bfe510b2-7341-4d60-a51a-78b20e02f1cc
Piegorsch, Walter W.
6ab7db8a-3427-4c69-b127-e530fb52b7db
7 March 2008
Liu, Wei
b64150aa-d935-4209-804d-24c1b97e024a
Lin, Shan
bfe510b2-7341-4d60-a51a-78b20e02f1cc
Piegorsch, Walter W.
6ab7db8a-3427-4c69-b127-e530fb52b7db
Liu, Wei, Lin, Shan and Piegorsch, Walter W.
(2008)
Construction of exact simultaneous confidence bands for a simple linear regression model.
International Statistical Review, 76 (1), .
(doi:10.1111/j.1751-5823.2007.00027.x).
Abstract
A simultaneous confidence band provides a variety of inferences on the unknown components of a regression model. There are several recent papers using confidence bands for various inferential purposes; see for example, Sun et al. (1999), Spurrier (1999), Al-Saidy et al. (2003), Liu et al. (2004), Bhargava & Spurrier (2004), Piegorsch et al. (2005) and Liu et al. (2007). Construction of simultaneous confidence bands for a simple linear regression model has a rich history, going back to the work of Working & Hotelling (1929). The purpose of this article is to consolidate the disparate modern literature on simultaneous confidence bands in linear regression, and to provide expressions for the construction of exact 1 ?? level simultaneous confidence bands for a simple linear regression model of either one-sided or two-sided form. We center attention on the three most recognized shapes: hyperbolic, two-segment, and three-segment (which is also referred to as a trapezoidal shape and includes a constant-width band as a special case). Some of these expressions have already appeared in the statistics literature, and some are newly derived in this article. The derivations typically involve a standard bivariate t random vector and its polar coordinate transformation.
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Published date: 7 March 2008
Keywords:
simple linear regression, simultaneous inferences, bivariate normal, bivariate t, polar coordinators
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Local EPrints ID: 55204
URI: http://eprints.soton.ac.uk/id/eprint/55204
ISSN: 0306-7734
PURE UUID: 6e2fca7e-608a-44d6-b493-3b4266509b54
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Date deposited: 05 Aug 2008
Last modified: 16 Mar 2024 02:42
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Author:
Shan Lin
Author:
Walter W. Piegorsch
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