Simultaneous confidence bands for linear regression with covariates constrained in intervals
Simultaneous confidence bands for linear regression with covariates constrained in intervals
The focus of this article is on simultaneous confidence bands over a rectangular covariate region for a linear regression model with k>1 covariates, for which only conservative or approximate confidence bands are available in the statistical literature stretching back to Working & Hotelling (J. Amer. Statist. Assoc.24, 1929; 73–85). Formulas of simultaneous confidence levels of the hyperbolic and constant width bands are provided. These involve only a k-dimensional integral; it is unlikely that the simultaneous confidence levels can be expressed as an integral of less than k-dimension. These formulas allow the construction for the first time of exact hyperbolic and constant width confidence bands for at least a small k(>1) by using numerical quadrature. Comparison between the hyperbolic and constant width bands is then addressed under both the average width and minimum volume confidence set criteria. It is observed that the constant width band can be drastically less efficient than the hyperbolic band when k>1. Finally it is pointed out how the methods given in this article can be applied to more general regression models such as fixed-effect or random-effect generalized linear regression models.
linear regression, multiple comparison, quadratic programming, simultaneous confidence bands
543-553
Liu, Wei
b64150aa-d935-4209-804d-24c1b97e024a
Ah-Kine, Pascal
7c5dddd5-7892-4863-a0bf-b25bf9da172f
Zhou, Sanyu
8b006abb-cfc9-4099-94b3-a6f9a034decf
September 2012
Liu, Wei
b64150aa-d935-4209-804d-24c1b97e024a
Ah-Kine, Pascal
7c5dddd5-7892-4863-a0bf-b25bf9da172f
Zhou, Sanyu
8b006abb-cfc9-4099-94b3-a6f9a034decf
Liu, Wei, Ah-Kine, Pascal and Zhou, Sanyu
(2012)
Simultaneous confidence bands for linear regression with covariates constrained in intervals.
Scandinavian Journal of Statistics, 39 (3), .
(doi:10.1111/j.1467-9469.2011.00780.x).
Abstract
The focus of this article is on simultaneous confidence bands over a rectangular covariate region for a linear regression model with k>1 covariates, for which only conservative or approximate confidence bands are available in the statistical literature stretching back to Working & Hotelling (J. Amer. Statist. Assoc.24, 1929; 73–85). Formulas of simultaneous confidence levels of the hyperbolic and constant width bands are provided. These involve only a k-dimensional integral; it is unlikely that the simultaneous confidence levels can be expressed as an integral of less than k-dimension. These formulas allow the construction for the first time of exact hyperbolic and constant width confidence bands for at least a small k(>1) by using numerical quadrature. Comparison between the hyperbolic and constant width bands is then addressed under both the average width and minimum volume confidence set criteria. It is observed that the constant width band can be drastically less efficient than the hyperbolic band when k>1. Finally it is pointed out how the methods given in this article can be applied to more general regression models such as fixed-effect or random-effect generalized linear regression models.
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e-pub ahead of print date: 11 April 2012
Published date: September 2012
Keywords:
linear regression, multiple comparison, quadratic programming, simultaneous confidence bands
Organisations:
Statistics, Statistical Sciences Research Institute
Identifiers
Local EPrints ID: 346912
URI: http://eprints.soton.ac.uk/id/eprint/346912
ISSN: 0303-6898
PURE UUID: 64a2c724-4539-4111-801c-ec09e301d25d
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Date deposited: 11 Jan 2013 16:48
Last modified: 15 Mar 2024 02:43
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Author:
Pascal Ah-Kine
Author:
Sanyu Zhou
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