Confidence sets for a level set in linear regression
Confidence sets for a level set in linear regression
Regression modeling is the workhorse of statistics and there is a vast literature on estimation of the regression function. It is realized in recent years that in regression analysis the ultimate aim may be the estimation of a level set of the regression function, instead of the estimation of the regression function itself. The published work on estimation of the level set has thus far focused mainly on nonparametric regression, especially on point estimation. In this paper, the construction of confidence sets for the level set of linear regression is considered. In particular, 1 − α level upper, lower and two-sided confidence sets are constructed for the normal-error linear regression. It is shown that these confidence sets can be easily constructed from the corresponding 1 − α level simultaneous confidence bands. It is also pointed out that the construction
method is readily applicable to other parametric regression models where the mean response depends on a linear predictor through a monotonic link function, which include generalized linear models, linear mixed models and generalized linear mixed models. Therefore the method proposed in this paper is widely applicable. Real example is used to illustrate the method.
Wan, Fang
dd06c26a-977d-41fd-9d8c-58c7393d90c2
Liu, Wei
b64150aa-d935-4209-804d-24c1b97e024a
Bretz, Frank
51270819-e491-4a72-a410-679d86231e64
Wan, Fang
dd06c26a-977d-41fd-9d8c-58c7393d90c2
Liu, Wei
b64150aa-d935-4209-804d-24c1b97e024a
Bretz, Frank
51270819-e491-4a72-a410-679d86231e64
Wan, Fang, Liu, Wei and Bretz, Frank
(2023)
Confidence sets for a level set in linear regression.
Statistics in Medicine.
(In Press)
Abstract
Regression modeling is the workhorse of statistics and there is a vast literature on estimation of the regression function. It is realized in recent years that in regression analysis the ultimate aim may be the estimation of a level set of the regression function, instead of the estimation of the regression function itself. The published work on estimation of the level set has thus far focused mainly on nonparametric regression, especially on point estimation. In this paper, the construction of confidence sets for the level set of linear regression is considered. In particular, 1 − α level upper, lower and two-sided confidence sets are constructed for the normal-error linear regression. It is shown that these confidence sets can be easily constructed from the corresponding 1 − α level simultaneous confidence bands. It is also pointed out that the construction
method is readily applicable to other parametric regression models where the mean response depends on a linear predictor through a monotonic link function, which include generalized linear models, linear mixed models and generalized linear mixed models. Therefore the method proposed in this paper is widely applicable. Real example is used to illustrate the method.
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Accepted/In Press date: 5 December 2023
Identifiers
Local EPrints ID: 485831
URI: http://eprints.soton.ac.uk/id/eprint/485831
ISSN: 0277-6715
PURE UUID: b2993070-d464-4347-915e-93ef0eb77433
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Date deposited: 20 Dec 2023 17:33
Last modified: 18 Mar 2024 02:38
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Author:
Fang Wan
Author:
Frank Bretz
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