Generalized linear models (GLM) include many useful models. This
paper studies simultaneous confidence regions for the mean response function in
these models. The coverage probabilities of these regions are related to tail
probabilities of maxima of Gaussian random fields, asymptotically, and hence,
the so-called tube formula is applicable without any modification. However, in
the generalized linear models, the errors are often nonadditive and
non-Gaussian and may be discrete. This poses a challenge to the accuracy of the
approximation by the tube formula in the moderate sample situation. Here two
alternative approaches are considered. These approaches are based on an
Edgeworth expansion for the distribution of a maximum likelihood estimator and
a version of Skorohod’s representation theorem, which are used to
convert an error term (which is of order $n^{-1 /2}$ in one-sided confidence
regions and of $n^{-1} in two-sided confidence regions) from the Edgeworth
expansion to a “bias” term. The bias is then estimated and
corrected in two ways to adjust the approximation formula. Examples and
simulations show that our methods are viable and complementary to existing
methods. An application to insect data is provided. Code for implementing our
procedures is available via the software parfit
Publié le : 2000-04-15
Classification:
Tube formula,
Edgeworth expansion,,
maximum of Gaussian random fields,
regression,
simultaneous confidence bands,
62F25,
62J12,
60G70,
60G15,
62G07,
62E20
@article{1016218225,
author = {Sun, Jiayang and Loader, Catherine and McCormick, William P.},
title = {Confidence bands in generalized linear models},
journal = {Ann. Statist.},
volume = {28},
number = {3},
year = {2000},
pages = { 429-460},
language = {en},
url = {http://dml.mathdoc.fr/item/1016218225}
}
Sun, Jiayang; Loader, Catherine; McCormick, William P. Confidence bands in generalized linear models. Ann. Statist., Tome 28 (2000) no. 3, pp. 429-460. http://gdmltest.u-ga.fr/item/1016218225/