In this work we study additive dynamic regression models for
longitudinal data. These models provide a flexible and nonparametric method for
investigating the time-dynamics of longitudinal data. The methodology is aimed
at data where measurements are recorded at random time points. We model the
conditional mean of responses given the full internal history and possibly
time-varying covariates. We derive the asymptotic distribution for a new
nonparametric least squares estimator of the cumulative time-varying regression
functions. Based on the asymptotic results, confidence bands may be computed
and inference about time-varying coefficients may be drawn. We propose two
estimators of the cumulative regression function. One estimator that involves
smoothing and one that does not. The latter, however, has twice the variance as
the smoothing based estimator. Goodness of fit of the model is considered using
martingale residuals. Finally, we also discuss how partly-conditional mean
models in which the mean of the response is regressed onto selected
time-varying covariates may be analysed in the same framework. We apply the
methods to longitudinal data on height development for cystic fibrosis
patients.
Publié le : 2000-08-14
Classification:
Dynamic linear models,
estimating equations,
least squares,
longitudinal data,
nonparametric methods,
partly conditional mean models,
time-varying-coefficient models,
62M10,
62G07,
62G10,
62G20
@article{1015956705,
author = {Martinussen, Torben and Scheike, Thomas H.},
title = {A nonparametric dynamic additive regression model for
longitudinal data},
journal = {Ann. Statist.},
volume = {28},
number = {3},
year = {2000},
pages = { 1000-1025},
language = {en},
url = {http://dml.mathdoc.fr/item/1015956705}
}
Martinussen, Torben; Scheike, Thomas H. A nonparametric dynamic additive regression model for
longitudinal data. Ann. Statist., Tome 28 (2000) no. 3, pp. 1000-1025. http://gdmltest.u-ga.fr/item/1015956705/