Designs for generalized linear models with random block effects via information matrix approximations
成果类型:
Article
署名作者:
Waite, T. W.; Woods, D. C.
署名单位:
University of Manchester; University of Southampton
刊物名称:
BIOMETRIKA
ISSN/ISSBN:
0006-3444
DOI:
10.1093/biomet/asv005
发表日期:
2015
页码:
677693
关键词:
poisson regression
longitudinal data
variables
responses
摘要:
The selection of optimal designs for generalized linear mixed models is complicated by the fact that the Fisher information matrix, on which most optimality criteria depend, is computationally expensive to evaluate. We provide two novel approximations that reduce the computational cost of evaluating the information matrix by complete enumeration of response outcomes, or Monte Carlo approximations thereof: an asymptotic approximation that is accurate when there is strong dependence between observations in the same block; and an approximation via kriging interpolators. For logistic random intercept models, we show how interpolation can be especially effective for finding pseudo-Bayesian designs that incorporate uncertainty in the values of the model parameters. The new results are used to evaluate the efficiency, for estimating conditional models, of optimal designs from closed-form approximations to the information matrix derived from marginal models. Correcting for the marginal attenuation of parameters in binary-response models yields much improved designs, typically with very high efficiencies. However, in some experiments exhibiting strong dependence, designs for marginal models may still be inefficient for conditional modelling. Our asymptotic results provide some theoretical insights into why such inefficiencies occur.