Generalized Linear Models (GLMs) (McCullagh and Nelder, 1989) provide a
unified framework for fixed effect models where response data arise from exponential family
distributions. Much recent research has attempted to extend the framework to include
random effects in the linear predictors. Different methodologies have been employed to
solve different motivating problems, for example Generalized Linear Mixed Models
(Clayton, 1994) and Multilevel Models (Goldstein, 1995). A thorough review and
classification of this and related material is presented. In Item Response Theory (IRT)
subjects are tested using banks of pre-calibrated test items. A useful model is based on the
logistic function with a binary response dependent on the unknown ability of the subject.
Item parameters contribute to the probability of a correct response. Within the framework
of the GLM, a latent variable, the unknown ability, is introduced as a new component of the
linear predictor. This approach affords the opportunity to structure intercept and slope
parameters so that item characteristics are represented. A methodology for fitting such
GLMs with latent variables, based on the EM algorithm (Dempster, Laird and Rubin, 1977)
and using standard Generalized Linear Model fitting software GLIM (Payne, 1987) to
perform the expectation step, is developed and applied to a model for binary response data.
Accurate numerical integration to evaluate the likelihood functions is a vital part of the
computational process. A study of the comparative benefits of two different integration
strategies is undertaken and leads to the adoption, unusually, of Gauss-Legendre rules. It is
shown how the fitting algorithms are implemented with GLIM programs which incorporate
FORTRAN subroutines. Examples from IRT are given. A simulation study is undertaken to
investigate the sampling distributions of the estimators and the effect of certain numerical
attributes of the computational process. Finally a generalized latent variable model is
developed for responses from any exponential family distribution.
Date of Award | 1998 |
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Original language | English |
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Awarding Institution | |
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LATENT VARIABLE GENERALIZED LINEAR MODELS
CREAGH-OSBORNE, J. (Author). 1998
Student thesis: PhD