Please use this identifier to cite or link to this item: http://hdl.handle.net/11718/9999
Title: A flexible model for generalized linear regression with measurement error
Authors: Banerjee, Tathagata
Roy, Surupa
Keywords: Generalized Linear Model;Structural Model;Validation Data;Canonical Link;Logistic Regression;EM Algorithm
Issue Date: 27-Oct-2006
Abstract: This paper focuses on the question of specification of measurement error distribution and the distribution of true predictors in generalized linear models when the predictors are subject to measurement errors. The standard measurement error model typically assumes that the measurement error distribution and the distribution of covariates unobservable in the main study are normal. To make the model flexible enough we, instead, assume that the measurement error distribution is multivariate t and the distribution of true covariates is a finite mixture of normal densities. Likelihood–based method is developed to estimate the regression parameters. However, direct maximization of the marginal likelihood is numerically difficult. Thus as an alternative to it we apply the EM algorithm. This makes the computation of likelihood estimates feasible. The performance of the proposed model is investigated by simulation study.
Description: Annals of Institute of Statistical Mathematics, Vol. 58, (2006), pp. 153-69
URI: http://hdl.handle.net/11718/9999
Appears in Collections:Journal Articles

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