Estimating Regression Effects in Com Poisson Generalized Linear Model
ثبت نشده
چکیده
Com Poisson distribution is capable of modeling the count responses irrespective of their mean variance relation and the parameters of this distribution when fitted to a simple cross sectional data can be efficiently estimated using maximum likelihood (ML) method. In the regression setup, however, ML estimation of the parameters of the Com Poisson based generalized linear model is computationally intensive. In this paper, we propose to use quasilikelihood (QL) approach to estimate the effect of the covariates on the Com Poisson counts and investigate the performance of this method with respect to the ML method. QL estimates are consistent and almost as efficient as ML estimates. The simulation studies show that the efficiency loss in the estimation of all the parameters using QL approach as compared to ML approach is quite negligible, whereas QL approach is lesser involving than ML approach. Keywords—Com Poisson, Cross-sectional, Maximum Likelihood, Quasi likelihood
منابع مشابه
A comparison of marginal and joint generalized quasi-likelihood estimating equations based on the Com-Poisson GLM: Application to car breakdowns data
In this paper, we apply and compare two generalized estimating equation approaches to the analysis of car breakdowns data in Mauritius. Number of breakdowns experienced by a machinery is a highly under-dispersed count random variable and its value can be attributed to the factors related to the mechanical input and output of that machinery. Analyzing such under-dispersed count observation as a ...
متن کاملAnalyzing the factors effecting the passenger car breakdowns using Com-Poisson GLM
Number of breakdowns experienced by a machinery is a highly under-dispersed count random variable and its value can be attributed to the factors related to the mechanical input and output of that machinery. Analyzing such under-dispersed count observations as a function of the explanatory factors has been a challenging problem. In this paper, we aim at estimating the effects of various factors ...
متن کاملA Survey on Quasi-Likelihood Estimation Approaches for Longitudinal Set-ups
The Com-Poisson (CMP) model is one of the most popular discrete generalized linear models (GLMS) that handles both equi-, overand under-dispersed data. In longitudinal context, an integer-valued autoregressive (INAR(1)) process that incorporates covariate specification has been developed to model longitudinal CMP counts. However, the joint likelihood CMP function is difficult to specify and thu...
متن کاملCharacterizing the Performance of the Bayesian Conway-maxwell Poisson Generalized Linear Model
This paper documents the performance of a Bayesian Conway-Maxwell-Poisson (COM-Poisson) generalized linear model (GLM). This distribution was originally developed as an extension of the Poisson distribution in 1962 and has a unique characteristic, in that it can handle both under-dispersed and over-dispersed count data. Previous work by the authors lead to the development of a dual-link GLM bas...
متن کاملGeneralized estimating equations for longitudinal generalized Poisson count data with regression effects on the mean and dispersion level
Generalized estimating equations (GEE) fit parameters based on sums of weighted residuals, which may be applied for example to the Poisson distribution. We discuss Generalized Poisson (GP) response data. This distribution has a more flexible variance function than the Poisson distribution and has an additional dispersion parameter. To fit this parameter, second level estimating equations based ...
متن کامل