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JOURNAL ARTICLE

Asymptotic properties of maximum quasi-likelihood estimator in quasi-likelihood nonlinear models with misspecified variance function

Tian XiaXueren WangXuejun Jiang

Year: 2013 Journal:   Statistics Vol: 48 (4)Pages: 778-786   Publisher: Taylor & Francis
DOI: 10.1080/02331888.2013.829060
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Abstract

The quasi-likelihood function proposed by Wedderburn [Quasi-likelihood functions, generalized linear models, and the Gauss–Newton method. Biometrika. 1974;61:439–447] broadened the application scope of generalized linear models (GLM) by specifying the mean and variance function instead of the entire distribution. However, in many situations, complete specification of variance function in the quasi-likelihood approach may not be realistic. Following Fahrmeir's [Maximum likelihood estimation in misspecified generalized linear models. Statistics. 1990;21:487–502] treating with misspecified GLM, we define a quasi-likelihood nonlinear models (QLNM) with misspecified variance function by replacing the unknown variance function with a known function. In this paper, we propose some mild regularity conditions, under which the existence and the asymptotic normality of the maximum quasi-likelihood estimator (MQLE) are obtained in QLNM with misspecified variance function. We suggest computing MQLE of unknown parameter in QLNM with misspecified variance function by the Gauss–Newton iteration procedure and show it to work well in a simulation study.

Keywords:
Mathematics Quasi-likelihood Likelihood function Variance function Generalized linear model Estimator Statistics Delta method Applied mathematics Variance (accounting) Estimating equations Restricted maximum likelihood Asymptotic distribution Function (biology) Estimation theory Count data

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Topics

Statistical Methods and Bayesian Inference
Physical Sciences →  Mathematics →  Statistics and Probability
Statistical Methods and Inference
Physical Sciences →  Mathematics →  Statistics and Probability
Advanced Statistical Methods and Models
Physical Sciences →  Mathematics →  Statistics and Probability

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