Title of article
Two-stage hierarchical modeling for analysis of subpopulations in conditional distributions
Author/Authors
Inna Chervoneva، نويسنده , , Tingting Zhan، نويسنده , , Boris Iglewicz، نويسنده , , Walter W. Hauck&David E. Birk، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2012
Pages
16
From page
445
To page
460
Abstract
In this work, we develop the modeling and estimation approach for the analysis of cross-sectional clustered
data with multimodal conditional distributions, where the main interest is in analysis of subpopulations.
It is proposed to model such data in a hierarchical model with conditional distributions viewed as finite
mixtures of normal components.With a large number of observations in the lowest level clusters, a two-stage
estimation approach is used. In the first stage, the normal mixture parameters in each lowest level cluster are
estimated using robust methods. Robust alternatives to the maximum-likelihood (ML) estimation are used
to provide stable results even for data with conditional distributions such that their components may not
quite meet normality assumptions. Then the lowest level cluster-specific means and standard deviations
are modeled in a mixed effects model in the second stage. A small simulation study was conducted to
compare performance of finite normal mixture population parameter estimates based on robust and ML
estimation in stage 1. The proposed modeling approach is illustrated through the analysis of mice tendon
fibril diameters data. Analyses results address genotype differences between corresponding components
in the mixtures and demonstrate advantages of robust estimation in stage 1.
Keywords
mixedeffects models , Two-stage estimation , weighted likelihood estimator , hierarchical models , robust finite normal mixture
Journal title
JOURNAL OF APPLIED STATISTICS
Serial Year
2012
Journal title
JOURNAL OF APPLIED STATISTICS
Record number
712743
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