INFERENCE ON QUANTILE REGRESSION FOR HETEROSCEDASTIC MIXED MODELS

This paper develops two weighted quantile rank score tests for the sig- nificance of fixed effects in a class of mixed models with nonhomogeneous groups. One test is constructed by weighting the residuals to account for heteroscedastic- ity, while the other test is based on asymptotically optimal weights accounting for both heteroscedasticity and correlation. Without appropriate weights to account for heteroscedasticity, the quantile rank score tests often perform poorly. In finite samples, the test with optimal weights tends to provide marginal improvement over the one with simpler weights unless the intra-subject correlation is extremely high. The proposed methods are useful to accommodate nonparametric error distribu- tions in studying the effect of covariates on any conditional quantile of the response distribution. We illustrate the value of the proposed methods by modeling sev- eral quantiles of the apnea duration of the elderly during normal swallowing. Our method suggests significant interaction effect between feeding type and viscosity in the upper quantiles of the apnea distribution, a result that tends to be overlooked by usual linear mixed model approaches.

[1]  R. Koenker Confidence Intervals for Regression Quantiles , 1994 .

[2]  Ernesto San Martín,et al.  Linear mixed models with skew-elliptical distributions: A Bayesian approach , 2008, Comput. Stat. Data Anal..

[3]  Kadir Kizilkaya,et al.  A general approach to mixed effects modeling of residual variances in generalized linear mixed models , 2005, Genetics Selection Evolution.

[4]  C. F. Wu JACKKNIFE , BOOTSTRAP AND OTHER RESAMPLING METHODS IN REGRESSION ANALYSIS ' BY , 2008 .

[5]  Mendel Fygenson,et al.  INFERENCE FOR CENSORED QUANTILE REGRESSION MODELS IN LONGITUDINAL STUDIES , 2009, 0904.0080.

[6]  Xuming He,et al.  Three-step estimation in linear mixed models with skew-t distributions , 2008 .

[7]  Sin-Ho Jung Quasi-Likelihood for Median Regression Models , 1996 .

[8]  Zhongyi Zhu,et al.  Estimation in a semiparametric model for longitudinal data with unspecified dependence structure , 2002 .

[9]  J. Raz,et al.  Linear mixed models with heterogeneous within-cluster variances. , 1997, Biometrics.

[10]  D. Dunson,et al.  Bayesian Covariance Selection in Generalized Linear Mixed Models , 2006, Biometrics.

[11]  Marie Davidian,et al.  Consequences of misspecifying assumptions in nonlinear mixed effects models , 2000 .

[12]  Marie Davidian,et al.  Some Simple Methods for Estimating Intraindividual Variability in Nonlinear Mixed Effects Models , 1993 .

[13]  Xuming He,et al.  Detecting Differential Expressions in GeneChip Microarray Studies , 2007 .

[14]  M Davidian,et al.  Linear Mixed Models with Flexible Distributions of Random Effects for Longitudinal Data , 2001, Biometrics.

[15]  Xuming He,et al.  Conditional growth charts , 2006 .

[16]  E. Lesaffre,et al.  Smooth Random Effects Distribution in a Linear Mixed Model , 2004, Biometrics.

[17]  Regina Y. Liu Bootstrap Procedures under some Non-I.I.D. Models , 1988 .

[18]  Alan Agresti,et al.  Examples in which misspecification of a random effects distribution reduces efficiency, and possible remedies , 2004, Comput. Stat. Data Anal..

[19]  C. Francq,et al.  Nonparametric estimation of density, regression and dependence coefficients , 2002 .