TY - JOUR
T1 - Variable selection for partially linear models with measurement errors
AU - Liang, Hua
AU - Li, Runze
N1 - Funding Information:
Hua Liang is Professor, Department of Biostatistics and Computational Biology, University of Rochester, NY 14642 (E-mail: [email protected]). Runze Li is Professor, Department of Statistics and The Methodology Center, The Pennsylvania State University, University Park, PA 16802-2111 (E-mail: [email protected]). Liang’s research was partially supported by NIH/-NIAID grants AI62247 and AI59773 and NSF grant DMS-0806097. Li’s research was supported by a National Institute on Drug Abuse (NIDA) grant P50 DA10075 and NSF grant DMS-0348869. The authors thank the editor, an associate editor, and two reviewers for their constructive comments and suggestions. They also thank John Dziak and Jeanne Holden-Wiltse for their editorial assistance. The content is solely the responsibility of the authors and does not necessarily represent the official views of the NIDA or the National Institutes of Health.
PY - 2009/3
Y1 - 2009/3
N2 - This article focuses on variable selection for partially linear models when the covariates are measured with additive errors.We propose two classes of variable selection procedures, penalized least squares and penalized quantile regression, using the nonconvex penalized principle. The first procedure corrects the bias in the loss function caused by the measurement error by applying the so-called correction-forattenuation approach, whereas the second procedure corrects the bias by using orthogonal regression. The sampling properties for the two procedures are investigated. The rate of convergence and the asymptotic normality of the resulting estimates are established. We further demonstrate that, with proper choices of the penalty functions and the regularization parameter, the resulting estimates perform asymptotically as well as an oracle property. Choice of smoothing parameters is also discussed. Finite sample performance of the proposed variable selection procedures is assessed by Monte Carlo simulation studies. We further illustrate the proposed procedures by an application.
AB - This article focuses on variable selection for partially linear models when the covariates are measured with additive errors.We propose two classes of variable selection procedures, penalized least squares and penalized quantile regression, using the nonconvex penalized principle. The first procedure corrects the bias in the loss function caused by the measurement error by applying the so-called correction-forattenuation approach, whereas the second procedure corrects the bias by using orthogonal regression. The sampling properties for the two procedures are investigated. The rate of convergence and the asymptotic normality of the resulting estimates are established. We further demonstrate that, with proper choices of the penalty functions and the regularization parameter, the resulting estimates perform asymptotically as well as an oracle property. Choice of smoothing parameters is also discussed. Finite sample performance of the proposed variable selection procedures is assessed by Monte Carlo simulation studies. We further illustrate the proposed procedures by an application.
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U2 - 10.1198/jasa.2009.0127
DO - 10.1198/jasa.2009.0127
M3 - Article
AN - SCOPUS:70350624776
SN - 0162-1459
VL - 104
SP - 234
EP - 248
JO - Journal of the American Statistical Association
JF - Journal of the American Statistical Association
IS - 485
ER -