Literature DB >> 23843665

Corrected-loss estimation for quantile regression with covariate measurement errors.

Huixia Judy Wang1, Leonard A Stefanski, Zhongyi Zhu.   

Abstract

We study estimation in quantile regression when covariates are measured with errors. Existing methods require stringent assumptions, such as spherically symmetric joint distribution of the regression and measurement error variables, or linearity of all quantile functions, which restrict model flexibility and complicate computation. In this paper, we develop a new estimation approach based on corrected scores to account for a class of covariate measurement errors in quantile regression. The proposed method is simple to implement. Its validity requires only linearity of the particular quantile function of interest, and it requires no parametric assumptions on the regression error distributions. Finite-sample results demonstrate that the proposed estimators are more efficient than the existing methods in various models considered.

Keywords:  Corrected loss function; Laplace distribution; Measurement error; Normal distribution; Quantile regression; Smoothing

Year:  2012        PMID: 23843665      PMCID: PMC3635707          DOI: 10.1093/biomet/ass005

Source DB:  PubMed          Journal:  Biometrika        ISSN: 0006-3444            Impact factor:   2.445


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