Variable screening for ultrahigh dimensional censored quantile regression |
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Authors: | Jing Pan Shucong Zhang Yong Zhou |
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Affiliation: | 1. School of Statistics and Management, Shanghai University of Finance and Economics, Shanghai, China;2. School of Mathematical Sciences and Center for Statistical Science, Peking University, Beijing, China;3. Key Laboratory of Advanced Theory and Application in Statistics and Data Science, MOE, and Institute of Statistics and Interdisciplinary Sciences and School of Statistics, East China Normal University, Shanghai, China |
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Abstract: | Quantile regression is a flexible approach to assessing covariate effects on failure time, which has attracted considerable interest in survival analysis. When the dimension of covariates is much larger than the sample size, feature screening and variable selection become extremely important and indispensable. In this article, we introduce a new feature screening method for ultrahigh dimensional censored quantile regression. The proposed method can work for a general class of survival models, allow for heterogeneity of data and enjoy desirable properties including the sure screening property and the ranking consistency property. Moreover, an iterative version of screening algorithm has also been proposed to accommodate more complex situations. Monte Carlo simulation studies are designed to evaluate the finite sample performance under different model settings. We also illustrate the proposed methods through an empirical analysis. |
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Keywords: | Censored data quantile regression sure screening property ultrahigh dimensionality |
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