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報告人簡介

Dr. Daoji Li is Associate Professor of Data Science and Statistics in College of Business and Economics at California State University, Fullerton (CSUF). Before joining CSUF, he was Assistant Professor in the Department of Statistics and Data Science at University of Central Florida. Prior to that, He was Postdoctoral Research Associate in the Data Sciences and Operations Department of the Marshall School of Business at the University of Southern California. He received his Ph.D. in Statistics from the University of Manchester, United Kingdom. His research interests include feature screening, deep learning, causal inference, high dimensional statistics, and longitudinal data analysis. His papers have been published in journals in statistics and business, including the Annals of Statistics, Journal of Business & Economic Statistics, and Journal of Business Research.

內容簡介

Although there is a huge literature on feature selection for the Cox model, none of the existing approaches can control the false discovery rate (FDR) unless the sample size tends to infinity. In addition, there is no formal power analysis of the knockoffs framework for survival data in the literature. To address those issues, in this paper, we propose a novel controlled feature selection approach using knockoffs for the Cox model. We establish that the proposed method enjoys the FDR control in finite samples regardless of the number of covariates. Moreover, under mild regularity conditions, we also show that the power of our method is asymptotically one as sample size tends to infinity. To the best of our knowledge, this is the first formal theoretical result on the power for the knockoffs procedure in the survival setting. Simulation studies confirm that our method has appealing finite-sample performance with desired FDR control and high power. We further demonstrate the performance of our method through a real data example. This is a joint work with Jinzhao Yu and Hui Zhao.