Integral-based Knockoffs Inference for Partially Linear Models

Hao Wang; Biqin Song; Rushi Lan; Hong Chen

doi:10.1609/aaai.v40i31.39823

Authors

Hao Wang Engineering Research Center of Intelligent Technology for Agriculture, Ministry of Education, and College of Informatics, Huazhong Agricultural University
Biqin Song Engineering Research Center of Intelligent Technology for Agriculture, Ministry of Education, and College of Informatics, Huazhong Agricultural University
Rushi Lan Guangxi Key Laboratory of Image and Graphic Intelligent Processing, Guilin University of Electronic Technology
Hong Chen Engineering Research Center of Intelligent Technology for Agriculture, Ministry of Education, and College of Informatics, Huazhong Agricultural University

DOI:

https://doi.org/10.1609/aaai.v40i31.39823

Abstract

Partial linear models (PLM) have attracted much attention for regression estimation and variable selection due to their feasibility on utilizing linear and nonlinear approximations jointly. However, theoretical understanding of how they control the false discovery rate (FDR) during variable selection remains limited. To address this issue, we formulate a new integral-based knockoffs (IKO) inference scheme for controlled variable selection in PLM, where integral-based knockoff statistics are used to measure the variable importance and B-splines (or random Fourier features) are employed for approximating nonlinear components. In theory, FDR control is guaranteed for both linear and nonlinear parts, and the statistical analysis for its power is established. Empirical evaluations validate the effectiveness of our proposed approach.

Integral-based Knockoffs Inference for Partially Linear Models

Authors

DOI:

Abstract

Downloads

Published

How to Cite

Issue

Section

Information