高维混杂模型同时推断的去相关与去偏方法

A Decorrelating and Debiasing Approach to Simultaneous Inference for High-Dimensional Confounded Models

Journal of the American Statistical Association · 2023
被引 15
ABS 4

中文导读

针对存在潜在混杂因素的高维线性模型,提出一种去相关与去偏方法,实现大规模假设检验并控制虚假发现率,适用于响应和预测变量均可能受混杂影响的实际场景。

Abstract

Motivated by the simultaneous association analysis with the presence of latent confounders, this article studies the large-scale hypothesis testing problem for the high-dimensional confounded linear models with both non-asymptotic and asymptotic false discovery control. Such model covers a wide range of practical settings where both the response and the predictors may be confounded. In the presence of the high-dimensional predictors and the unobservable confounders, the simultaneous inference with provable guarantees becomes highly challenging, and the unknown strong dependence among the confounded covariates makes the challenge even more pronounced. This article first introduces a decorrelating procedure that shrinks the confounding effect and weakens the correlations among the predictors, then performs debiasing under the decorrelated design based on some biased initial estimator. Following that, an asymptotic normality result for the debiased estimator is established and standardized test statistics are then constructed. Furthermore, a simultaneous inference procedure is proposed to identify significant associations, and both the finite-sample and asymptotic false discovery bounds are provided. The non-asymptotic result is general and model-free, and is of independent interest. We also prove that, under minimal signal strength condition, all associations can be successfully detected with probability tending to one. Simulation and real data studies are carried out to evaluate the performance of the proposed approach and compare it with other competing methods. Supplementary materials for this article are available online.

高维统计假设检验混杂因素虚假发现控制计量经济学