Maxway CRT:提升模型X推断的稳健性

Maxway CRT: improving the robustness of the model-X inference

Journal of the Royal Statistical Society. Series B: Statistical Methodology · 2023
被引 0
ABS 4

中文导读

针对模型X条件随机化检验在X|Z建模有误时失效的问题,提出Maxway CRT,通过学习Y|Z分布校准重抽样分布,实现近似双重稳健性,在模拟和实际数据中显著改善第一类错误控制。

Abstract

Abstract The model-X conditional randomisation test (CRT) is a flexible and powerful testing procedure for testing the hypothesis X⫫Y∣Z. However, it requires perfect knowledge of X∣Z and may lose its validity when there is an error in modelling X∣Z. This problem is even more severe when Z is of high dimensionality. In response to this, we propose the Maxway CRT, which learns the distribution of Y∣Z and uses it to calibrate the resampling distribution of X to gain robustness to the error in modelling X. We prove that the type-I error inflation of the Maxway CRT can be controlled by the learning error for a low-dimensional adjusting model plus the product of learning errors for X∣Z and Y∣Z, interpreted as an ‘almost doubly robust’ property. Based on this, we develop implementing algorithms of the Maxway CRT in practical scenarios including (surrogate-assisted) semi-supervised learning (SA-SSL) and transfer learning (TL). Through simulations, we demonstrate that the Maxway CRT achieves significantly better type-I error control than existing model-X inference approaches while preserving similar powers. Finally, we apply our methodology to two real examples of SA-SSL and TL.

条件独立性检验重抽样半监督学习迁移学习高维统计