分层随机化下协变量调整的统一框架

Fuyi Tu, Wei Ma, Hanzhong Liu
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引用次数: 0

摘要

随机化作为临床试验的一项关键技术,可以消除偏倚来源,产生可比较的治疗组。在随机实验中,治疗效果是一个普遍关注的参数。研究人员探索了使用线性模型估计治疗效果并进行协变量调整的有效性,从而提高了估计效率。然而,协变量和结果之间的关系并不一定是线性的,而且往往是复杂的。统计理论和相关计算机技术的进步使我们能够使用非参数和机器学习方法来更好地估计协变量和结果之间的关系,从而进一步提高效率。然而,如何在分层随机化下使用非参数和机器学习方法得出有效推论的理论研究尚未开展。本文讨论了分层随机化条件下协变量平差的统一框架和相应的统计推断,并以局部线性核加权最小二乘回归作为一个特例,详细证明了在治疗效果估计中使用协变量平差的有效性。在高维数据的情况下,我们还提出了一种在分层场随机化下使用机器学习方法进行统计推断的算法,该算法利用样本分裂来减轻机器学习方法对渐近性质的要求。最后,我们通过考虑不同的数据生成场景,比较了使用不同机器学习方法的治疗效果估计器的性能,以指导实际研究。
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A unified framework for covariate adjustment under stratified randomization
Randomization, as a key technique in clinical trials, can eliminate sources of bias and produce comparable treatment groups. In randomized experiments, the treatment effect is a parameter of general interest. Researchers have explored the validity of using linear models to estimate the treatment effect and perform covariate adjustment and thus improve the estimation efficiency. However, the relationship between covariates and outcomes is not necessarily linear, and is often intricate. Advances in statistical theory and related computer technology allow us to use nonparametric and machine learning methods to better estimate the relationship between covariates and outcomes and thus obtain further efficiency gains. However, theoretical studies on how to draw valid inferences when using nonparametric and machine learning methods under stratified randomization are yet to be conducted. In this paper, we discuss a unified framework for covariate adjustment and corresponding statistical inference under stratified randomization and present a detailed proof of the validity of using local linear kernel-weighted least squares regression for covariate adjustment in treatment effect estimators as a special case. In the case of high-dimensional data, we additionally propose an algorithm for statistical inference using machine learning methods under stratified randomization, which makes use of sample splitting to alleviate the requirements on the asymptotic properties of machine learning methods. Finally, we compare the performances of treatment effect estimators using different machine learning methods by considering various data generation scenarios, to guide practical research.
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