设计和分析匹配数据集时评估协变量平衡的随机测试

Zach Branson
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引用次数: 10

摘要

摘要:观察性研究的因果分析常常因治疗组间协变量失衡而变得复杂,而匹配方法通过寻找表现出协变量平衡的治疗组子集来缓解这一并发症。人们普遍认为协变量平衡可以作为匹配数据集近似随机实验的证据,但是匹配数据集近似什么样的实验?在这项工作中,我们为匹配的数据集近似于特定实验设计的假设开发了随机化检验,例如完全随机化,块随机化或再随机化。我们的测试可以包含任何实验设计,并且它允许图形显示,将几个设计放在同一个单变量尺度上,从而允许研究人员确定哪种设计(如果有的话)最适合匹配的数据集。在研究人员确定一个合理的设计之后,我们推荐一种基于随机化的方法来分析匹配的数据,它可以包含任何设计和治疗效果估计。通过仿真,我们发现我们的测试可以频繁地检测出破坏推理结果的随机分配违规行为。此外,通过模拟和在政治学中的实际应用,我们发现具有高水平协变量平衡的匹配数据集倾向于近似于像再随机化这样的平衡约束设计,并且这样分析它们可以导致精确的因果分析。然而,假设一个精确的设计应该谨慎进行,因为如果匹配后仍然存在由于剩余的不平衡而产生的大量偏差,它可能会损害推断结果。我们的方法是在randChecks R包中实现的,可以在CRAN上获得。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Randomization Tests to Assess Covariate Balance When Designing and Analyzing Matched Datasets
Abstract:Causal analyses for observational studies are often complicated by covariate imbalances among treatment groups, and matching methodologies alleviate this complication by finding subsets of treatment groups that exhibit covariate balance. It is widely agreed upon that covariate balance can serve as evidence that a matched dataset approximates a randomized experiment, but what kind of experiment does a matched dataset approximate? In this work, we develop a randomization test for the hypothesis that a matched dataset approximates a particular experimental design, such as complete randomization, block randomization, or rerandomization. Our test can incorporate any experimental design, and it allows for a graphical display that puts several designs on the same univariate scale, thereby allowing researchers to pinpoint which design—if any—is most appropriate for a matched dataset. After researchers determine a plausible design, we recommend a randomization based approach for analyzing the matched data, which can incorporate any design and treatment effect estimator. Through simulation, we find that our test can frequently detect violations of randomized assignment that harm inferential results. Furthermore, through simulation and a real application in political science, we find that matched datasets with high levels of covariate balance tend to approximate balance-constrained designs like rerandomization, and analyzing them as such can lead to precise causal analyses. However, assuming a precise design should be proceeded with caution, because it can harm inferential results if there are still substantial biases due to remaining imbalances after matching. Our approach is implemented in the randChecks R package, available on CRAN.
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