估计员
随机对照试验
协变量
数学
观察研究
统计
差异(会计)
一致性(知识库)
绝对风险降低
临床试验
三角洲法
同种类的
医学
计量经济学
最小方差无偏估计量
标准误差
估计量的偏差
相对风险
平均差
随机试验
样本量测定
渐近分布
风险因素
有效估计量
治疗组和对照组
风险评估
作者
Xiaoyu Qiu,Yi Qian,Jinling Yi,Jinqiu Wang,Yu Du,Yanyao Yi,Ting Ye
出处
期刊:Biometrics
[Oxford University Press]
日期:2025-10-02
卷期号:81 (4)
标识
DOI:10.1093/biomtc/ujaf142
摘要
The Mantel-Haenszel (MH) risk difference estimator, commonly used in randomized clinical trials for binary outcomes, calculates a weighted average of stratum-specific risk difference estimators. Traditionally, this method requires the stringent assumption that risk differences are homogeneous across strata, also known as the common (constant) risk difference assumption. In our paper, we relax this assumption and adopt a modern perspective, viewing the MH risk difference estimator as an approach for covariate adjustment in randomized clinical trials, distinguishing its use from that in meta-analysis and observational studies. We demonstrate that, under reasonable restrictions on risk difference variability, the MH risk difference estimator consistently estimates the average treatment effect within a standard super-population framework, which is often the primary interest in randomized clinical trials, in addition to estimating a weighted average of stratum-specific risk differences. We rigorously study its properties under the large-stratum and sparse-stratum asymptotic regimes, as well as under mixed-regime settings. Furthermore, for either estimand, we propose a unified robust variance estimator that improves over the popular variance estimators by Greenland and Robins and Sato et al. and has provable consistency across these asymptotic regimes, regardless of assuming common risk differences. Extensions of our theoretical results also provide new insights into the MH test, the post-stratification estimator, and settings with multiple treatments. Our findings are thoroughly validated through simulations and a clinical trial example.
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