一种用于确定存在失访情况的干预前和干预后实验样本量的广义估计方程(GEE)方法。
A GEE Approach to Determine Sample Size for Pre- and Post-Intervention Experiments with Dropout.
作者信息
Zhang Song, Cao Jing, Ahn Chul
机构信息
Department of Clinical Sciences, UT Southwestern Medical Center, Dallas, TX.
出版信息
Comput Stat Data Anal. 2014 Jan;69. doi: 10.1016/j.csda.2013.07.037.
Abstract
Pre- and post-intervention experiments are widely used in medical and social behavioral studies, where each subject is supposed to contribute a pair of observations. In this paper we investigate sample size requirement for a scenario frequently encountered by practitioners: All enrolled subjects participate in the pre-intervention phase of study, but some of them will drop out due to various reasons, thus resulting in missing values in the post-intervention measurements. Traditional sample size calculation based on the McNemar's test could not accommodate missing data. Through the GEE approach, we derive a closed-form sample size formula that properly accounts for the impact of partial observations. We demonstrate that when there is no missing data, the proposed sample size estimate under the GEE approach is very close to that under the McNemar's test. When there is missing data, the proposed method can lead to substantial saving in sample size. Simulation studies and an example are presented.
摘要
干预前和干预后的实验在医学和社会行为研究中被广泛使用,在这些研究中,每个受试者都应提供一对观察值。在本文中,我们研究了从业者经常遇到的一种情况的样本量要求:所有登记的受试者都参与研究的干预前阶段,但其中一些人会因各种原因退出,从而导致干预后测量中出现缺失值。基于 McNemar 检验的传统样本量计算无法处理缺失数据。通过广义估计方程(GEE)方法,我们推导了一个封闭式样本量公式,该公式适当地考虑了部分观察值的影响。我们证明,当没有缺失数据时,GEE 方法下提出的样本量估计与 McNemar 检验下的估计非常接近。当存在缺失数据时,所提出的方法可以大幅节省样本量。本文还给出了模拟研究和一个实例。
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