Causal Risk Ratio and Causal Risk Difference in Longitudinal Studies With Frequent Outcome Events

Causal Risk Ratio and Causal Risk Difference in Longitudinal Studies With Frequent Outcome Events

Marginal structural models (MSMs) are recognized as useful methods for addressing the issue of time-varying confounding in longitudinal studies. In the analyses of longitudinal data with binary outcomes, using the generalized estimating equation (GEE) logistic regression model within the MSM framewo...

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Bibliographic Details
Main Authors: Hiroyuki Shiiba, Hisashi Noma, Keisuke Kuwahara, Tohru Nakagawa, Tetsuya Mizoue
Format: Article
Language:English
Published: Taylor & Francis Group 2025-12-01
Series:Data Science in Science
Subjects:
Longitudinal study
time-varying confounder
marginal structural model
risk ratio
risk difference
Online Access:https://www.tandfonline.com/doi/10.1080/26941899.2025.2527144
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Summary:Marginal structural models (MSMs) are recognized as useful methods for addressing the issue of time-varying confounding in longitudinal studies. In the analyses of longitudinal data with binary outcomes, using the generalized estimating equation (GEE) logistic regression model within the MSM framework is a common approach to estimate the odds ratio. However, due to the interpretive issues with the odds ratio, recent statistical guidelines recommend the use of the risk ratio and the risk difference. Nevertheless, there are no applicable MSM methods using GEE that enable straightforward estimation for the causal risk ratio and risk difference. In this article, we provide two straightforward and effective methods for estimating the causal risk ratio and risk difference based on the MSM-GEE framework, using Poisson regression and normal linear regression models. We validated these methods through comprehensive simulation studies, confirming their unbiased estimation of the causal risk ratio and risk difference. Importantly, these methods remain effective even in situations where the MSM-GEE logistic regression model, which is the most widely used method for binary outcome data, yields biased estimates of the causal odds ratio. In addition, we applied the proposed methods to real-world longitudinal data and clearly demonstrated their practical effectiveness.
ISSN:2694-1899

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