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Main Authors: Zhang, Yi, Xu, Wenfu, Tan, Zhiqiang
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2504.08301
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author Zhang, Yi
Xu, Wenfu
Tan, Zhiqiang
author_facet Zhang, Yi
Xu, Wenfu
Tan, Zhiqiang
contents Sensitivity analysis is important to assess the impact of unmeasured confounding in causal inference from observational studies. The marginal sensitivity model (MSM) provides a useful approach in quantifying the influence of unmeasured confounders on treatment assignment and leading to tractable sharp bounds of common causal parameters. In this paper, to tighten MSM sharp bounds, we propose the enhanced MSM (eMSM) by incorporating another sensitivity constraint that quantifies the influence of unmeasured confounders on outcomes. We derive sharp population bounds of expected potential outcomes under eMSM, which are always narrower than the MSM sharp bounds in a simple and interpretable way. We further discuss desirable specifications of sensitivity parameters related to the outcome sensitivity constraint, and obtain both doubly robust point estimation and confidence intervals for the eMSM population bounds. The effectiveness of eMSM is also demonstrated numerically through two real-data applications. Our development represents, for the first time, a satisfactory extension of MSM to exploit both treatment and outcome sensitivity constraints on unmeasured confounding.
format Preprint
id arxiv_https___arxiv_org_abs_2504_08301
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Enhanced Marginal Sensitivity Model and Bounds
Zhang, Yi
Xu, Wenfu
Tan, Zhiqiang
Methodology
Statistics Theory
Sensitivity analysis is important to assess the impact of unmeasured confounding in causal inference from observational studies. The marginal sensitivity model (MSM) provides a useful approach in quantifying the influence of unmeasured confounders on treatment assignment and leading to tractable sharp bounds of common causal parameters. In this paper, to tighten MSM sharp bounds, we propose the enhanced MSM (eMSM) by incorporating another sensitivity constraint that quantifies the influence of unmeasured confounders on outcomes. We derive sharp population bounds of expected potential outcomes under eMSM, which are always narrower than the MSM sharp bounds in a simple and interpretable way. We further discuss desirable specifications of sensitivity parameters related to the outcome sensitivity constraint, and obtain both doubly robust point estimation and confidence intervals for the eMSM population bounds. The effectiveness of eMSM is also demonstrated numerically through two real-data applications. Our development represents, for the first time, a satisfactory extension of MSM to exploit both treatment and outcome sensitivity constraints on unmeasured confounding.
title Enhanced Marginal Sensitivity Model and Bounds
topic Methodology
Statistics Theory
url https://arxiv.org/abs/2504.08301