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Hauptverfasser: Chen, Ruohui, Lin, Tuo, Liu, Lin, Liu, Jinyuan, Chen, Ruifeng, Zou, Jingjing, Liu, Chenyu, Natarajan, Loki, Wang, Tang, Zhang, Xinlian, Tu, Xin
Format: Preprint
Veröffentlicht: 2024
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Online-Zugang:https://arxiv.org/abs/2403.06783
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author Chen, Ruohui
Lin, Tuo
Liu, Lin
Liu, Jinyuan
Chen, Ruifeng
Zou, Jingjing
Liu, Chenyu
Natarajan, Loki
Wang, Tang
Zhang, Xinlian
Tu, Xin
author_facet Chen, Ruohui
Lin, Tuo
Liu, Lin
Liu, Jinyuan
Chen, Ruifeng
Zou, Jingjing
Liu, Chenyu
Natarajan, Loki
Wang, Tang
Zhang, Xinlian
Tu, Xin
contents The Mann-Whitney-Wilcoxon rank sum test (MWWRST) is a widely used method for comparing two treatment groups in randomized control trials, particularly when dealing with highly skewed data. However, when applied to observational study data, the MWWRST often yields invalid results for causal inference. To address this limitation, Wu et al. (2014) introduced an approach that incorporates inverse probability weighting (IPW) into this rank-based statistics to mitigate confounding effects. Subsequently, Mao (2018), Zhang et al. (2019), and Ai et al. (2020) extended this IPW estimator to develop doubly robust estimators. Nevertheless, each of these approaches has notable limitations. Mao's method imposes stringent assumptions that may not align with real-world study data. Zhang et al.'s (2019) estimators rely on bootstrap inference, which suffers from computational inefficiency and lacks known asymptotic properties. Meanwhile, Ai et al. (2020) primarily focus on testing the null hypothesis of equal distributions between two groups, which is a more stringent assumption that may not be well-suited to the primary practical application of MWWRST. In this paper, we aim to address these limitations by leveraging functional response models (FRM) to develop doubly robust estimators. We demonstrate the performance of our proposed approach using both simulated and real study data.
format Preprint
id arxiv_https___arxiv_org_abs_2403_06783
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle A doubly robust estimator for the Mann Whitney Wilcoxon Rank Sum Test when applied for causal inference in observational studies
Chen, Ruohui
Lin, Tuo
Liu, Lin
Liu, Jinyuan
Chen, Ruifeng
Zou, Jingjing
Liu, Chenyu
Natarajan, Loki
Wang, Tang
Zhang, Xinlian
Tu, Xin
Methodology
The Mann-Whitney-Wilcoxon rank sum test (MWWRST) is a widely used method for comparing two treatment groups in randomized control trials, particularly when dealing with highly skewed data. However, when applied to observational study data, the MWWRST often yields invalid results for causal inference. To address this limitation, Wu et al. (2014) introduced an approach that incorporates inverse probability weighting (IPW) into this rank-based statistics to mitigate confounding effects. Subsequently, Mao (2018), Zhang et al. (2019), and Ai et al. (2020) extended this IPW estimator to develop doubly robust estimators. Nevertheless, each of these approaches has notable limitations. Mao's method imposes stringent assumptions that may not align with real-world study data. Zhang et al.'s (2019) estimators rely on bootstrap inference, which suffers from computational inefficiency and lacks known asymptotic properties. Meanwhile, Ai et al. (2020) primarily focus on testing the null hypothesis of equal distributions between two groups, which is a more stringent assumption that may not be well-suited to the primary practical application of MWWRST. In this paper, we aim to address these limitations by leveraging functional response models (FRM) to develop doubly robust estimators. We demonstrate the performance of our proposed approach using both simulated and real study data.
title A doubly robust estimator for the Mann Whitney Wilcoxon Rank Sum Test when applied for causal inference in observational studies
topic Methodology
url https://arxiv.org/abs/2403.06783