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Main Authors: Lee, Jaron J. R., Mallett, Agatha S., Shpitser, Ilya, Campbell, Aimee, Nunes, Edward, Scharfstein, Daniel O.
Format: Preprint
Published: 2021
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Online Access:https://arxiv.org/abs/2105.08868
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author Lee, Jaron J. R.
Mallett, Agatha S.
Shpitser, Ilya
Campbell, Aimee
Nunes, Edward
Scharfstein, Daniel O.
author_facet Lee, Jaron J. R.
Mallett, Agatha S.
Shpitser, Ilya
Campbell, Aimee
Nunes, Edward
Scharfstein, Daniel O.
contents Scharfstein et al. (2021) developed a sensitivity analysis model for analyzing randomized trials with repeatedly measured binary outcomes that are subject to nonmonotone missingness. Their approach becomes computationally intractable when the number of measurements is large (e.g., greater than 15). In this paper, we repair this problem by introducing mth-order Markovian restrictions. We establish identification results for the joint distribution of the binary outcomes by representing the model as a directed acyclic graph (DAG). We develop a novel estimation strategy for a smooth functional of the joint distribution. We illustrate our methodology in the context of a randomized trial designed to evaluate a web-delivered psychosocial intervention to reduce substance use, assessed by evaluating abstinence twice weekly for 12 weeks, among patients entering outpatient addiction treatment.
format Preprint
id arxiv_https___arxiv_org_abs_2105_08868
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Markov-Restricted Analysis of Randomized Trials with Non-Monotone Missing Binary Outcomes
Lee, Jaron J. R.
Mallett, Agatha S.
Shpitser, Ilya
Campbell, Aimee
Nunes, Edward
Scharfstein, Daniel O.
Methodology
Scharfstein et al. (2021) developed a sensitivity analysis model for analyzing randomized trials with repeatedly measured binary outcomes that are subject to nonmonotone missingness. Their approach becomes computationally intractable when the number of measurements is large (e.g., greater than 15). In this paper, we repair this problem by introducing mth-order Markovian restrictions. We establish identification results for the joint distribution of the binary outcomes by representing the model as a directed acyclic graph (DAG). We develop a novel estimation strategy for a smooth functional of the joint distribution. We illustrate our methodology in the context of a randomized trial designed to evaluate a web-delivered psychosocial intervention to reduce substance use, assessed by evaluating abstinence twice weekly for 12 weeks, among patients entering outpatient addiction treatment.
title Markov-Restricted Analysis of Randomized Trials with Non-Monotone Missing Binary Outcomes
topic Methodology
url https://arxiv.org/abs/2105.08868