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Autori principali: Lin, Sirui, Gao, Zijun, Blanchet, Jose, Glynn, Peter
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2502.01164
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author Lin, Sirui
Gao, Zijun
Blanchet, Jose
Glynn, Peter
author_facet Lin, Sirui
Gao, Zijun
Blanchet, Jose
Glynn, Peter
contents Causal estimands can vary significantly depending on the relationship between outcomes in treatment and control groups, potentially leading to wide partial identification (PI) intervals that impede decision making. Incorporating covariates can substantially tighten these bounds, but requires determining the range of PI over probability models consistent with the joint distributions of observed covariates and outcomes in treatment and control groups. This problem is known to be equivalent to a conditional optimal transport (COT) optimization task, which is more challenging than standard optimal transport (OT) due to the additional conditioning constraints. In this work, we study a tight relaxation of COT that effectively reduces it to standard OT, leveraging its well-established computational and theoretical foundations. Our relaxation incorporates covariate information and ensures narrower PI intervals for any value of the penalty parameter, while becoming asymptotically exact as a penalty increases to infinity. This approach preserves the benefits of covariate adjustment in PI and results in a data-driven estimator for the PI set that is easy to implement using existing OT packages. We analyze the convergence rate of our estimator and demonstrate the effectiveness of our approach through extensive simulations, highlighting its practical use and superior performance compared to existing methods.
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id arxiv_https___arxiv_org_abs_2502_01164
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Tightening Causal Bounds via Covariate-Aware Optimal Transport
Lin, Sirui
Gao, Zijun
Blanchet, Jose
Glynn, Peter
Methodology
Causal estimands can vary significantly depending on the relationship between outcomes in treatment and control groups, potentially leading to wide partial identification (PI) intervals that impede decision making. Incorporating covariates can substantially tighten these bounds, but requires determining the range of PI over probability models consistent with the joint distributions of observed covariates and outcomes in treatment and control groups. This problem is known to be equivalent to a conditional optimal transport (COT) optimization task, which is more challenging than standard optimal transport (OT) due to the additional conditioning constraints. In this work, we study a tight relaxation of COT that effectively reduces it to standard OT, leveraging its well-established computational and theoretical foundations. Our relaxation incorporates covariate information and ensures narrower PI intervals for any value of the penalty parameter, while becoming asymptotically exact as a penalty increases to infinity. This approach preserves the benefits of covariate adjustment in PI and results in a data-driven estimator for the PI set that is easy to implement using existing OT packages. We analyze the convergence rate of our estimator and demonstrate the effectiveness of our approach through extensive simulations, highlighting its practical use and superior performance compared to existing methods.
title Tightening Causal Bounds via Covariate-Aware Optimal Transport
topic Methodology
url https://arxiv.org/abs/2502.01164