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Autores principales: Kurisu, Daisuke, Zhou, Yidong, Otsu, Taisuke, Müller, Hans-Georg
Formato: Preprint
Publicado: 2024
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Acceso en línea:https://arxiv.org/abs/2406.19604
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author Kurisu, Daisuke
Zhou, Yidong
Otsu, Taisuke
Müller, Hans-Georg
author_facet Kurisu, Daisuke
Zhou, Yidong
Otsu, Taisuke
Müller, Hans-Georg
contents Adjusting for confounding and imbalance when establishing statistical relationships is an increasingly important task, and causal inference methods have emerged as the most popular tool to achieve this. Causal inference has been developed mainly for scalar outcomes and recently for distributional outcomes. We introduce here a general framework for causal inference when outcomes reside in general geodesic metric spaces, where we draw on a novel geodesic calculus that facilitates scalar multiplication for geodesics and the characterization of treatment effects through the concept of the geodesic average treatment effect. Using ideas from Fréchet regression, we develop estimation methods of the geodesic average treatment effect and derive consistency and rates of convergence for the proposed estimators. We also study uncertainty quantification and inference for the treatment effect. Our methodology is illustrated by a simulation study and real data examples for compositional outcomes of U.S. statewise energy source data to study the effect of coal mining, network data of New York taxi trips, where the effect of the COVID-19 pandemic is of interest, and brain functional connectivity network data to study the effect of Alzheimer's disease.
format Preprint
id arxiv_https___arxiv_org_abs_2406_19604
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Geodesic Causal Inference
Kurisu, Daisuke
Zhou, Yidong
Otsu, Taisuke
Müller, Hans-Georg
Methodology
Adjusting for confounding and imbalance when establishing statistical relationships is an increasingly important task, and causal inference methods have emerged as the most popular tool to achieve this. Causal inference has been developed mainly for scalar outcomes and recently for distributional outcomes. We introduce here a general framework for causal inference when outcomes reside in general geodesic metric spaces, where we draw on a novel geodesic calculus that facilitates scalar multiplication for geodesics and the characterization of treatment effects through the concept of the geodesic average treatment effect. Using ideas from Fréchet regression, we develop estimation methods of the geodesic average treatment effect and derive consistency and rates of convergence for the proposed estimators. We also study uncertainty quantification and inference for the treatment effect. Our methodology is illustrated by a simulation study and real data examples for compositional outcomes of U.S. statewise energy source data to study the effect of coal mining, network data of New York taxi trips, where the effect of the COVID-19 pandemic is of interest, and brain functional connectivity network data to study the effect of Alzheimer's disease.
title Geodesic Causal Inference
topic Methodology
url https://arxiv.org/abs/2406.19604