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Autores principales: Kurisu, Daisuke, Zhou, Yidong, Otsu, Taisuke, Müller, Hans-Georg
Formato: Preprint
Publicado: 2025
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Acceso en línea:https://arxiv.org/abs/2505.00331
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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 We introduce a geodesic synthetic control method for causal inference that extends existing synthetic control methods to scenarios where outcomes are elements in a geodesic metric space rather than scalars. Examples of such outcomes include distributions, compositions, networks, trees and functional data, among other data types that can be viewed as elements of a geodesic metric space given a suitable metric. We extend this further to geodesic synthetic difference-in-differences that builds on the established synthetic difference-in-differences for Euclidean outcomes. This estimator generalizes both the geodesic synthetic control method and a previously proposed geodesic difference-in-differences method and exhibits a double robustness property. The proposed geodesic synthetic control method is illustrated through comprehensive simulation studies and applications to the employment composition changes following the 2011 Great East Japan Earthquake, and the impact of abortion liberalization policy on fertility patterns in East Germany. We illustrate the proposed geodesic synthetic difference-in-differences by studying the consequences of the Soviet Union's collapse on age-at-death distributions for males and females.
format Preprint
id arxiv_https___arxiv_org_abs_2505_00331
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Geodesic Synthetic Control Methods for Random Objects and Functional Data
Kurisu, Daisuke
Zhou, Yidong
Otsu, Taisuke
Müller, Hans-Georg
Methodology
62D20, 62R20
We introduce a geodesic synthetic control method for causal inference that extends existing synthetic control methods to scenarios where outcomes are elements in a geodesic metric space rather than scalars. Examples of such outcomes include distributions, compositions, networks, trees and functional data, among other data types that can be viewed as elements of a geodesic metric space given a suitable metric. We extend this further to geodesic synthetic difference-in-differences that builds on the established synthetic difference-in-differences for Euclidean outcomes. This estimator generalizes both the geodesic synthetic control method and a previously proposed geodesic difference-in-differences method and exhibits a double robustness property. The proposed geodesic synthetic control method is illustrated through comprehensive simulation studies and applications to the employment composition changes following the 2011 Great East Japan Earthquake, and the impact of abortion liberalization policy on fertility patterns in East Germany. We illustrate the proposed geodesic synthetic difference-in-differences by studying the consequences of the Soviet Union's collapse on age-at-death distributions for males and females.
title Geodesic Synthetic Control Methods for Random Objects and Functional Data
topic Methodology
62D20, 62R20
url https://arxiv.org/abs/2505.00331