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Autores principales: Anancharoenkij, Thatchanon, Ponnoprat, Donlapark
Formato: Preprint
Publicado: 2026
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Acceso en línea:https://arxiv.org/abs/2602.04736
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author Anancharoenkij, Thatchanon
Ponnoprat, Donlapark
author_facet Anancharoenkij, Thatchanon
Ponnoprat, Donlapark
contents A complete understanding of heterogeneous treatment effects involves characterizing the full conditional distribution of potential outcomes. To this end, we propose the Conditional Counterfactual Mean Embeddings (CCME), a framework that embeds conditional distributions of counterfactual outcomes into a reproducing kernel Hilbert space (RKHS). Under this framework, we develop a two-stage meta-estimator for CCME that accommodates any RKHS-valued regression in each stage. Based on this meta-estimator, we develop three practical CCME estimators: (1) Ridge Regression estimator, (2) Deep Feature estimator that parameterizes the feature map by a neural network, and (3) Neural-Kernel estimator that performs RKHS-valued regression, with the coefficients parameterized by a neural network. We provide finite-sample convergence rates for all estimators, establishing that they possess the double robustness property. Our experiments demonstrate that our estimators accurately recover distributional features including multimodal structure of conditional counterfactual distributions.
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spellingShingle Conditional Counterfactual Mean Embeddings: Doubly Robust Estimation and Learning Rates
Anancharoenkij, Thatchanon
Ponnoprat, Donlapark
Machine Learning
A complete understanding of heterogeneous treatment effects involves characterizing the full conditional distribution of potential outcomes. To this end, we propose the Conditional Counterfactual Mean Embeddings (CCME), a framework that embeds conditional distributions of counterfactual outcomes into a reproducing kernel Hilbert space (RKHS). Under this framework, we develop a two-stage meta-estimator for CCME that accommodates any RKHS-valued regression in each stage. Based on this meta-estimator, we develop three practical CCME estimators: (1) Ridge Regression estimator, (2) Deep Feature estimator that parameterizes the feature map by a neural network, and (3) Neural-Kernel estimator that performs RKHS-valued regression, with the coefficients parameterized by a neural network. We provide finite-sample convergence rates for all estimators, establishing that they possess the double robustness property. Our experiments demonstrate that our estimators accurately recover distributional features including multimodal structure of conditional counterfactual distributions.
title Conditional Counterfactual Mean Embeddings: Doubly Robust Estimation and Learning Rates
topic Machine Learning
url https://arxiv.org/abs/2602.04736