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Autores principales: Banzato, Erika, Drton, Mathias, Saraf-Poor, Kian, Shi, Hongjian
Formato: Preprint
Publicado: 2025
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Acceso en línea:https://arxiv.org/abs/2502.12738
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author Banzato, Erika
Drton, Mathias
Saraf-Poor, Kian
Shi, Hongjian
author_facet Banzato, Erika
Drton, Mathias
Saraf-Poor, Kian
Shi, Hongjian
contents Many two-sample problems call for a comparison of two distributions from an exponential family. Density ratio estimation methods provide ways to solve such problems through direct estimation of the differences in natural parameters. The term direct indicates that one avoids estimating both marginal distributions. In this context, we consider the Kullback--Leibler Importance Estimation Procedure (KLIEP), which has been the subject of recent work on differential networks. Our main result shows that the existence of the KLIEP estimator is characterized by whether the average sufficient statistic for one sample belongs to the convex hull of the set of all sufficient statistics for data points in the second sample. For high-dimensional problems it is customary to regularize the KLIEP loss by adding the product of a tuning parameter and a norm of the vector of parameter differences. We show that the existence of the regularized KLIEP estimator requires the tuning parameter to be no less than the dual norm-based distance between the average sufficient statistic and the convex hull. The implications of these existence issues are explored in applications to differential network analysis.
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publishDate 2025
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spellingShingle Existence of Direct Density Ratio Estimators
Banzato, Erika
Drton, Mathias
Saraf-Poor, Kian
Shi, Hongjian
Statistics Theory
Many two-sample problems call for a comparison of two distributions from an exponential family. Density ratio estimation methods provide ways to solve such problems through direct estimation of the differences in natural parameters. The term direct indicates that one avoids estimating both marginal distributions. In this context, we consider the Kullback--Leibler Importance Estimation Procedure (KLIEP), which has been the subject of recent work on differential networks. Our main result shows that the existence of the KLIEP estimator is characterized by whether the average sufficient statistic for one sample belongs to the convex hull of the set of all sufficient statistics for data points in the second sample. For high-dimensional problems it is customary to regularize the KLIEP loss by adding the product of a tuning parameter and a norm of the vector of parameter differences. We show that the existence of the regularized KLIEP estimator requires the tuning parameter to be no less than the dual norm-based distance between the average sufficient statistic and the convex hull. The implications of these existence issues are explored in applications to differential network analysis.
title Existence of Direct Density Ratio Estimators
topic Statistics Theory
url https://arxiv.org/abs/2502.12738