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Main Author: Mai, The Tien
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2504.10171
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author Mai, The Tien
author_facet Mai, The Tien
contents Aggregation methods have emerged as a powerful and flexible framework in statistical learning, providing unified solutions across diverse problems such as regression, classification, and density estimation. In the context of generalized linear models (GLMs), where responses follow exponential family distributions, aggregation offers an attractive alternative to classical parametric modeling. This paper investigates the problem of sparse aggregation in GLMs, aiming to approximate the true parameter vector by a sparse linear combination of predictors. We prove that an exponential weighted aggregation scheme yields a sharp oracle inequality for the Kullback-Leibler risk with leading constant equal to one, while also attaining the minimax-optimal rate of aggregation. These results are further enhanced by establishing high-probability bounds on the excess risk.
format Preprint
id arxiv_https___arxiv_org_abs_2504_10171
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Kullback-Leibler excess risk bounds for exponential weighted aggregation in Generalized linear models
Mai, The Tien
Statistics Theory
Machine Learning
Aggregation methods have emerged as a powerful and flexible framework in statistical learning, providing unified solutions across diverse problems such as regression, classification, and density estimation. In the context of generalized linear models (GLMs), where responses follow exponential family distributions, aggregation offers an attractive alternative to classical parametric modeling. This paper investigates the problem of sparse aggregation in GLMs, aiming to approximate the true parameter vector by a sparse linear combination of predictors. We prove that an exponential weighted aggregation scheme yields a sharp oracle inequality for the Kullback-Leibler risk with leading constant equal to one, while also attaining the minimax-optimal rate of aggregation. These results are further enhanced by establishing high-probability bounds on the excess risk.
title Kullback-Leibler excess risk bounds for exponential weighted aggregation in Generalized linear models
topic Statistics Theory
Machine Learning
url https://arxiv.org/abs/2504.10171