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Main Authors: Wu, Minxuan, Antonelli, Joseph, Su, Zhihua
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.14876
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author Wu, Minxuan
Antonelli, Joseph
Su, Zhihua
author_facet Wu, Minxuan
Antonelli, Joseph
Su, Zhihua
contents In this article, we extend predictor envelope models to settings with multivariate outcomes and multiple, functional predictors. We propose a two-step estimation strategy, which first projects the function onto a finite-dimensional Euclidean space before fitting the model using existing approaches to envelope models. We first develop an estimator under a linear model with continuous outcomes and then extend this procedure to the more general class of generalized linear models, which allow for a variety of outcome types. We provide asymptotic theory for these estimators showing that they are root-$n$ consistent and asymptotically normal when the regression coefficient is finite-rank. Additionally we show that consistency can be obtained even when the regression coefficient has rank that grows with the sample size. Extensive simulation studies confirm our theoretical results and show strong prediction performance of the proposed estimators. Additionally, we provide multiple data analyses showing that the proposed approach performs well in real-world settings under a variety of outcome types compared with existing dimension reduction approaches.
format Preprint
id arxiv_https___arxiv_org_abs_2505_14876
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Envelope-based partial least squares in functional regression
Wu, Minxuan
Antonelli, Joseph
Su, Zhihua
Methodology
In this article, we extend predictor envelope models to settings with multivariate outcomes and multiple, functional predictors. We propose a two-step estimation strategy, which first projects the function onto a finite-dimensional Euclidean space before fitting the model using existing approaches to envelope models. We first develop an estimator under a linear model with continuous outcomes and then extend this procedure to the more general class of generalized linear models, which allow for a variety of outcome types. We provide asymptotic theory for these estimators showing that they are root-$n$ consistent and asymptotically normal when the regression coefficient is finite-rank. Additionally we show that consistency can be obtained even when the regression coefficient has rank that grows with the sample size. Extensive simulation studies confirm our theoretical results and show strong prediction performance of the proposed estimators. Additionally, we provide multiple data analyses showing that the proposed approach performs well in real-world settings under a variety of outcome types compared with existing dimension reduction approaches.
title Envelope-based partial least squares in functional regression
topic Methodology
url https://arxiv.org/abs/2505.14876