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Main Authors: Qiu, Rui, Yu, Zhou, Lin, Zhenhua
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2404.10444
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author Qiu, Rui
Yu, Zhou
Lin, Zhenhua
author_facet Qiu, Rui
Yu, Zhou
Lin, Zhenhua
contents This paper explores the field of semi-supervised Fréchet regression, driven by the significant costs associated with obtaining non-Euclidean labels. Methodologically, we propose two novel methods: semi-supervised NW Fréchet regression and semi-supervised kNN Fréchet regression, both based on graph distance acquired from all feature instances. These methods extend the scope of existing semi-supervised Euclidean regression methods. We establish their convergence rates with limited labeled data and large amounts of unlabeled data, taking into account the low-dimensional manifold structure of the feature space. Through comprehensive simulations across diverse settings and applications to real data, we demonstrate the superior performance of our methods over their supervised counterparts. This study addresses existing research gaps and paves the way for further exploration and advancements in the field of semi-supervised Fréchet regression.
format Preprint
id arxiv_https___arxiv_org_abs_2404_10444
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Semi-supervised Fréchet Regression
Qiu, Rui
Yu, Zhou
Lin, Zhenhua
Statistics Theory
Machine Learning
This paper explores the field of semi-supervised Fréchet regression, driven by the significant costs associated with obtaining non-Euclidean labels. Methodologically, we propose two novel methods: semi-supervised NW Fréchet regression and semi-supervised kNN Fréchet regression, both based on graph distance acquired from all feature instances. These methods extend the scope of existing semi-supervised Euclidean regression methods. We establish their convergence rates with limited labeled data and large amounts of unlabeled data, taking into account the low-dimensional manifold structure of the feature space. Through comprehensive simulations across diverse settings and applications to real data, we demonstrate the superior performance of our methods over their supervised counterparts. This study addresses existing research gaps and paves the way for further exploration and advancements in the field of semi-supervised Fréchet regression.
title Semi-supervised Fréchet Regression
topic Statistics Theory
Machine Learning
url https://arxiv.org/abs/2404.10444