Saved in:
Bibliographic Details
Main Authors: Li, Xinyu, Xu, Jianjun, Cui, Wenquan, Cheng, Haoyang
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2305.10880
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866929257142288384
author Li, Xinyu
Xu, Jianjun
Cui, Wenquan
Cheng, Haoyang
author_facet Li, Xinyu
Xu, Jianjun
Cui, Wenquan
Cheng, Haoyang
contents Considering the case where the response variable is a categorical variable and the predictor is a random function, two novel functional sufficient dimensional reduction (FSDR) methods are proposed based on mutual information and square loss mutual information. Compared to the classical FSDR methods, such as functional sliced inverse regression and functional sliced average variance estimation, the proposed methods are appealing because they are capable of estimating multiple effective dimension reduction directions in the case of a relatively small number of categories, especially for the binary response. Moreover, the proposed methods do not require the restrictive linear conditional mean assumption and the constant covariance assumption. They avoid the inverse problem of the covariance operator which is often encountered in the functional sufficient dimension reduction. The functional principal component analysis with truncation be used as a regularization mechanism. Under some mild conditions, the statistical consistency of the proposed methods is established. It is demonstrated that the two methods are competitive compared with some existing FSDR methods by simulations and real data analyses.
format Preprint
id arxiv_https___arxiv_org_abs_2305_10880
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Functional sufficient dimension reduction through information maximization with application to classification
Li, Xinyu
Xu, Jianjun
Cui, Wenquan
Cheng, Haoyang
Machine Learning
Considering the case where the response variable is a categorical variable and the predictor is a random function, two novel functional sufficient dimensional reduction (FSDR) methods are proposed based on mutual information and square loss mutual information. Compared to the classical FSDR methods, such as functional sliced inverse regression and functional sliced average variance estimation, the proposed methods are appealing because they are capable of estimating multiple effective dimension reduction directions in the case of a relatively small number of categories, especially for the binary response. Moreover, the proposed methods do not require the restrictive linear conditional mean assumption and the constant covariance assumption. They avoid the inverse problem of the covariance operator which is often encountered in the functional sufficient dimension reduction. The functional principal component analysis with truncation be used as a regularization mechanism. Under some mild conditions, the statistical consistency of the proposed methods is established. It is demonstrated that the two methods are competitive compared with some existing FSDR methods by simulations and real data analyses.
title Functional sufficient dimension reduction through information maximization with application to classification
topic Machine Learning
url https://arxiv.org/abs/2305.10880