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Main Authors: Zhang, Xu, Liu, Catherine C., Guo, Jianhua, Yuen, K. C., Welsh, A. H.
Format: Preprint
Published: 2022
Subjects:
Online Access:https://arxiv.org/abs/2209.14846
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author Zhang, Xu
Liu, Catherine C.
Guo, Jianhua
Yuen, K. C.
Welsh, A. H.
author_facet Zhang, Xu
Liu, Catherine C.
Guo, Jianhua
Yuen, K. C.
Welsh, A. H.
contents We propose a new matrix factor model, named RaDFaM, which is strictly derived based on the general rank decomposition and assumes a structure of a high-dimensional vector factor model for each basis vector. RaDFaM contributes a novel class of low-rank latent structure that makes tradeoff between signal intensity and dimension reduction from the perspective of tensor subspace. Based on the intrinsic separable covariance structure of RaDFaM, for a collection of matrix-valued observations, we derive a new class of PCA variants for estimating loading matrices, and sequentially the latent factor matrices. The peak signal-to-noise ratio of RaDFaM is proved to be superior in the category of PCA-type estimations. We also establish the asymptotic theory including the consistency, convergence rates, and asymptotic distributions for components in the signal part. Numerically, we demonstrate the performance of RaDFaM in applications such as matrix reconstruction, supervised learning, and clustering, on uncorrelated and correlated data, respectively.
format Preprint
id arxiv_https___arxiv_org_abs_2209_14846
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Modeling and Learning on High-Dimensional Matrix-Variate Sequences
Zhang, Xu
Liu, Catherine C.
Guo, Jianhua
Yuen, K. C.
Welsh, A. H.
Methodology
We propose a new matrix factor model, named RaDFaM, which is strictly derived based on the general rank decomposition and assumes a structure of a high-dimensional vector factor model for each basis vector. RaDFaM contributes a novel class of low-rank latent structure that makes tradeoff between signal intensity and dimension reduction from the perspective of tensor subspace. Based on the intrinsic separable covariance structure of RaDFaM, for a collection of matrix-valued observations, we derive a new class of PCA variants for estimating loading matrices, and sequentially the latent factor matrices. The peak signal-to-noise ratio of RaDFaM is proved to be superior in the category of PCA-type estimations. We also establish the asymptotic theory including the consistency, convergence rates, and asymptotic distributions for components in the signal part. Numerically, we demonstrate the performance of RaDFaM in applications such as matrix reconstruction, supervised learning, and clustering, on uncorrelated and correlated data, respectively.
title Modeling and Learning on High-Dimensional Matrix-Variate Sequences
topic Methodology
url https://arxiv.org/abs/2209.14846