半参数张量因子分析:迭代投影奇异值分解方法

Semi-parametric tensor factor analysis by iteratively projected singular value decomposition

Journal of the Royal Statistical Society. Series B: Statistical Methodology · 2024
被引 16 · 同刊同年前 4%
ABS 4

中文导读

提出半参数张量因子分析框架,通过迭代投影奇异值分解算法估计低秩张量分解中的载荷矩阵和核心张量,在弱噪声假设下获得更快收敛速度,并支持新协变量下的预测。

Abstract

Abstract This paper introduces a general framework of Semi-parametric TEnsor Factor Analysis (STEFA) that focuses on the methodology and theory of low-rank tensor decomposition with auxiliary covariates. Semi-parametric TEnsor Factor Analysis models extend tensor factor models by incorporating auxiliary covariates in the loading matrices. We propose an algorithm of iteratively projected singular value decomposition (IP-SVD) for the semi-parametric estimation. It iteratively projects tensor data onto the linear space spanned by the basis functions of covariates and applies singular value decomposition on matricized tensors over each mode. We establish the convergence rates of the loading matrices and the core tensor factor. The theoretical results only require a sub-exponential noise distribution, which is weaker than the assumption of sub-Gaussian tail of noise in the literature. Compared with the Tucker decomposition, IP-SVD yields more accurate estimators with a faster convergence rate. Besides estimation, we propose several prediction methods with new covariates based on the STEFA model. On both synthetic and real tensor data, we demonstrate the efficacy of the STEFA model and the IP-SVD algorithm on both the estimation and prediction tasks.

张量分解半参数估计因子分析高维数据分析奇异值分解