部分观测的动态张量响应回归

Partially Observed Dynamic Tensor Response Regression

Journal of the American Statistical Association · 2021
被引 29
ABS 4

中文导读

针对动态张量数据部分观测的问题,提出一种回归模型,利用低秩、稀疏和融合结构估计系数张量,并开发高效算法,适用于神经影像和数字广告等应用。

Abstract

In modern data science, dynamic tensor data prevail in numerous applications. An important task is to characterize the relationship between dynamic tensor datasets and external covariates. However, the tensor data are often only partially observed, rendering many existing methods inapplicable. In this article, we develop a regression model with a partially observed dynamic tensor as the response and external covariates as the predictor. We introduce the low-rankness, sparsity, and fusion structures on the regression coefficient tensor, and consider a loss function projected over the observed entries. We develop an efficient nonconvex alternating updating algorithm, and derive the finite-sample error bound of the actual estimator from each step of our optimization algorithm. Unobserved entries in the tensor response have imposed serious challenges. As a result, our proposal differs considerably in terms of estimation algorithm, regularity conditions, as well as theoretical properties, compared to the existing tensor completion or tensor response regression solutions. We illustrate the efficacy of our proposed method using simulations and two real applications, including a neuroimaging dementia study and a digital advertising study.

张量回归高维数据分析机器学习统计建模