JSM 2021 Online Program

This paper investigates statistical inference for noisy matrix completion in a semi-supervised model when auxiliary covariates are available. The model consists of two parts. One part is a low-rank matrix induced by unobserved latent factors; the other part models the effects of the observed covariates through a coefficient matrix which is composed of high-dimensional column vectors. We propose an iterative least squares (LS) estimation approach that fully enjoys a low computational cost. We show that we only need to iterate the LS estimation a few times, and the resulting entry-wise estimators of the target matrix and the coefficient matrix are guaranteed to have asymptotic normal distributions. As a result, a pointwise confidence interval and individual inference for each entry of the unknown matrices can be conducted. Moreover, we propose a simultaneous testing procedure with multiplier bootstrap for the high-dimensional coefficient matrix. This simultaneous inferential tool can help us further investigate the effects of auxiliary covariates for the prediction of all missing entries.