Convergence and asymptotic freeness of missing data matrices

Abstract

We consider a random matrix of the form Dn Xn (known as a variance profile matrix), where denotes the Hadamard product of the two matrices, Dn is a deterministic matrix, and Xn is a random matrix. We call Dn Xn as a missing data matrix of Xn when the entries of Dn are either 0 or 1. This framework is commonly used in various applied fields, such as biology, neuroscience, and network data analysis. We study the convergence and asymptotic freeness of missing data matrices of iid, elliptic, and covariance random matrices. Specifically, it is known that independent iid, elliptic, and covariance matrices converge to freely independent circular, elliptic, and Marcenko-Pastur variables, respectively. In this article, we provide the necessary and sufficient conditions on deterministic matrices Dn for which these results hold true for independent missing data matrices of these three types of random matrices.