Distribution of singular values in large sample cross-covariance matrices
Abstract
For two large matrices X and Y with Gaussian i.i.d.\ entries and dimensions T× NX and T× NY, respectively, we derive the probability distribution of the singular values of XT Y in different parameter regimes. This extends the Marchenko-Pastur result for the distribution of eigenvalues of empirical sample covariance matrices to singular values of empirical cross-covariances. Our results will help to establish statistical significance of cross-correlations in many data-science applications.
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