Randomized strong rank-revealing QR for column subset selection and low-rank matrix approximation

Abstract

We discuss a randomized strong rank-revealing QR factorization that effectively reveals the spectrum of a matrix M. This factorization can be used to address problems such as selecting a subset of the columns of M, computing its low-rank approximation, estimating its rank, or approximating its null space. Given a random sketching matrix that satisfies the ε-embedding property for a subspace within the range of M, the factorization relies on selecting columns that allow to reveal the spectrum via a deterministic strong rank-revealing QR factorization of Msk = M, the sketch of M. We show that this selection leads to a factorization with strong rank-revealing properties, making it suitable for approximating the singular values of M.

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