Row-aware Randomized SVD with applications

Abstract

The randomized singular value decomposition proposed in [27] has certainly become one of the most well-established randomization-based algorithms in numerical linear algebra. The key ingredient of the entire procedure is the computation of a subspace which is close to the column space of the target matrix A up to a certain probabilistic confidence. In this paper we employ a modification to the standard randomized SVD procedure which leads, in general, to better approximations to Range(A) at the same computational cost. To this end, we explicitly construct information from the row space of A enhancing the quality of the approximation. We derive novel error bounds which improve over existing results for A having important gaps in its singular values. We also observe that very few pieces of information from Range(AT) may be necessary. We thus design a variant of this algorithm equipped with a subsampling step which largely increases the efficiency of the procedure while often attaining competitive accuracy records. Our findings are supported by both theoretical analysis and numerical results.