Quantitative estimates of the spectral norm of random matrices with independent columns
Abstract
This paper investigates the nonasymptotic properties of the spectral norm of some random matrices with independent columns. In particular, we consider an m× n random matrix BA, where A is an N× n random matrix with independent mean-zero subexponential entries, and B is an m× N deterministic matrix. We prove that the Lp norm of the spectral norm of BA is upper bounded by (m+n)p. It is remarkable that this result is independent of the dimension N.
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