The smallest singular value of inhomogenous random rectangular matrices
Abstract
Let () be a random matrix with with independent entries that have mean 0 variance 1 and bounded moment. We show that the smallest singular value satisfies for all , where depend only on and the moment. This extends earlier results of Rudelson and Vershynin, who showed that such lower tail estimates held for rectangular matrices with i.i.d. mean 0 subgaussian entries. When the moment assumption is replaced with a uniform anti-concentration assumption, , we show that where now depend only on and . This extends more recent work of Livshyts, whose showed that such lower tail estimates held for rectrangular matrices with i.i.d. rows. To prove these results we employ a number of new technical ingredients, including a new deviation inequality for the regularized Hilbert-Schmidt norm and a recently proven small ball estimate for the distance between a random vector and a subspace spanned by an inhomogeneous rectangular matrix.
Keywords
Cite
@article{arxiv.2408.14389,
title = {The smallest singular value of inhomogenous random rectangular matrices},
author = {Max Dabagia and Manuel Fernandez},
journal= {arXiv preprint arXiv:2408.14389},
year = {2025}
}
Comments
introduced some new notation, simplified a number of proofs and fixed some typos and misprints. Updated Theorem 8 and 9 to be slightly more general