The smallest singular value for rectangular random matrices with L\'evy entries

Abstract

Let X=(xij)∈RN× n be a rectangular random matrix with i.i.d. entries (we assume N/na>1), and denote by σmin(X) its smallest singular value. When entries have mean zero and unit second moment, the celebrated work of Bai-Yin and Tikhomirov show that n-12σmin(X) converges almost surely to a-1. However, little is known when the second moment is infinite. In this work we consider symmetric entry distributions satisfying P(|xij|>t) t-α for some α∈(0,2), and prove that σmin(X) can be determined up to a log factor with high probability: for any D>0, with probability at least 1-n-D we have C1n1α( n)2(α-2)α≤ σmin(X)≤ C2n1α( n)α-22α for some constants C1,C2>0. The upper bound was derived in a recent work of Bao, Lee and Xu bao2024phase2 but the lower bound is new and answers a problem posed in that paper in a weaker form. This appears to be the first determination of σmin(X) in the α-stable case with a correct leading order of n, as previous anti-concentration arguments only yield lower bound n12. The same lower bound holds for σmin(X+B) for any fixed rectangular matrix B with no assumption on its operator norm. The case of diverging aspect ratio is also computed.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…