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Main Authors: Bhaskara, Aditya, Evert, Eric, Srinivas, Vaidehi, Vijayaraghavan, Aravindan
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2405.01517
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author Bhaskara, Aditya
Evert, Eric
Srinivas, Vaidehi
Vijayaraghavan, Aravindan
author_facet Bhaskara, Aditya
Evert, Eric
Srinivas, Vaidehi
Vijayaraghavan, Aravindan
contents We develop new techniques for proving lower bounds on the least singular value of random matrices with limited randomness. The matrices we consider have entries that are given by polynomials of a few underlying base random variables. This setting captures a core technical challenge for obtaining smoothed analysis guarantees in many algorithmic settings. Least singular value bounds often involve showing strong anti-concentration inequalities that are intricate and much less understood compared to concentration (or large deviation) bounds. First, we introduce a general technique involving a hierarchical $ε$-nets to prove least singular value bounds. Our second tool is a new statement about least singular values to reason about higher-order lifts of smoothed matrices, and the action of linear operators on them. Apart from getting simpler proofs of existing smoothed analysis results, we use these tools to now handle more general families of random matrices. This allows us to produce smoothed analysis guarantees in several previously open settings. These include new smoothed analysis guarantees for power sum decompositions, subspace clustering and certifying robust entanglement of subspaces, where prior work could only establish least singular value bounds for fully random instances or only show non-robust genericity guarantees.
format Preprint
id arxiv_https___arxiv_org_abs_2405_01517
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle New Tools for Smoothed Analysis: Least Singular Value Bounds for Random Matrices with Dependent Entries
Bhaskara, Aditya
Evert, Eric
Srinivas, Vaidehi
Vijayaraghavan, Aravindan
Data Structures and Algorithms
We develop new techniques for proving lower bounds on the least singular value of random matrices with limited randomness. The matrices we consider have entries that are given by polynomials of a few underlying base random variables. This setting captures a core technical challenge for obtaining smoothed analysis guarantees in many algorithmic settings. Least singular value bounds often involve showing strong anti-concentration inequalities that are intricate and much less understood compared to concentration (or large deviation) bounds. First, we introduce a general technique involving a hierarchical $ε$-nets to prove least singular value bounds. Our second tool is a new statement about least singular values to reason about higher-order lifts of smoothed matrices, and the action of linear operators on them. Apart from getting simpler proofs of existing smoothed analysis results, we use these tools to now handle more general families of random matrices. This allows us to produce smoothed analysis guarantees in several previously open settings. These include new smoothed analysis guarantees for power sum decompositions, subspace clustering and certifying robust entanglement of subspaces, where prior work could only establish least singular value bounds for fully random instances or only show non-robust genericity guarantees.
title New Tools for Smoothed Analysis: Least Singular Value Bounds for Random Matrices with Dependent Entries
topic Data Structures and Algorithms
url https://arxiv.org/abs/2405.01517