On the joint spectral radius

Emmanuel Breuillard

arXiv:2103.09089·math.DS·March 29, 2021

On the joint spectral radius

Emmanuel Breuillard

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TL;DR

This paper establishes explicit polynomial bounds for Bochi's inequalities, providing new quantitative estimates for the joint spectral radius of matrix sets, which is fundamental in understanding matrix products and stability.

Contribution

It introduces explicit polynomial bounds for Bochi's inequalities, advancing the quantitative analysis of the joint spectral radius.

Findings

01

Derived explicit polynomial bounds for the joint spectral radius.

02

Enhanced understanding of matrix product stability.

03

Provided tools for further quantitative spectral analysis.

Abstract

We prove explicit polynomial bounds for Bochi's inequalities regarding the joint spectral radius of a subset of $d \times d$ matrices.

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