Tropical bounds for eigenvalues of matrices

Marianne Akian; Stéphane Gaubert; Andrea Marchesini

doi:10.1016/j.laa.2013.12.021

Tropical bounds for eigenvalues of matrices

Marianne Akian
, Stéphane Gaubert
, Andrea Marchesini

Research output: Contribution to journal › Article › peer-review

Abstract

Let ^λ1,.,^λn denote the eigenvalues of a n×n matrix, ordered by nonincreasing absolute value, and let γ1γn denote the tropical eigenvalues of an associated n×n matrix, obtained by replacing every entry of the original matrix by its absolute value. We show that for all 1≤k≤n, |^λ1â̄ ^λk|≤Cn,_k^γ1â̄ ^γk, where Cn,_k is a combinatorial constant depending only on k and on the pattern of the matrix. This generalizes an inequality by Friedland (1986), corresponding to the special case k=1.

Original language	English
Pages (from-to)	281-303
Number of pages	23
Journal	Linear Algebra and Its Applications
Volume	446
DOIs	https://doi.org/10.1016/j.laa.2013.12.021
Publication status	Published - 1 Apr 2014

Keywords

Location of eigenvalues
Log-majorization
Ostrowski's inequalities
Parametric optimal assignment
Tropical geometry

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10.1016/j.laa.2013.12.021

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title = "Tropical bounds for eigenvalues of matrices",

abstract = "Let λ1,.,λn denote the eigenvalues of a n×n matrix, ordered by nonincreasing absolute value, and let γ1γn denote the tropical eigenvalues of an associated n×n matrix, obtained by replacing every entry of the original matrix by its absolute value. We show that for all 1≤k≤n, |λ1{\^a}̄ λk|≤Cn,kγ1{\^a}̄ γk, where Cn,k is a combinatorial constant depending only on k and on the pattern of the matrix. This generalizes an inequality by Friedland (1986), corresponding to the special case k=1.",

keywords = "Location of eigenvalues, Log-majorization, Ostrowski's inequalities, Parametric optimal assignment, Tropical geometry",

author = "Marianne Akian and St{\'e}phane Gaubert and Andrea Marchesini",

year = "2014",

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T1 - Tropical bounds for eigenvalues of matrices

AU - Akian, Marianne

AU - Gaubert, Stéphane

AU - Marchesini, Andrea

PY - 2014/4/1

Y1 - 2014/4/1

N2 - Let λ1,.,λn denote the eigenvalues of a n×n matrix, ordered by nonincreasing absolute value, and let γ1γn denote the tropical eigenvalues of an associated n×n matrix, obtained by replacing every entry of the original matrix by its absolute value. We show that for all 1≤k≤n, |λ1â̄ λk|≤Cn,kγ1â̄ γk, where Cn,k is a combinatorial constant depending only on k and on the pattern of the matrix. This generalizes an inequality by Friedland (1986), corresponding to the special case k=1.

AB - Let λ1,.,λn denote the eigenvalues of a n×n matrix, ordered by nonincreasing absolute value, and let γ1γn denote the tropical eigenvalues of an associated n×n matrix, obtained by replacing every entry of the original matrix by its absolute value. We show that for all 1≤k≤n, |λ1â̄ λk|≤Cn,kγ1â̄ γk, where Cn,k is a combinatorial constant depending only on k and on the pattern of the matrix. This generalizes an inequality by Friedland (1986), corresponding to the special case k=1.

KW - Location of eigenvalues

KW - Log-majorization

KW - Ostrowski's inequalities

KW - Parametric optimal assignment

KW - Tropical geometry

UR - https://www.scopus.com/pages/publications/84894266728

U2 - 10.1016/j.laa.2013.12.021

DO - 10.1016/j.laa.2013.12.021

M3 - Article

AN - SCOPUS:84894266728

SN - 0024-3795

VL - 446

SP - 281

EP - 303

JO - Linear Algebra and Its Applications

JF - Linear Algebra and Its Applications

ER -

Tropical bounds for eigenvalues of matrices

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Keywords

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