Bounding the row sum arithmetic mean by Perron roots of row-permuted matrices

Gernot Engel; Sergei Sergeev

doi:10.1016/j.laa.2023.05.014

Bounding the row sum arithmetic mean by Perron roots of row-permuted matrices

Gernot Engel, Sergei Sergeev^*

^*Corresponding author for this work

Mathematics

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Abstract

(*for correct formatting of formulae, please see Version of Record)

Rn×n denotes the set of n × n non-negative matrices.
+
For A ∈ Rn×n let Ω(A) be the set of all matrices that can be formed by permuting the elements within each row of A.
+
Formally:

Ω(A) = {B ∈ Rn×n : ∀i ∃ a permutation
+
φi s.t. bi,j = ai,φi (j) ∀j}.

For B ∈ Ω(A) let ρ(B) denote the spectral radius or largest non-negative eigenvalue of B. We show that the arithmetic mean of the row sums of A is bounded by the maximum and minimum spectral radius of the matrices in Ω(A). Formally, we show that

min ρ(B) ≤ 1
B∈Ω(A) n
n
n∑
i=1
n∑
j=1
ai,j ≤ max
B∈Ω(A) ρ(B).
For positive A we obtain necessary and sufficient conditions for these inequalities to become an equality. We also give
criteria which an irreducible matrix C should satisfy so that
ρ(C) = minB∈Ω(A) ρ(B) or ρ(C) = maxB∈Ω(A) ρ(B).
These criteria are used to derive algorithms for finding such C when all the entries of A are positive.

Original language	English
Pages (from-to)	220-232
Number of pages	13
Journal	Linear Algebra and its Applications
Volume	673
Early online date	16 May 2023
DOIs	https://doi.org/10.1016/j.laa.2023.05.014
Publication status	E-pub ahead of print - 16 May 2023

Keywords

Perron root
Row sums
Rearrangement inequality

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@article{0073e6018fe147c991d408b8d01472c6,

title = "Bounding the row sum arithmetic mean by Perron roots of row-permuted matrices",

abstract = "(*for correct formatting of formulae, please see Version of Record)Rn×n denotes the set of n × n non-negative matrices. +For A ∈ Rn×n let Ω(A) be the set of all matrices that can be formed by permuting the elements within each row of A. +Formally:Ω(A) = {B ∈ Rn×n : ∀i ∃ a permutation +φi s.t. bi,j = ai,φi (j) ∀j}.For B ∈ Ω(A) let ρ(B) denote the spectral radius or largest non-negative eigenvalue of B. We show that the arithmetic mean of the row sums of A is bounded by the maximum and minimum spectral radius of the matrices in Ω(A). Formally, we show that min ρ(B) ≤ 1 B∈Ω(A) nnn∑i=1n∑j=1ai,j ≤ maxB∈Ω(A) ρ(B).For positive A we obtain necessary and sufficient conditions for these inequalities to become an equality. We also givecriteria which an irreducible matrix C should satisfy so thatρ(C) = minB∈Ω(A) ρ(B) or ρ(C) = maxB∈Ω(A) ρ(B). These criteria are used to derive algorithms for finding such C when all the entries of A are positive.",

keywords = "Perron root, Row sums, Rearrangement inequality",

author = "Gernot Engel and Sergei Sergeev",

year = "2023",

month = may,

day = "16",

doi = "10.1016/j.laa.2023.05.014",

language = "English",

volume = "673",

pages = "220--232",

journal = "Linear Algebra and its Applications",

issn = "0024-3795",

publisher = "Elsevier",

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TY - JOUR

T1 - Bounding the row sum arithmetic mean by Perron roots of row-permuted matrices

AU - Engel, Gernot

AU - Sergeev, Sergei

PY - 2023/5/16

Y1 - 2023/5/16

N2 - (*for correct formatting of formulae, please see Version of Record)Rn×n denotes the set of n × n non-negative matrices. +For A ∈ Rn×n let Ω(A) be the set of all matrices that can be formed by permuting the elements within each row of A. +Formally:Ω(A) = {B ∈ Rn×n : ∀i ∃ a permutation +φi s.t. bi,j = ai,φi (j) ∀j}.For B ∈ Ω(A) let ρ(B) denote the spectral radius or largest non-negative eigenvalue of B. We show that the arithmetic mean of the row sums of A is bounded by the maximum and minimum spectral radius of the matrices in Ω(A). Formally, we show that min ρ(B) ≤ 1 B∈Ω(A) nnn∑i=1n∑j=1ai,j ≤ maxB∈Ω(A) ρ(B).For positive A we obtain necessary and sufficient conditions for these inequalities to become an equality. We also givecriteria which an irreducible matrix C should satisfy so thatρ(C) = minB∈Ω(A) ρ(B) or ρ(C) = maxB∈Ω(A) ρ(B). These criteria are used to derive algorithms for finding such C when all the entries of A are positive.

AB - (*for correct formatting of formulae, please see Version of Record)Rn×n denotes the set of n × n non-negative matrices. +For A ∈ Rn×n let Ω(A) be the set of all matrices that can be formed by permuting the elements within each row of A. +Formally:Ω(A) = {B ∈ Rn×n : ∀i ∃ a permutation +φi s.t. bi,j = ai,φi (j) ∀j}.For B ∈ Ω(A) let ρ(B) denote the spectral radius or largest non-negative eigenvalue of B. We show that the arithmetic mean of the row sums of A is bounded by the maximum and minimum spectral radius of the matrices in Ω(A). Formally, we show that min ρ(B) ≤ 1 B∈Ω(A) nnn∑i=1n∑j=1ai,j ≤ maxB∈Ω(A) ρ(B).For positive A we obtain necessary and sufficient conditions for these inequalities to become an equality. We also givecriteria which an irreducible matrix C should satisfy so thatρ(C) = minB∈Ω(A) ρ(B) or ρ(C) = maxB∈Ω(A) ρ(B). These criteria are used to derive algorithms for finding such C when all the entries of A are positive.

KW - Perron root

KW - Row sums

KW - Rearrangement inequality

U2 - 10.1016/j.laa.2023.05.014

DO - 10.1016/j.laa.2023.05.014

M3 - Article

SN - 0024-3795

VL - 673

SP - 220

EP - 232

JO - Linear Algebra and its Applications

JF - Linear Algebra and its Applications

ER -

Bounding the row sum arithmetic mean by Perron roots of row-permuted matrices

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Keywords

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