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

Abstract

R+n× n denotes the set of n× n non-negative matrices. For A∈ R+n× n let (A) be the set of all matrices that can be formed by permuting the elements within each row of A. Formally: (A)=\B∈ R+n× n: ∀ i\;∃ a permutation φi\; s.t.\ bi,j=ai,φi(j)\;∀ j\. For B∈(A) let (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 (A) Formally, we are showing that B∈(A)(B)≤ 1nΣi=1nΣj=1n ai,j≤ B∈(A)(B). For positive A we also obtain necessary and sufficient conditions for one of these inequalities (or, equivalently, both of them) to become an equality. We also give criteria which an irreducible matrix C should satisfy to have (C)=B∈(A) (B) or (C)=B∈(A) (B). These criteria are used to derive algorithms for finding such C when all the entries of A are positive .