Perturbing eigenvalues of non-negative matrices

Abstract

Let A be an irreducible (entrywise) nonnegative n× n matrix with eigenvalues , b+ic,b-ic, λ4,·s,λn, where is the Perron eigenvalue. It is shown that for any t ∈ [0, ∞) there is a nonnegative matrix with eigenvalues + t,λ2+t,λ3+t, λ4 ·s,λn, whenever t γn t with γ3=1, γ4 = 2, γ5= 5 and γn = 2.25 for n 6. The result improves that of Guo et al. Our proof depends on an auxiliary result in geometry asserting that the area of an n-sided convex polygon is bounded by γn times the maximum area of the triangle lying inside the polygon.