Comparison of spectral radii and Collatz-Wielandt numbers for homogeneous maps, and other applications of the monotone companion norm on ordered normed vector spaces

Abstract

It is well known that an ordered normed vector space X with normal cone X+ has an order-preserving norm that is equivalent to the original norm. Such an equivalent order-preserving norm is given by equation x = \ d(x, X+), d(x, - X+)\, x ∈ X. equation This paper explores the properties of this norm and of the half-norm (x) = d(x,-X+) independently of whether or not the cone is normal. We use to derive comparison principles for the solutions of abstract integral equations, derive conditions for point-dissipativity of nonlinear positive maps, compare Collatz-Wielandt numbers, bounds, and order spectral radii for bounded homogeneous maps and give conditions for a local upper Collatz-Wielandt radius to have a lower positive eigenvector.