Eventual cone invariance revisited

Abstract

We consider finite-dimensional real vector spaces X ordered by a closed cone X+ with non-empty interior and study eventual nonnegativity of matrix semigroups (etA)t 0 with respect to this cone. Our first contribution is the observation that, for general cones, one needs to distinguish between different notions of eventual nonnegativity: (i) uniform eventual nonnegativity means that etA maps X+ into X+ for all sufficiently large times t; (ii) individual eventual nonnegativity means that for each x ∈ X+ the vector etAx is in X+ for all t larger than an x-dependent time t0; and (iii) weak eventual nonnegativity means that for each x ∈ X+ and each functional x' in the dual cone X'+ the value x', etA x is in [0,∞) for all t larger than an x- and x'-dependent time t0. Until now, only the first of these notions has been studied in the literature. We demonstrate by examples that, somewhat surprisingly for finite-dimensional spaces, all three notions are different. Our second contribution is to show that typical Perron-Frobenius like properties remain valid under the weakest of the above notions. Third, we study a strengthened form of the above mentioned concepts, namely eventual positivity. We prove that uniform, individual and weak versions of this property are - in contrast to the nonnegative case - equivalent, and that they can be characterized by spectral properties.