Strict monotonicity of the spectral radii of bounded, positive, ordered linear operators is investigated. It is well-known that under reasonable assumptions, the spectral radii of two ordered positive operators enjoy a non-strict inequality. It is also well-known that a “strict” inequality between operators does not imply strict monotonicity of the spectral radii in general—some additional structure is required. We present a number of sufficient conditions on both the cone and the operators for such a strict ordering to hold which generalise known results in the literature, and have utility in comparison arguments, ubiquitous in positive systems theory
Elsner L, Frommer A, Nabben R, Schneider H, Szyld DB. Conditions for strict inequality in comparison...
Abstract. We consider the joint spectral radius of sets of matrices for discrete or continuous posit...
AbstractOur aim is to provide a novelly comprehensive and unifying approach to showing the continuou...
Strict monotonicity of the spectral radii of bounded, positive, ordered linear operators is investig...
summary:Let $f$ be a non-zero positive vector of a Banach lattice $L$, and let $T$ be a positive lin...
AbstractWe generalize the Birkhoff-Varga, Wielandt, and Donsker-Varadhan characterizations of the sp...
Abstract. For linear operators between Banach algebras “spectral boundedness ” is derived from ordin...
AbstractIt has been shown by Förster and Nagy that the convergence of the Collatz-Wielandt numbers t...
summary:We establish several inequalities for the spectral radius of a positive commutator of positi...
Of the several generalizations to infinite dimensional spaces of the Perron-Frobenius theorem on mat...
AbstractLet T be a nonnegative linear continuous operator in a partially ordered Banach space E, and...
AbstractWe prove theorems of Perron–Frobenius type for positive elements in partially ordered topolo...
summary:The purpose of this article is to give some estimates for the spectral radius of the polynom...
This paper provides various "contractivity" results for linear operators of the form I C where C are...
AbstractA series of inequalities are developed relating the spectral radius ϱ(A ∘ B) of the Schur pr...
Elsner L, Frommer A, Nabben R, Schneider H, Szyld DB. Conditions for strict inequality in comparison...
Abstract. We consider the joint spectral radius of sets of matrices for discrete or continuous posit...
AbstractOur aim is to provide a novelly comprehensive and unifying approach to showing the continuou...
Strict monotonicity of the spectral radii of bounded, positive, ordered linear operators is investig...
summary:Let $f$ be a non-zero positive vector of a Banach lattice $L$, and let $T$ be a positive lin...
AbstractWe generalize the Birkhoff-Varga, Wielandt, and Donsker-Varadhan characterizations of the sp...
Abstract. For linear operators between Banach algebras “spectral boundedness ” is derived from ordin...
AbstractIt has been shown by Förster and Nagy that the convergence of the Collatz-Wielandt numbers t...
summary:We establish several inequalities for the spectral radius of a positive commutator of positi...
Of the several generalizations to infinite dimensional spaces of the Perron-Frobenius theorem on mat...
AbstractLet T be a nonnegative linear continuous operator in a partially ordered Banach space E, and...
AbstractWe prove theorems of Perron–Frobenius type for positive elements in partially ordered topolo...
summary:The purpose of this article is to give some estimates for the spectral radius of the polynom...
This paper provides various "contractivity" results for linear operators of the form I C where C are...
AbstractA series of inequalities are developed relating the spectral radius ϱ(A ∘ B) of the Schur pr...
Elsner L, Frommer A, Nabben R, Schneider H, Szyld DB. Conditions for strict inequality in comparison...
Abstract. We consider the joint spectral radius of sets of matrices for discrete or continuous posit...
AbstractOur aim is to provide a novelly comprehensive and unifying approach to showing the continuou...