AbstractWe prove theorems of Perron–Frobenius type for positive elements in partially ordered topological algebras satisfying certain hypotheses. We show how some of our results relate to known results on Banach algebras. We give examples and state some open questions
Strict monotonicity of the spectral radii of bounded, positive, ordered linear operators is investig...
AbstractThe paper attempts to solve a problem which was called a “challenge for the future” in Linea...
We continue our study of topological partial *algebras focusing our attention to some basic spectral...
AbstractWe prove theorems of Perron–Frobenius type for positive elements in partially ordered topolo...
Of the several generalizations to infinite dimensional spaces of the Perron-Frobenius theorem on mat...
algebras in 1951, it has been studied extensively. However, spectral continuity in the context of an...
AbstractIt has been shown by Förster and Nagy that the convergence of the Collatz-Wielandt numbers t...
AbstractWe generalize the Birkhoff-Varga, Wielandt, and Donsker-Varadhan characterizations of the sp...
summary:Let $f$ be a non-zero positive vector of a Banach lattice $L$, and let $T$ be a positive lin...
AbstractThe theory of positive (=nonnegative) finite square matrices continues, three quarters of a ...
AbstractThe classical theorems of O. Perron and G. Frobenius about spectral properties of matrices w...
AbstractFor nonnegative matrices A, the well known Perron–Frobenius theory studies the spectral radi...
AbstractLet T be a nonnegative linear continuous operator in a partially ordered Banach space E, and...
Abstract. The classical Perron-Frobenius theory asserts that an irreducible ma-trix A has cyclic per...
summary:The purpose of this article is to give some estimates for the spectral radius of the polynom...
Strict monotonicity of the spectral radii of bounded, positive, ordered linear operators is investig...
AbstractThe paper attempts to solve a problem which was called a “challenge for the future” in Linea...
We continue our study of topological partial *algebras focusing our attention to some basic spectral...
AbstractWe prove theorems of Perron–Frobenius type for positive elements in partially ordered topolo...
Of the several generalizations to infinite dimensional spaces of the Perron-Frobenius theorem on mat...
algebras in 1951, it has been studied extensively. However, spectral continuity in the context of an...
AbstractIt has been shown by Förster and Nagy that the convergence of the Collatz-Wielandt numbers t...
AbstractWe generalize the Birkhoff-Varga, Wielandt, and Donsker-Varadhan characterizations of the sp...
summary:Let $f$ be a non-zero positive vector of a Banach lattice $L$, and let $T$ be a positive lin...
AbstractThe theory of positive (=nonnegative) finite square matrices continues, three quarters of a ...
AbstractThe classical theorems of O. Perron and G. Frobenius about spectral properties of matrices w...
AbstractFor nonnegative matrices A, the well known Perron–Frobenius theory studies the spectral radi...
AbstractLet T be a nonnegative linear continuous operator in a partially ordered Banach space E, and...
Abstract. The classical Perron-Frobenius theory asserts that an irreducible ma-trix A has cyclic per...
summary:The purpose of this article is to give some estimates for the spectral radius of the polynom...
Strict monotonicity of the spectral radii of bounded, positive, ordered linear operators is investig...
AbstractThe paper attempts to solve a problem which was called a “challenge for the future” in Linea...
We continue our study of topological partial *algebras focusing our attention to some basic spectral...