AbstractLet K be a closed, pointed, full cone in Rn. In their treatment of Perron-Frobenius theory for a linear map A preserving K by Wielandt's approach, Barker and Schneider introduced four sets, namely, Ω, Ω1, Σ, and Σ1, the Collatz-Wielandt sets associated with A. We determine the greatest lower bound and the least upper bound of these sets. Some known results for a nonnegative matrix relating its spectral radius to its upper and lower Collatz-Wielandt number are extended to the setting of a cone-preserving map. Applications of our results to the nonnegativity of solutions of linear inequalities associated with a nonnegative matrix are also considered
AbstractFor nonnegative matrices A, the well known Perron–Frobenius theory studies the spectral radi...
AbstractFinite-dimensional theorems of Perron-Frobenius type are proved. For A∈Cnn and a nonnegative...
AbstractWe give an inequality for the spectral radius of positive linear combinations of tuples of n...
AbstractLet K be a closed, pointed, full cone in Rn. In their treatment of Perron-Frobenius theory f...
summary:In this paper we consider two versions of the Collatz-Wielandt quotient for a pair of nonneg...
AbstractLet K be a proper cone in Rn, let A be an n×n real matrix that satisfies AK⊆K, let b be a gi...
AbstractWe generalize many known results on a nonnegative matrix concerning linear inequalities, Col...
AbstractLet T be a nonnegative linear continuous operator in a partially ordered Banach space E, and...
[[abstract]]This is a review of a coherent body of knowledge, which perhaps deserves the name of the...
AbstractThis survey deals with the aspects of archimedian partially ordered finite-dimensional real ...
AbstractIt has been shown by Förster and Nagy that the convergence of the Collatz-Wielandt numbers t...
[[abstract]]A unified treatment is offered to reprove known results on the following four highlights...
AbstractIf X is a real n-dimensional space provided with a subnorm π, then the inequality ξ ⩾ π(x) d...
The Frobenius normal form of a matrix is an important tool in analyzing its properties. When a matri...
[[abstract]]This is the third of a sequence of papers in an attempt to study the Perron-Frobenius th...
AbstractFor nonnegative matrices A, the well known Perron–Frobenius theory studies the spectral radi...
AbstractFinite-dimensional theorems of Perron-Frobenius type are proved. For A∈Cnn and a nonnegative...
AbstractWe give an inequality for the spectral radius of positive linear combinations of tuples of n...
AbstractLet K be a closed, pointed, full cone in Rn. In their treatment of Perron-Frobenius theory f...
summary:In this paper we consider two versions of the Collatz-Wielandt quotient for a pair of nonneg...
AbstractLet K be a proper cone in Rn, let A be an n×n real matrix that satisfies AK⊆K, let b be a gi...
AbstractWe generalize many known results on a nonnegative matrix concerning linear inequalities, Col...
AbstractLet T be a nonnegative linear continuous operator in a partially ordered Banach space E, and...
[[abstract]]This is a review of a coherent body of knowledge, which perhaps deserves the name of the...
AbstractThis survey deals with the aspects of archimedian partially ordered finite-dimensional real ...
AbstractIt has been shown by Förster and Nagy that the convergence of the Collatz-Wielandt numbers t...
[[abstract]]A unified treatment is offered to reprove known results on the following four highlights...
AbstractIf X is a real n-dimensional space provided with a subnorm π, then the inequality ξ ⩾ π(x) d...
The Frobenius normal form of a matrix is an important tool in analyzing its properties. When a matri...
[[abstract]]This is the third of a sequence of papers in an attempt to study the Perron-Frobenius th...
AbstractFor nonnegative matrices A, the well known Perron–Frobenius theory studies the spectral radi...
AbstractFinite-dimensional theorems of Perron-Frobenius type are proved. For A∈Cnn and a nonnegative...
AbstractWe give an inequality for the spectral radius of positive linear combinations of tuples of n...