AbstractThe Perron-Frobenius theory for square, irreducible, nonnegative matrices is generalized by studying the structure of the algebraic eigenspace of an arbitrary square nonnegative matrix corresponding to its spectral radius. We give a constructive proof that this subspace is spanned by a set of semipositive vectors and give a combinatorial characterization of both the index of the spectral radius and dimension of the algebraic eigenspace corresponding to the spectral radius. This involves a detailed study of the standard block triangular representation of nonnegative matrices by giving special attention to those blocks on the diagonal having the same spectral radius as the original matrix. We also show that the algebraic eigenspace co...
AbstractLet A be a nonnegative square matrix, and let D be a diagonal matrix whose iith element is (...
AbstractLet P and E be two n × n complex matrices such that for sufficiently small positive ε, P + ε...
AbstractThe purpose of this work is to extend some of the results of Perron and Frobenius to the fol...
AbstractWe present extensions of the Perron-Frobenius theory for square irreducible nonnegative matr...
AbstractSpectral bounds are obtained for a type of Z-matrix using Perron-Frobenius theory on the inv...
AbstractThe theory of positive (=nonnegative) finite square matrices continues, three quarters of a ...
AbstractFor nonnegative matrices A, the well known Perron–Frobenius theory studies the spectral radi...
We study the combinatorial and algebraic properties of Nonnegative Matrices. Our results are divided...
AbstractThe paper attempts to solve a problem which was called a “challenge for the future” in Linea...
AbstractWe first derive the bound |det(λI − A)|⩽λk − λk0 (λ0⩽λ), where A is a k × k nonnegative real...
AbstractIn this paper we give a simple closed formula for a certain limit eigenvalue of a nonnegativ...
AbstractThis paper deals with the positive eigenvectors of nonnegative irreducible matrices which ar...
AbstractRothblum and, independently, Richman and Schneider have used a combination of graph-theoreti...
AbstractFinite-dimensional theorems of Perron-Frobenius type are proved. For A∈Cnn and a nonnegative...
AbstractLet P be a square, nonnegative matrix. A set of k classes of P is called a chain of length k...
AbstractLet A be a nonnegative square matrix, and let D be a diagonal matrix whose iith element is (...
AbstractLet P and E be two n × n complex matrices such that for sufficiently small positive ε, P + ε...
AbstractThe purpose of this work is to extend some of the results of Perron and Frobenius to the fol...
AbstractWe present extensions of the Perron-Frobenius theory for square irreducible nonnegative matr...
AbstractSpectral bounds are obtained for a type of Z-matrix using Perron-Frobenius theory on the inv...
AbstractThe theory of positive (=nonnegative) finite square matrices continues, three quarters of a ...
AbstractFor nonnegative matrices A, the well known Perron–Frobenius theory studies the spectral radi...
We study the combinatorial and algebraic properties of Nonnegative Matrices. Our results are divided...
AbstractThe paper attempts to solve a problem which was called a “challenge for the future” in Linea...
AbstractWe first derive the bound |det(λI − A)|⩽λk − λk0 (λ0⩽λ), where A is a k × k nonnegative real...
AbstractIn this paper we give a simple closed formula for a certain limit eigenvalue of a nonnegativ...
AbstractThis paper deals with the positive eigenvectors of nonnegative irreducible matrices which ar...
AbstractRothblum and, independently, Richman and Schneider have used a combination of graph-theoreti...
AbstractFinite-dimensional theorems of Perron-Frobenius type are proved. For A∈Cnn and a nonnegative...
AbstractLet P be a square, nonnegative matrix. A set of k classes of P is called a chain of length k...
AbstractLet A be a nonnegative square matrix, and let D be a diagonal matrix whose iith element is (...
AbstractLet P and E be two n × n complex matrices such that for sufficiently small positive ε, P + ε...
AbstractThe purpose of this work is to extend some of the results of Perron and Frobenius to the fol...