AbstractThe purpose of this work is to extend some of the results of Perron and Frobenius to the following generalized eigenvalue problems: Ax = λBx and A′y = λB'y, where A and B are m × n real matrices and the prime denotes the transpose
This paper aims to consider the extended Perron complements for the collection of M-matrices. We fir...
AbstractWe extend the theory of nonnegative matrices to the matrices that have some negative entries...
The saddle point matrices arising from many scientific computing fields have block structure $ W= \l...
AbstractThe purpose of this work is to extend some of the results of Perron and Frobenius to the fol...
AbstractTwo different generalizations of the Perron—Frobenius theory to the matrix pencil Ax = λBx a...
AbstractThe paper attempts to solve a problem which was called a “challenge for the future” in Linea...
AbstractWe present a new extension of the well-known Perron–Frobenius theorem to regular matrix pair...
AbstractWe extend here the Perron–Frobenius theory of nonnegative matrices to certain complex matric...
AbstractSpectral bounds are obtained for a type of Z-matrix using Perron-Frobenius theory on the inv...
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...
AbstractLet A ϵ Mn. In terms of Perron roots and Perron vectors of two positive (or irreducible nonn...
Lecture I. I’ll give a complete elementary presentation of the essential features of the Perron Frob...
AbstractThe Perron-Frobenius theory for square, irreducible, nonnegative matrices is generalized by ...
AbstractThe purpose of this paper is to present a unified Perron–Frobenius Theory for nonnegative, f...
This paper aims to consider the extended Perron complements for the collection of M-matrices. We fir...
AbstractWe extend the theory of nonnegative matrices to the matrices that have some negative entries...
The saddle point matrices arising from many scientific computing fields have block structure $ W= \l...
AbstractThe purpose of this work is to extend some of the results of Perron and Frobenius to the fol...
AbstractTwo different generalizations of the Perron—Frobenius theory to the matrix pencil Ax = λBx a...
AbstractThe paper attempts to solve a problem which was called a “challenge for the future” in Linea...
AbstractWe present a new extension of the well-known Perron–Frobenius theorem to regular matrix pair...
AbstractWe extend here the Perron–Frobenius theory of nonnegative matrices to certain complex matric...
AbstractSpectral bounds are obtained for a type of Z-matrix using Perron-Frobenius theory on the inv...
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...
AbstractLet A ϵ Mn. In terms of Perron roots and Perron vectors of two positive (or irreducible nonn...
Lecture I. I’ll give a complete elementary presentation of the essential features of the Perron Frob...
AbstractThe Perron-Frobenius theory for square, irreducible, nonnegative matrices is generalized by ...
AbstractThe purpose of this paper is to present a unified Perron–Frobenius Theory for nonnegative, f...
This paper aims to consider the extended Perron complements for the collection of M-matrices. We fir...
AbstractWe extend the theory of nonnegative matrices to the matrices that have some negative entries...
The saddle point matrices arising from many scientific computing fields have block structure $ W= \l...