AbstractGeneralizations of M-matrices are studied, including the new class of GM-matrices. The matrices studied are of the form sI-B with B having the Perron–Frobenius property, but not necessarily being nonnegative. Results for these classes of matrices are shown, which are analogous to those known for M-matrices. Also, various splittings of a GM-matrix are studied along with conditions for their convergence
AbstractAn M-matrix as defined by Ostrowski is a matrix that can be split into A = sI − B, s > 0, B ...
AbstractRecently, Marti´nez, Michon, and San Marti´n introduced the new class of (symmetric)strictly...
AbstractThe result of principal interest established in this paper is that if A is an n × n singular...
AbstractGeneralizations of M-matrices are studied, including the new class of GM-matrices. The matri...
AbstractThe concepts of matrix monotonicity, generalized inverse-positivity and splittings are inves...
A class of matrices that simultaneously generalizes the M-matrices and the inverse M-matrices is bro...
AbstractThis is an attempt at a comprehensive expository study of those nonnegative matrices which h...
AbstractWe provide new necessary and sufficient conditions for verifying (strictly) generalized diag...
AbstractWe provide new necessary and sufficient conditions for identifying generalized diagonally do...
AbstractSeveral characterizations of the class of M-matrices as a subclass of the class of Z-matrice...
In this article, generalizations of certain $M$-matrix properties are proved for the group generaliz...
AbstractThe purpose of this survey is to classify systematically a widely ranging list of characteri...
AbstractIn this paper we establish relationships between several classes of well-known matrices and ...
AbstractLet P be an n × n nonnegative, irreducible, and stochastic matrix, and consider the associat...
This work presents the study of some properties of nonnegative matrices, spectral and structural pro...
AbstractAn M-matrix as defined by Ostrowski is a matrix that can be split into A = sI − B, s > 0, B ...
AbstractRecently, Marti´nez, Michon, and San Marti´n introduced the new class of (symmetric)strictly...
AbstractThe result of principal interest established in this paper is that if A is an n × n singular...
AbstractGeneralizations of M-matrices are studied, including the new class of GM-matrices. The matri...
AbstractThe concepts of matrix monotonicity, generalized inverse-positivity and splittings are inves...
A class of matrices that simultaneously generalizes the M-matrices and the inverse M-matrices is bro...
AbstractThis is an attempt at a comprehensive expository study of those nonnegative matrices which h...
AbstractWe provide new necessary and sufficient conditions for verifying (strictly) generalized diag...
AbstractWe provide new necessary and sufficient conditions for identifying generalized diagonally do...
AbstractSeveral characterizations of the class of M-matrices as a subclass of the class of Z-matrice...
In this article, generalizations of certain $M$-matrix properties are proved for the group generaliz...
AbstractThe purpose of this survey is to classify systematically a widely ranging list of characteri...
AbstractIn this paper we establish relationships between several classes of well-known matrices and ...
AbstractLet P be an n × n nonnegative, irreducible, and stochastic matrix, and consider the associat...
This work presents the study of some properties of nonnegative matrices, spectral and structural pro...
AbstractAn M-matrix as defined by Ostrowski is a matrix that can be split into A = sI − B, s > 0, B ...
AbstractRecently, Marti´nez, Michon, and San Marti´n introduced the new class of (symmetric)strictly...
AbstractThe result of principal interest established in this paper is that if A is an n × n singular...