AbstractNonnegative mth roots of nonnegative 0-symmetric idempotent matrices have been characterized. As an application, a characterization of nonnegative matrices A whose Moore-Penrose generalized inverse A† is some power of A is obtained, thus yielding some well-known theorems
AbstractA nonnegative matrix is called regular if it admits a nonnegative generalized inverse. The s...
Nonnegativity of the Moore-Penrose inverse of a perturbation of the form is considered when . Using...
AbstractIn this note we characterize nonnegative matrices A for which AT = p(A), where p(A) is a pol...
AbstractNonnegative mth roots of nonnegative 0-symmetric idempotent matrices have been characterized...
AbstractWe study the nonnegativity of the Moore-Penrose inverse of the powers as well as the product...
AbstractNonnegative matrices which are equal to their Moore-Penrose generalized inverse are characte...
Abstract. Let A be a nonnegative idempotent matrix. We show that the Schur complement of a submatrix...
Thesis (Ph.D.), Department of Mathematics, Washington State UniversityEventually nonnegative matrice...
AbstractNonnegative matrices with the property that the group inverse of the matrixis equal to a pow...
AbstractNonnegative matrices which are equal to their Moore-Penrose generalized inverse are characte...
Power nonnegative matrices are defined as complex matrices having at least one nonnegative integer p...
Power nonnegative matrices are defined as complex matrices having at least one nonnegative integer p...
Power nonnegative matrices are defined as complex matrices having at least one nonnegative integer p...
A nonnegative matrix is called regular if it admits a nonnegative generalized inverse. The structure...
AbstractSuppose M is a real square matrix such that off-diagonal elements of M are nonpositive and a...
AbstractA nonnegative matrix is called regular if it admits a nonnegative generalized inverse. The s...
Nonnegativity of the Moore-Penrose inverse of a perturbation of the form is considered when . Using...
AbstractIn this note we characterize nonnegative matrices A for which AT = p(A), where p(A) is a pol...
AbstractNonnegative mth roots of nonnegative 0-symmetric idempotent matrices have been characterized...
AbstractWe study the nonnegativity of the Moore-Penrose inverse of the powers as well as the product...
AbstractNonnegative matrices which are equal to their Moore-Penrose generalized inverse are characte...
Abstract. Let A be a nonnegative idempotent matrix. We show that the Schur complement of a submatrix...
Thesis (Ph.D.), Department of Mathematics, Washington State UniversityEventually nonnegative matrice...
AbstractNonnegative matrices with the property that the group inverse of the matrixis equal to a pow...
AbstractNonnegative matrices which are equal to their Moore-Penrose generalized inverse are characte...
Power nonnegative matrices are defined as complex matrices having at least one nonnegative integer p...
Power nonnegative matrices are defined as complex matrices having at least one nonnegative integer p...
Power nonnegative matrices are defined as complex matrices having at least one nonnegative integer p...
A nonnegative matrix is called regular if it admits a nonnegative generalized inverse. The structure...
AbstractSuppose M is a real square matrix such that off-diagonal elements of M are nonpositive and a...
AbstractA nonnegative matrix is called regular if it admits a nonnegative generalized inverse. The s...
Nonnegativity of the Moore-Penrose inverse of a perturbation of the form is considered when . Using...
AbstractIn this note we characterize nonnegative matrices A for which AT = p(A), where p(A) is a pol...
DOI
Add to ORKG