It is easy to verify that if A is a doubly stochastic matrix, then both its normal equations AAT and ATA are also doubly stochastic, but the reciprocal is not true. In this paper, we introduce and analyze the complete class of nonnegative matrices whose normal equations are doubly stochastic. This class contains and extends the class of doubly stochastic matrices to the rectangular case. In particular, we characterize these matrices in terms of their row and column sums and provide results regarding their nonzero structure. We then consider the diagonal equivalence of any rectangular nonnegative matrix to a matrix of this new class, and we identify the properties for such a diagonal equivalence to exist. To this end, we present a scaling al...
The combined matrix of a nonsingular real matrix A is the Hadamard (entrywise) product A∘A-1T. It is...
AbstractLet y be majorized by x. We investigate the polytope of doubly stochastic matrices D for whi...
AbstractLet Kn be the convex set of n×n positive semidefinite doubly stochastic matrices. We show th...
It was previously shown by Sinkhorn that the sequence of matrices generated by alternately normalizi...
AbstractNew methods for scaling square, nonnegative matrices to doubly stochastic form are described...
AbstractWe consider a nonnegative irreducible matrix A in Perron-Frobenius-Wielandt normal form with...
In traditional years, fully indecomposable matrices have played an vital part in various research to...
AbstractA complex matrix is doubly quasistochastic if all its row sums and column sums are 1. Matric...
AbstractThe existence of even or odd diagonals in doubly stochastic matrices depends on the number o...
AbstractThis paper extends the notion of diagonal sums of a square matrix to “weighted diagonal sums...
The aim of this thesis is to investigate the diagonals of doubly stochastic matrices. More specifica...
AbstractWe generalize in various directions a result of Friedland and Karlin on a lower bound for th...
Doubly stochastic and generalized doubly stochastic matrices with prescribed zero patterns and the m...
AbstractFor square, semipositive matrices A (Ax>0 for some x>0), two (nonnegative) equilibrants e(A)...
AbstractMatrix scaling problems have been extensively studied since Sinkhorn established in 1964 the...
The combined matrix of a nonsingular real matrix A is the Hadamard (entrywise) product A∘A-1T. It is...
AbstractLet y be majorized by x. We investigate the polytope of doubly stochastic matrices D for whi...
AbstractLet Kn be the convex set of n×n positive semidefinite doubly stochastic matrices. We show th...
It was previously shown by Sinkhorn that the sequence of matrices generated by alternately normalizi...
AbstractNew methods for scaling square, nonnegative matrices to doubly stochastic form are described...
AbstractWe consider a nonnegative irreducible matrix A in Perron-Frobenius-Wielandt normal form with...
In traditional years, fully indecomposable matrices have played an vital part in various research to...
AbstractA complex matrix is doubly quasistochastic if all its row sums and column sums are 1. Matric...
AbstractThe existence of even or odd diagonals in doubly stochastic matrices depends on the number o...
AbstractThis paper extends the notion of diagonal sums of a square matrix to “weighted diagonal sums...
The aim of this thesis is to investigate the diagonals of doubly stochastic matrices. More specifica...
AbstractWe generalize in various directions a result of Friedland and Karlin on a lower bound for th...
Doubly stochastic and generalized doubly stochastic matrices with prescribed zero patterns and the m...
AbstractFor square, semipositive matrices A (Ax>0 for some x>0), two (nonnegative) equilibrants e(A)...
AbstractMatrix scaling problems have been extensively studied since Sinkhorn established in 1964 the...
The combined matrix of a nonsingular real matrix A is the Hadamard (entrywise) product A∘A-1T. It is...
AbstractLet y be majorized by x. We investigate the polytope of doubly stochastic matrices D for whi...
AbstractLet Kn be the convex set of n×n positive semidefinite doubly stochastic matrices. We show th...