Elsner L, Friedland S. Singular values, doubly stochastic matrices, and applications. Linear Algebra and its Applications. 1995;220:161-169.The Hadamard square of any square matrix A is bounded above and below by some doubly stochastic matrices times the square of the largest and the smallest singular values of A. Applications to graphs, permanents, and eigenvalue perturbations are discussed
AbstractThis paper presents results about positive definite doubly stochastic matrices, in particula...
AbstractWe characterize those doubly stochastic, primitive matrices for which the bounds for the exp...
It was previously shown by Sinkhorn that the sequence of matrices generated by alternately normalizi...
AbstractThe Hadamard square of any square matrix A is bounded above and below by some doubly stochas...
AbstractThe Hadamard square of any square matrix A is bounded above and below by some doubly stochas...
We pose some problems on the Hadamard product and singular values of matrices.MathematicsSCI(E)3ARTI...
AbstractIn this paper, we obtain sharp upper and lower bounds for the smallest entries of doubly sto...
This is an Author's Accepted Manuscript of an article published in Linear and Multilinear Algebra Vo...
AbstractA sharp lower bound for the smallest entries, among those corresponding to edges, of doubly ...
AbstractFor positive integers r, n with n⩾r+1, letDr,n=OrJJIn,where Js denote the matrices of 1s of ...
AbstractA conjecture on the permanents of doubly stochastic matrices is proposed. Some results suppo...
Abstract1. Basic properties of majorization. 2. Isotone maps and algebraic operations. 3. Double sub...
AbstractLet y be majorized by x. We investigate the polytope of doubly stochastic matrices D for whi...
International audienceThis paper considers the eigenvectors involved in rank one perturbations of sy...
AbstractIn this note, we present a useful theorem concerning the spectral properties of doubly stoch...
AbstractThis paper presents results about positive definite doubly stochastic matrices, in particula...
AbstractWe characterize those doubly stochastic, primitive matrices for which the bounds for the exp...
It was previously shown by Sinkhorn that the sequence of matrices generated by alternately normalizi...
AbstractThe Hadamard square of any square matrix A is bounded above and below by some doubly stochas...
AbstractThe Hadamard square of any square matrix A is bounded above and below by some doubly stochas...
We pose some problems on the Hadamard product and singular values of matrices.MathematicsSCI(E)3ARTI...
AbstractIn this paper, we obtain sharp upper and lower bounds for the smallest entries of doubly sto...
This is an Author's Accepted Manuscript of an article published in Linear and Multilinear Algebra Vo...
AbstractA sharp lower bound for the smallest entries, among those corresponding to edges, of doubly ...
AbstractFor positive integers r, n with n⩾r+1, letDr,n=OrJJIn,where Js denote the matrices of 1s of ...
AbstractA conjecture on the permanents of doubly stochastic matrices is proposed. Some results suppo...
Abstract1. Basic properties of majorization. 2. Isotone maps and algebraic operations. 3. Double sub...
AbstractLet y be majorized by x. We investigate the polytope of doubly stochastic matrices D for whi...
International audienceThis paper considers the eigenvectors involved in rank one perturbations of sy...
AbstractIn this note, we present a useful theorem concerning the spectral properties of doubly stoch...
AbstractThis paper presents results about positive definite doubly stochastic matrices, in particula...
AbstractWe characterize those doubly stochastic, primitive matrices for which the bounds for the exp...
It was previously shown by Sinkhorn that the sequence of matrices generated by alternately normalizi...
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