Convex Sets of Non-Negative Matrices
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In (8) M. V. Menon investigates the diagonal equivalence of a non-negative matrix A to one with prescribed row and column sums and shows that this equivalence holds provided there exists at least one non-negative matrix with these row and column sums and with zeros in exactly the same positions A has zeros. However, he leaves open the question of when such a matrix exists. W. B. Jurkat and H.J. Ryser in (7) study the convex set of all m × n non-negative matrices having given row and column sums.
[1] A. Horn. Doubly Stochastic Matrices and the Diagonal of a Rotation Matrix , 1954 .
[2] Claude Berge,et al. The Theory Of Graphs , 1962 .
[3] D. R. Fulkerson,et al. Flows in Networks. , 1964 .
[4] H. Ryser,et al. Term ranks and permanents of nonnegative matrices , 1967 .
[5] M. V. Menon. Matrix Links, An Extremization Problem, and the Reduction of a Non-Negative Matrix to One With Prescribed Row and Column Sums , 1968 .