Abstract
ABSTRACTLet R and S be two vectors of real numbers whose entries have the same sum. In the transportation problems, one wishes to find a matrix A with row sum vector R and column sum vector S. If, in addition, the two vectors only contain nonnegative integers then one wants the same to be true for A. This can always be done and the transportation algorithm gives a method for explicitly calculating A. We can restrict things even further and insist that A have only entries zero and one. In this case, the Gale-Ryser Theorem gives necessary and sufficient conditions for A to exist and this result can be proved constructively. One can let the dihedral group of the square act on matrices. Then a subgroup of defines a set of matrices invariant under the subgroup. So one can consider analogues of the transportation and (0, 1) problems for these sets of matrices. For every subgroup, we give conditions equivalent to the existence of the desired type of matrix.
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