The quantum algebra of partial Hadamard matrices
Abstract
A partial Hadamard matrix is a matrix H∈ MM× N( T) whose rows are pairwise orthogonal. We associate to each such H a certain quantum semigroup G of quantum partial permutations of \1,...,M\ and study the correspondence H G. We discuss as well the relation between the completion problems for a given partial Hadamard matrix and completion problems for the associated submagic matrix P∈ MM(MN( C)), in both cases introducing certain criteria for the existence of the suitable completions.
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