Complex Hadamard matrices with noncommutative entries
Abstract
We axiomatize and study the matrices of type H∈ MN(A), having unitary entries, Hij∈ U(A), and whose rows and columns are subject to orthogonality type conditions. Here A can be any C*-algebra, for instance A= C, where we obtain the usual complex Hadamard matrices, or A=C(X), where we obtain the continuous families of complex Hadamard matrices. Our formalism allows the construction of a quantum permutation group G⊂ SN+, whose structure and computation is discussed here.
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