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The Birkhoff theorem for unitary matrices of prime-power dimension

Published 20 Dec 2018 in math-ph, math.MP, and quant-ph | (1812.08833v1)

Abstract: The unitary Birkhoff theorem states that any unitary matrix with all row sums and all column sums equal unity can be decomposed as a weighted sum of permutation matrices, such that both the sum of the weights and the sum of the squared moduli of the weights are equal to unity. If the dimension~$n$ of the unitary matrix equals a power of a prime $p$, i.e.\ if $n=pw$, then the Birkhoff decomposition does not need all $n!$ possible permutation matrices, as the epicirculant permutation matrices suffice. This group of permutation matrices is isomorphic to the general affine group GA($w,p$) of order only $pw(pw-1)(pw-p)...(pw-p{w-1}) \ll \left( pw \right)!$.

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