By Suhail Ahmad Rather and others

The negative solution to the famous problem of $36$ officers of Euler implies that there are no two orthogonal Latin squares of order six. We show that the problem has a solution, provided the officers are entangled, and construct orthogonal quantum Latin squares of this size. As a consequence, we... Show more

August 6, 2021

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Thirty-six entangled officers of Euler: Quantum solution to a classically impossible problem

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