Quantum Latin squares with all possible cardinalities

Abstract

A quantum Latin square of order n (denoted as QLS(n)) is an n× n array whose entries are unit column vectors from the n-dimensional Hilbert space Hn, such that each row and column forms an orthonormal basis. Two unit vectors |u, |v∈ Hn are regarded as identical if there exists a real number θ such that |u=eiθ|v; otherwise, they are considered distinct. The cardinality c of a QLS(n) is the number of distinct vectors in the array. In this paper, we use sub-QLS(4)s to prove that for any integer m≥ 2 and any integer c∈ [4m,16m2] \4m+1\, there is a QLS(4m) with cardinality c.