On the cardinalities of quantum Latin squares

Abstract

A quantum Latin square of order v, QLS(v), is a v× v array in which each of entries is a unit column vector from the Hilbert space Cv, such that every row and column forms an orthonormal basis of Cv. The cardinality of a QLS(v) is the number of its vectors distinct up to a global phase, which is the crucial indicator for distinguishing between classical QLSs and non-classical QLSs. In this paper, we investigate the possible cardinalities of a QLS(v). As a result, we completely resolve the existence of a QLS(v) with maximal cardinality for any v≥ 4. Moreover, based on Wilson's construction and Direct Product construction, we establish some possible cardinality range of a QLS(v) for any v≥ 4.