A new representation of mutually orthogonal frequency squares

Abstract

Mutually orthogonal frequency squares (MOFS) of type F(mλ;λ) generalize the structure of mutually orthogonal Latin squares: rather than each of m symbols appearing exactly once in each row and in each column of each square, the repetition number is λ 1. A classical upper bound for the number of such MOFS is (mλ-1)2m-1. We introduce a new representation of MOFS of type F(mλ;λ), as a linear combination of \0,1\ arrays. We use this representation to give an elementary proof of the classical upper bound, together with a structural constraint on a set of MOFS achieving the upper bound. We then use this representation to establish a maximality criterion for a set of MOFS of type F(mλ;λ) when m is even and λ is odd, which simplifies and extends a previous analysis [T. Britz, N.J. Cavenagh, A. Mammoliti, I.M. Wanless, Mutually orthogonal binary frequency squares, Electron. J. Combin., 27(#P3.7), 2020, 26 pages] of the case when m=2 and λ is odd.