Mutually orthogonal binary frequency squares

Abstract

A frequency square is a matrix in which each row and column is a permutation of the same multiset of symbols. We consider only binary frequency squares of order n with n/2 zeroes and n/2 ones in each row and column. Two such frequency squares are orthogonal if, when superimposed, each of the 4 possible ordered pairs of entries occurs equally often. In this context we say that a k-MOFS(n) is a set of k binary frequency squares of order n in which each pair of squares is orthogonal. A k-MOFS(n) must satisfy k(n-1)2, and any MOFS achieving this bound are said to be complete. For any n for which there exists a Hadamard matrix of order n we show that there exists at least 2n2/4-O(n n) isomorphism classes of complete MOFS(n). For 2<n24 we show that there exists a 17-MOFS(n) but no complete MOFS(n). A k-maxMOFS(n) is a k-MOFS(n) that is not contained in any (k+1)-MOFS(n). By computer enumeration, we establish that there exists a k-maxMOFS(6) if and only if k∈\1,17\ or 5 k 15. We show that up to isomorphism there is a unique 1-maxMOFS(n) if n24, whereas no 1-maxMOFS(n) exists for n04. We also prove that there exists a 5-maxMOFS(n) for each order n 24 where n≥ 6.