A generalization of Heffter arrays

Abstract

In this paper we define a new class of partially filled arrays, called relative Heffter arrays, that are a generalization of the Heffter arrays introduced by Archdeacon in 2015. Let v=2nk+t be a positive integer, where t divides 2nk, and let J be the subgroup of Zv of order t. A Ht(m,n; s,k) Heffter array over Zv relative to J is an m× n partially filled array with elements in Zv such that: (a) each row contains s filled cells and each column contains k filled cells; (b) for every x∈ Zv J, either x or -x appears in the array; (c) the elements in every row and column sum to 0. Here we study the existence of square integer (i.e. with entries chosen in \1,…, 2nk+t2 \ and where the sums are zero in Z) relative Heffter arrays for t=k, denoted by Hk(n;k). In particular, we prove that for 3≤ k≤ n, with k≠ 5, there exists an integer Hk(n;k) if and only if one of the following holds: (a) k is odd and n 0,3 4; (b) k 2 4 and n is even; (c) k 0 4. Also, we show how these arrays give rise to cyclic cycle decompositions of the complete multipartite graph.