On balanced (Z4u× Z8v,\4,5\,1) difference packings

Abstract

Let K be a set of positive integers and let G be an additive group. A (G, K, 1) difference packing is a set of subsets of G with sizes from K whose list of differences covers every element of G at most once. It is balanced if the number of blocks of size k∈ K does not depend on k. In this paper, we determine a balanced (Z4u× Z8v,4,5,1) difference packing of the largest possible size whenever uv is odd. The corresponding optimal balanced (4u, 8v,\4,5\,1) optical orthogonal signature pattern codes are also obtained.