A coding problem for pairs of subsets

Abstract

Let X be an n--element finite set, 0<k≤ n/2 an integer. Suppose that \A1,A2\ and \B1,B2\ are pairs of disjoint k-element subsets of X (that is, |A1|=|A2|=|B1|=|B2|=k, A1 A2=, B1 B2=). Define the distance of these pairs by d(\A1,A2\ ,\B1,B2\)= \|A1-B1|+|A2-B2|, |A1-B2|+|A2-B1|\ . This is the minimum number of elements of A1 A2 one has to move to obtain the other pair \B1,B2\. Let C(n,k,d) be the maximum size of a family of pairs of disjoint subsets, such that the distance of any two pairs is at least d. Here we establish a conjecture of Brightwell and Katona concerning an asymptotic formula for C(n,k,d) for k,d are fixed and n ∞. Also, we find the exact value of C(n,k,d) in an infinite number of cases, by using special difference sets of integers. Finally, the questions discussed above are put into a more general context and a number of coding theory type problems are proposed.