Set Reconstruction on the Hypercube

Abstract

Given an action of a group G on a set S, the k-deck of a subset T of S is the multiset of all subsets of T of size k, each given up to translation by G. For a given subset T, the reconstruction number of T is the minimum k such that the k-deck uniquely identifies T up to translation by G, and the reconstruction number of the action G:S is the maximum reconstruction number of any subset of S. The concept of reconstruction number extends naturally to multisubsets T of S and in~CPC:257539, the author calculated the multiset-reconstruction number of all finite abelian groups. In particular, it was shown that the multiset-reconstruction number of Z2n was n+1. This provides an upper bound of n+1 to the reconstruction number of Z2n. The author also showed a lower bound of n+12 in the same paper. The purpose of this note is to close the gap. The reconstruction number of Z2n is n+1-2(n+1-2(n)).