Homometric sets in trees

Abstract

Let G = (V,E) denote a simple graph with the vertex set V and the edge set E. The profile of a vertex set V'⊂eq V denotes the multiset of pairwise distances between the vertices of V'. Two disjoint subsets of V are homometric, if their profiles are the same. If G is a tree on n vertices we prove that its vertex sets contains a pair of disjoint homometric subsets of size at least n/2 - 1. Previously it was known that such a pair of size at least roughly n1/3 exists. We get a better result in case of haircomb trees, in which we are able to find a pair of disjoint homometric sets of size at least cn2/3 for a constant c > 0.