The Buratti-Horak-Rosa Conjecture Holds for Some Underlying Sets of Size Three

Abstract

The Buratti-Horak-Rosa Conjecture concerns the possible multisets of edge-labels of a Hamiltonian path in the complete graph with vertex labels 0, 1, …, v-1 under a particular induced edge-labeling. The conjecture has been shown to hold when the underlying set of the multiset has size at most~2, is a subset of \1,2,3,4\ or \1,2,3,5\, or is \1,2,6\, \1,2,8\ or \1,4,5\, as well as partial results for many other underlying sets. We use the method of growable realizations to show that the conjecture holds for each underlying set U = \ x,y,z \ when (U) ≤ 7 or when xyz ≤ 24, with the possible exception of U = \1,2,11\. We also show that for any even x the validity of the conjecture for the underlying set \ 1,2,x \ follows from the validity of the conjecture for finitely many multisets with this underlying set.