Growable Realizations: a Powerful Approach to the Buratti-Horak-Rosa Conjecture

TL;DR

The paper introduces growable realizations to prove new cases of the Buratti-Horak-Rosa Conjecture, simplifying proofs and expanding known results for Hamiltonian paths with prescribed edge lengths in complete graphs.

Contribution

It presents a novel method called growable realizations, enabling simpler proofs and new solutions for the conjecture, including complete and partial results for specific underlying sets.

Findings

Complete solution for underlying sets in {1,4,5} and {1,2,3,4}

Partial result for sets of the form {1, x, 2x}

Simplified proofs and new instances of the conjecture

Abstract

Label the vertices of the complete graph $K_v$ with the integers $\{ 0, 1, \ldots, v-1 \}$ and define the length of the edge between $x$ and $y$ to be $\min( |x-y| , v - |x-y| )$. Let $L$ be a multiset of size $v-1$ with underlying set contained in $\{ 1, \ldots, \lfloor v/2 \rfloor \}$. The Buratti-Horak-Rosa Conjecture is that there is a Hamiltonian path in $K_v$ whose edge lengths are exactly $L$ if and only if for any divisor $d$ of $v$ the number of multiples of $d$ appearing in $L$ is at most $v-d$. We introduce "growable realizations," which enable us to prove many new instances of the conjecture and to reprove known results in a simpler way. As examples of the new method, we give a complete solution when the underlying set is contained in $\{ 1,4,5 \}$ or in $\{ 1,2,3,4 \}$ and a partial result when the underlying set has the form $\{ 1, x, 2x \}$. We believe that for any set $U$ of positive integers there is a finite set of growable realizations that implies the truth of the Buratti-Horak-Rosa Conjecture for all but finitely many multisets with underlying set $U$.