Construction Techniques for Linear Realizations of Multisets with Small Support

Abstract

A Hamiltonian path in the complete graph Kv whose vertices are labeled with the integers 0,1,…,v-1 is a linear realization for the multiset L of the linear edge-lengths (given by |x-y| for the edge between vertices x and y) of the edges in the path. A linear realization is standard if an end-vertex is 0 and perfect if the end-vertices are 0 and v-1. Linear realizations are useful in the study of the Buratti-Horak-Rosa (BHR) Conjecture on the existence of cyclic realizations (where cyclic edge-lengths are given by distance modulo v) for given multisets. In this paper, we focus on multisets of the form \1a, (y-k)b, yc\. Using core perfect linear realizations for supports of size 2 (which have the forms \xy-1,yx+1\ whenever (x,y)=1), we construct standard linear realizations (with a=k-1, b=j(y-k), c=jy) when k y or k ≤ 4. When k=2, these allow us to show that there is a linear realization whenever a ≥ y. This is in line with the known results for the case of k=1. We also supplement these results for k=1 by constructing linear realizations whenever b+c < y and a ≥ y - (b,c), from which the coprime version of the BHR Conjecture (requiring that v is coprime with each element of the multiset) follows for k=1 when y ≤ 16. Our methods show promise for constructing linear realizations for arbitrary k, in the direction of a resolution of the BHR Conjecture for supports of size 3.