English

On low degree k-ordered graphs

Combinatorics 2007-05-23 v1

Abstract

A simple graph G is k-ordered (respectively, k-ordered hamiltonian) if, for any sequence of k distinct vertices v_1, ..., v_k of G, there exists a cycle (respectively, a hamiltonian cycle) in G containing these k vertices in the specified order. In 1997 Ng and Schultz introduced these concepts of cycle orderability, and motivated by the fact that k-orderedness of a graph implies (k-1)-connectivity, they posed the question of the existence of low degree k-ordered hamiltonian graphs. We construct an infinite family of graphs, which we call bracelet graphs, that are (k-1)-regular and are k-ordered hamiltonian for odd k. This result provides the best possible answer to the question of the existence of low degree k-ordered hamiltonian graphs for odd k. We further show that for even k, there exist no k-ordered bracelet graphs with minimum degree k-1 and maximum degree less than k+2, and we exhibit an infinite family of bracelet graphs with minimum degree k-1 and maximum degree k+2 that are k-ordered for even k. A concept related to k-orderedness, namely that of k-edge-orderedness, is likewise strongly related to connectivity properties. We study this relation in both undirected and directed graphs, and give bounds on the connectivity necessary to imply k-(edge-)orderedness properties.

Keywords

Cite

@article{arxiv.math/0509411,
  title  = {On low degree k-ordered graphs},
  author = {Karola Meszaros},
  journal= {arXiv preprint arXiv:math/0509411},
  year   = {2007}
}

Comments

13 pages, 0 figures