Some results on the structure of multipoles in the study of snarks

TL;DR

This paper investigates the structure and properties of multipoles in cubic graphs, providing bounds, exact counts, and irreducibility results relevant to the study of snarks and graph colorings.

Contribution

It introduces new bounds and exact counts for color complete multipoles and proves irreducibility of certain multipoles, advancing understanding of their structure in snark research.

Findings

Lower and upper linear bounds on the minimum order of color complete multipoles.

Exact number of states for color complete multipoles.

Tree and cycle multipoles are irreducible.

Abstract

Multipoles are the pieces we obtain by cutting some edges of a cubic graph. As a result of the cut, a multipole $M$ has dangling edges with one free end, which we call semiedges. Then, every 3-edge-coloring of a multipole induces a coloring or state of its semiedges, which satisfies the Parity Lemma. Multipoles have been extensively used in the study of snarks, that is, cubic graphs which are not 3-edge-colorable. Some results on the states and structure of the so-called color complete and color closed multipoles are presented. In particular, we give lower and upper linear bounds on the minimum order of a color complete multipole, and compute its exact number of states. Given two multipoles $M_1$ and $M_2$ with the same number of semiedges, we say that $M_1$ is reducible to $M_2$ if the state set of $M_2$ is a non-empty subset of the state set of $M_1$ and $M_2$ has less vertices than $M_1$. The function $v(m)$ is defined as the maximum number of vertices of an irreducible multipole with $m$ semiedges. The exact values of $v(m)$ are only known for $m\le 5$. We prove that tree and cycle multipoles are irreducible and, as a byproduct, that $v(m)$ has a linear lower bound.