A non-existence result for vertex-girth-regular graphs

TL;DR

This paper proves the non-existence of certain highly structured vertex-girth-regular graphs with girth 5, completing the classification for odd girths and advancing understanding of graph regularity constraints.

Contribution

It establishes the non-existence of vertex-girth-regular graphs with girth 5 near the maximum cycle count per vertex, filling the last gap in odd girth cases.

Findings

No such graphs exist for girth 5 with parameters close to the maximum cycle count.

Completes the classification for odd girths in vertex-girth-regular graphs.

Advances understanding of structural limitations in regular graphs with prescribed girth.

Abstract

A $k$-regular graph of girth $g$ is called vertex-girth-regular if every vertex is contained in the same number of cycles of length $g$. For integers $n, k, g$ and $\lambda$, we denote such a graph on $n$ vertices in which every vertex lies on exactly $\lambda$ cycles of length $g$ by a $\text{vgr}(n,k,g,\lambda)$-graph. It is well-known that any vertex-girth-regular graph satisfies $\lambda \le \frac{k(k-1)^{\left\lfloor \frac{g}{2} \right\rfloor}}{2}$. Graphs for which $\lambda$ is close to this bound are of particular interest in connection with the cage problem, since requiring many girth cycles through every vertex is a natural way to isolate highly structured candidates for small regular graphs of prescribed girth. In this paper, we prove that for every $k\ge 3$ and every integer $0< \varepsilon \leq \frac{k-1}{2}$, there does not exist a $\text{vgr}(n,k,5,\frac{k(k-1)^2}{2}-\varepsilon)$-graph. Previous non-existence results had already settled all odd girths at least $7$ and very recently also girth $3$, leaving girth $5$ as the only girth for which no non-trivial non-existence result was known. Thus, our result resolves the final remaining case and completes the picture for odd girths.