A non-existence result for vertex-girth-regular graphs
Abstract
A -regular graph of girth is called vertex-girth-regular if every vertex is contained in the same number of cycles of length . For integers and , we denote such a graph on vertices in which every vertex lies on exactly cycles of length by a -graph. It is well-known that any vertex-girth-regular graph satisfies . Graphs for which 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 and every integer , there does not exist a -graph. Previous non-existence results had already settled all odd girths at least and very recently also girth , leaving girth 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.
Keywords
Cite
@article{arxiv.2604.21486,
title = {A non-existence result for vertex-girth-regular graphs},
author = {Jorik Jooken and Denys Lohvynov},
journal= {arXiv preprint arXiv:2604.21486},
year = {2026}
}
Comments
13 pages, 2 figures