No involutions in the missing Moore graph
Combinatorics
2026-06-28 v1
Abstract
The Moore graph of degree , if one exists, is the remaining open case of the Hoffman-Singleton classification in diameter two. Although its existence remains open, substantial restrictions on the automorphism group of such a graph are known. In this paper we prove that a Moore graph of degree has no involutory automorphisms. The proof combines the known fixed-point structure of an involution with a module-theoretic obstruction. More precisely, we consider the vertex module over the ring of 2-adic integers and the direct summand given by the image of the spectral idempotent for the eigenvalue . Comparing the ordinary trace of the involution on this summand with the dimension of its Brauer quotient gives a contradiction.
Cite
@article{arxiv.2606.29183,
title = {No involutions in the missing Moore graph},
author = {Yawara Ishida},
journal= {arXiv preprint arXiv:2606.29183},
year = {2026}
}