On 12-regular nut graphs

Abstract

A nut graph is a simple graph whose adjacency matrix is singular with 1-dimensional kernel such that the corresponding eigenvector has no zero entries. In 2020, Fowler et al. characterised for each d ∈ \3,4,…,11\ all values n such that there exists a d-regular nut graph of order n. In the present paper, we determine all values n for which a 12-regular nut graph of order n exists. We also present a result by which there are infinitely many circulant nut graphs of degree d 0 4 and no circulant nut graph of degree d 2 4.