A note on Cayley nut graphs whose degree is divisible by four

Abstract

A nut graph is a non-trivial simple graph such that its adjacency matrix has a one-dimensional null space spanned by a full vector. It was recently shown by the authors that there exists a d-regular circulant nut graph of order n if and only if 4 d, \, 2 n, \, d > 0, together with n d + 4 if d 8 4 and n d + 6 if 8 d, as well as (n, d) ≠ (16, 8) [arXiv:2212.03026, 2022]. In this paper, we demonstrate the existence of a d-regular Cayley nut graph of order n for each 4 d, \, d > 0 and 2 n, \, n d + 4, thereby resolving the existence problem for Cayley nut graphs and vertex-transitive nut graphs whose degree is divisible by four.