On cubic polycirculant nut graphs
Abstract
A nut graph is a nontrivial simple graph whose adjacency matrix contains a one-dimensional null space spanned by a vector without zero entries. Moreover, an -circulant graph is a graph that admits a cyclic group of automorphisms having vertex orbits of equal size. It is not difficult to observe that there exists no cubic 1-circulant nut graph or cubic 2-circulant nut graph, while the full classification of all the cubic 3-circulant nut graphs was recently obtained [Electron. J. Comb. 31(2) (2024), #2.31]. Here, we investigate the existence of cubic -circulant nut graphs for 4 and show that there is no cubic 4-circulant nut graph or cubic 5-circulant nut graph by using a computer-assisted proof. Furthermore, we rely on a construction based approach in order to demonstrate that there exist infinitely many cubic -circulant nut graphs for any fixed ∈ \6, 7 \ or 9.
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