Nut graphs with a prescribed number of vertex and edge orbits

Abstract

A nut graph is a nontrivial graph whose adjacency matrix has a one-dimensional null space spanned by a vector without zero entries. Recently, it was shown that a nut graph has more edge orbits than vertex orbits. It was also shown that for any even r 2 and any k r + 1, there exist infinitely many nut graphs with r vertex orbits and k edge orbits. Here, we extend this result by finding all the pairs (r, k) for which there exists a nut graph with r vertex orbits and k edge orbits. In particular, we show that for any k 2, there are infinitely many Cayley nut graphs with k edge orbits and k arc orbits.

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