On the nullity of connected graphs with least eigenvalue at least \(-2\) (Q6486688)

Let \(\mathcal L\) and \(\mathcal L^+\) be the set of connected graphs with least eigenvalue at least \(-2\) and larger than \(-2\), respectively. The nullity of a graph \(G\) is the multiplicity of zero as an eigenvalue of \(G\). Here, the nullity set of \(\mathcal L^+\) and an upper bound on the nullity of exceptional graphs are given. In particular, an expression for the nullity of generalized line graphs is also given.