Cubic graphs with no eigenvalues in the interval (-1,1)
Abstract
We give a complete characterisation of the cubic graphs with no eigenvalues in the open interval (-1,1). There are two infinite families, one due to Guo and Mohar [Linear Algebra Appl. 449:68--75] the other due to Koll\'ar and Sarnak [Communications of the AMS. 1,1--38], and 14 "sporadic" graphs on at most 32 vertices. This allows us to show that (-1,1) is a maximal spectral gap set for cubic graphs. Our techniques including examination of various substructure and an application of the classification of generalized line graphs.
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