Abstract
SynopsisLet Γ be a graph with n points, and let G be the group of automorphisms of Γ. An orbit of G on which G acts as an elementary abelian 2-group is said to be exceptional. It is shown that the number of simple eigenvalues of Γ is at most (5n+4t)/9, where t is the number of points of Γ lying in exceptional orbits of G.
Publisher
Cambridge University Press (CUP)
Cited by
1 articles.
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1. Simple Eigenvalues of Intransitive Graphs;Bulletin of the London Mathematical Society;1984-03