A strengthening and a multipartite generalization of the Alon-Boppana-Serre Theorem

Abstract

The Alon-Boppana theorem confirms that for every ε>0 and every integer d3, there are only finitely many d-regular graphs whose second largest eigenvalue is at most 2d-1-ε. Serre gave a strengthening showing that a positive proportion of eigenvalues of any d-regular graph must be bigger than 2d-1-ε. We provide a multipartite version of this result. Our proofs are elementary and work also in the case when graphs are not regular. In the simplest, monopartite case, our result extends the Alon-Boppana-Serre result to non-regular graphs of minimum degree d and bounded maximum degree. The two-partite result shows that for every ε>0 and any positive integers d1,d2,d, every n-vertex graph of maximum degree at most d, whose vertex set is the union of (not necessarily disjoint) subsets V1,V2, such that every vertex in Vi has at least di neighbors in V3-i for i=1,2, has ε(n) eigenvalues that are larger than d1-1+d2-1-ε. Finally, we strengthen the Alon-Boppana-Serre theorem by showing that the lower bound 2d-1-ε can be replaced by 2d-1 + δ for some δ>0 if graphs have bounded "global girth". On the other side of the spectrum, if the odd girth is large, then we get an Alon-Boppana-Serre type theorem for the negative eigenvalues as well.