The Largest Eigenvalue and Bi-Average Degree of a Graph

Abstract

We show that for a graph G with the vertex set V and the largest eigenvalue λ(G), letting M(G) := X,Y ⊂ V e(X,Y)|X||Y| (where e(X,Y) denotes the number of edges between X and Y), we have M(G) λ(G) (14 |V| + 1 ) (G). Here the lower bound is attained if G is regular or bi-regular, whereas the logarithmic factor in the upper bound, conjecturally, can be improved --- although we present an example showing that it cannot be replaced with a factor growing slower than ( |V|/|V|)1/8. Further refinements are established, particularly in the case where G is bipartite.