A Bound on the Spectral Radius of Hypergraphs with e Edges

Abstract

For r≥ 3, let fr [0,∞) [1,∞) be the unique analytic function such that fr(k r)=k-1 r-1 for any k≥ r-1. We prove that the spectral radius of an r-uniform hypergraph H with e edges is at most fr(e). The equality holds if and only if e=k r for some positive integer k and H is the union of a complete r-uniform hypergraph Kkr and some possible isolated vertices. This result generalizes the classical Stanley's theorem on graphs.