Hypergraphs with Spectral Radius at most (r-1)![r]2+5

Abstract

In our previous paper, we classified all r-uniform hypergraphs with spectral radius at most (r-1)![r]4, which directly generalizes Smith's theorem for the graph case r=2. It is nature to ask the structures of the hypergraphs with spectral radius slightly beyond (r-1)![r]4. For r=2, the graphs with spectral radius at most 2+5 are classified by [ Brouwer-Neumaier, Linear Algebra Appl., 1989]. Here we consider the r-uniform hypergraphs H with spectral radius at most (r-1)![r]2+5. We show that H must have a quipus-structure, which is similar to the graphs with spectral radius at most 322 [ Woo-Neumaier, Graphs Combin., 2007].