Spectral bipartite Turan problems on linear hypergraphs

Abstract

Let F be a graph, and let Br(F) be the class of r-uniform Berge-F hypergraphs. In this paper, we establish a relationship between the spectral radius of the adjacency tensor of a uniform hypergraph and its local structure through walks. Based on the relationship, we give a spectral asymptotic bound for Br(C3)-free linear r-uniform hypergraphs and upper bounds for the spectral radii of Br(K2,t)-free or \Br(Ks,t),Br(C3)\-free linear r-uniform hypergraphs, where C3 and Ks,t are respectively the triangle and the complete bipartite graph with one part having s vertices and the other part having t vertices. Our work implies an upper bound for the number of edges of \Br(Ks,t),Br(C3)\-free linear r-uniform hypergraphs and extends some of the existing research on (spectral) extremal problems of hypergraphs.