The least H-eigenvalue of adjacency tensor of hypergraphs with cut vertices

Abstract

Let G be a connected hypergraph with even uniformity, which contains cut vertices. Then G is the coalescence of two nontrivial connected sub-hypergraphs (called branches) at a cut vertex. Let A(G) be the adjacency tensor of G. The least H-eigenvalue of A(G) refers to the least real eigenvalue of A(G) associated with a real eigenvector. In this paper we obtain a perturbation result on the least H-eigenvalue of A(G) when a branch of G attached at one vertex is relocated to another vertex, and characterize the unique hypergraph whose least H-eigenvalue attains the minimum among all hypergraphs in a certain class of hypergraphs which contain a fixed connected hypergraph.