The cyclic index of adjacency tensor of generalized power hypergraphs

Abstract

Let G be a t-uniform hypergraph, and let c(G) denote the cyclic index of the adjacency tensor of G. Let m,s,t be positive integers such that t 2, s 2 and m=st. The generalized power Gm,s of G is obtained from G by blowing up each vertex into an s-set and preserving the adjacency relation. It was conjectured that c(Gm,s)=s · c(G). In this paper we show that the conjecture is false by giving a counterexample, and give some sufficient conditions for the conjecture holding. Finally we give an equivalent characterization of the equality in the conjecture by using a matrix equation over Zm.