The stabilizing index and cyclic index of coalescence and Cartesian product of uniform hypergraphs

Abstract

Let G be connected uniform hypergraph and let A(G) be the adjacency tensor of G. The stabilizing index of G is the number of eigenvectors of A(G) associated with the spectral radius, and the cyclic index of G is the number of eigenvalues of A(G) with modulus equal to the spectral radius. Let G1 G2 and G1 G2 be the coalescence and Cartesian product of connected m-uniform hypergraphs G1 and G2 respectively. In this paper, we give explicit formulas for the the stabilizing indices and cyclic indices of G1 G2 and G1 G2 in terms of those of G1 and G2 or the invariant divisors of their incidence matrices over Zm, respectively.