High-ordered spectral characterizations of graphs

Abstract

The spectrum of the k-power hypergraph of a graph G is called the k-ordered spectrum of G.If graphs G1 and G2 have same k-ordered spectrum for all positive integer k≥2, G1 and G2 are said to be high-ordered cospectral. If all graphs who are high-ordered cospectral with the graph G are isomorphic to G, we say that G is determined by the high-ordered spectrum.In this paper, we use the high-ordered spectrum of graphs to study graph isomorphism and show that all Smith's graphs are determined by the high-ordered spectrum.And we give infinitely many pairs of trees with same spectrum but different high-ordered spectrum by high-ordered cospectral invariants of trees,it means that we can determine that these cospectral trees are not isomorphism by the high-ordered spectrum.