An Efficient Structural Descriptor Sequence to Identify Graph Isomorphism and Graph Automorphism

Abstract

In this paper, we study the graph isomorphism and graph automorphism problems. We propose a novel technique to analyze graph isomorphism and graph automorphism. Further we handled some strongly regular datasets for prove the efficiency of our technique. The neighbourhood matrix NM(G) was proposed in ALPaper as a novel representation of graphs and was defined using the neighbourhood sets of the vertices. It was also shown that the matrix exhibits a bijection between the product of two well known graph matrices, namely the adjacency matrix and the Laplacian matrix. Further, in a recent workNMSPath, we introduced the sequence of matrices representing the powers of NM(G) and denoted it as NM\l\, 1≤ l ≤ k(G) where k(G) is called the iteration number, k(G)=*2diameter(G) . In this article we introduce a structural descriptor given by a sequence and clique sequence for any undirected unweighted simple graphs with help of the sequences of matrices NM\l\ . The ith element of structural descriptor sequence encodes the complete structural information of the graph from the vertex i∈ V(G) . The ith element of clique sequence encodes the Maximal cliques on i vertices. The above sequences is shown to be a graph invariants and is used to study the graph isomorphism and automorphism problem.