Completely Positive formulation of the Graph Isomorphism Problem

Abstract

Given two graphs G1 and G2 on n vertices each, we define a graph G on vertex set V1× V2 and the edge set as the union of edges of G1× G2, G1× G2, \(v,u'),(v,u"))(|u',u"∈ V2\ for each v∈ V1, and \((u',v),(u",v))|u',u"∈ V1\ for each v∈ V2. We consider the completely-positive Lov\'asz function, i.e., cp function for G. We show that the function evaluates to n whenever G1 and G2 are isomorphic and to less than n-1/(4n4) when non-isomorphic. Hence this function provides a test for graph isomorphism. We also provide some geometric insight into the feasible region of the completely positive program.