Combinatorial invariants for graph isomorphism problem

Graph Invariants and Graph Isomorphism

In graph theory, Graph Isomorphism is an important issue. Information in the database can be stored in the form of graph. Graph represents the structural information in an efficient way. Graph Isomorphism problem is to determine if there exists one to one correspondence between the structures of two graphs. Graph isomorphism problem arises in many fields such as chemistry, switching theory, inf...

Algebraic Combinatorics in Mathematical Chemistry

This paper deals with graph invariants and stabilization procedures. We consider colored graphs and their automorphisms and we discuss the isomorphism problem for such graphs. Various global and local isomorphism invariants are introduced. We study canonical numberings, invariant partitions, stable and equitable partitions and algorithms for stabilizing partitions.

New Invariants for the Graph Isomorphism Problem

In this paper we introduce a novel polynomial-time algorithm to compute graph invariants based on the modified random walk idea on graphs. However not proved to be a full graph invariant by now, our method gives the right answer for the graph instances other wellknown methods could not compute (such as special Fürer Gadgets and point-line incidence graphs of finite projective planes of higher d...

Invariance of the barycentric subdivision of a simplicial complex

‎In this paper we prove that a simplicial complex is determined‎ ‎uniquely up to isomorphism by its barycentric subdivision as well as‎ ‎its comparability graph‎. ‎We also put together several algebraic‎, ‎combinatorial and topological invariants of simplicial complexes‎.

A Neural Graph Isomorphism Algorithm based on local Invariants