Canonical binary matrices related to bipartite graphs

Abstract

The current paper is dedicated to the problem of finding the number of mutually non isomorphic bipartite graphs of the type g= Rg ,Cg ,Eg at given n=|Rg | and m=|Cg |, where Rg and Cg are the two disjoint parts of the vertices of the graphs g, and Eg is the set of edges, Eg ⊂eq Rg × Cg. For this purpose, the concept of canonical binary matrix is introduced. The different canonical matrices unambiguously describe the different with exactness up to isomorphism bipartite graphs. We have found a necessary and sufficient condition an arbitrary matrix to be canonical. This condition could be the base for realizing recursive algorithm for finding all n × m canonical binary matrices and consequently for finding all with exactness up to isomorphism binary matrices with cardinality of each part equal to n and m.