On The Number Of Unlabeled Bipartite Graphs

Abstract

This paper solves a problem that was stated by M. A. Harrison in 1973~harrison1973number. This problem, that has remained open since then is concerned with counting equivalence classes of n× r binary matrices under row and column permutations. Let I and O denote two sets of vertices, where I O =, |I| = n, |O| = r, and Bu(n,r) denote the set of unlabeled graphs whose edges connect vertices in I and O. Harrison established that the number of equivalence classes of n× r binary matrices is equal to the number of unlabeled graphs in Bu(n,r). He also computed the number of such matrices (hence such graphs) for small values of n and r without providing an asymptotic formula |Bu(n,r)|. Here, such an asymptotic formula is provided by proving the following two-sided equality using Polya's Counting Theorem.