Degree Realization by Bipartite Multigraphs

TL;DR

This paper investigates the realization of degree sequences by bipartite multigraphs, providing characterizations, complexity results, and algorithms for specific cases, advancing understanding of bipartite degree realization problems.

Contribution

It offers a new characterization for bipartite multigraph realizations with bounded excess edges and establishes NP-hardness for the general bipartite case without a given partition.

Findings

Characterization for bipartite multigraph realizations with bounded excess edges.

NP-hardness of bipartite multigraph realization without a given partition.

Algorithm for optimal realizations when the number of balanced partitions is polynomial.

Abstract

The problem of realizing a given degree sequence by a multigraph can be thought of as a relaxation of the classical degree realization problem (where the realizing graph is simple). This paper concerns the case where the realizing multigraph is required to be bipartite. The problem of characterizing sequences that can be realized by a bipartite graph has two variants. In the simpler one, termed BDR$^P$, the partition of the sequence into two sides is given as part of the input. A complete characterization for realizability in this variant was given by Gale and Ryser over sixty years ago. However, the variant where the partition is not given, termed BDR, is still open. For bipartite multigraph realizations, there are also two variants. For BDR$^P$, where the partition is given as part of the input, a characterization was known for determining whether there is a multigraph realization whose underlying graph is bipartite, such that the maximum number of copies of an edge is at most $r$. We present a characterization for determining if there is a bipartite multigraph realization such that the total number of excess edges is at most $t$. We show that optimizing these two measures may lead to different realizations, and that optimizing by one measure may increase the other substantially. As for the variant BDR, where the partition is not given, we show that determining whether a given (single) sequence admits a bipartite multigraph realization is NP-hard. Moreover, we show that this hardness result extends to any graph family which is a sub-family of bipartite graphs and a super-family of paths. On the positive side, we provide an algorithm that computes optimal realizations for the case where the number of balanced partitions is polynomial, and present sufficient conditions for the existence of bipartite multigraph realizations that depend only on the largest degree of the sequence.