On 1-factorizations of Bipartite Kneser Graphs

Abstract

It is a challenging open problem to construct an explicit 1-factorization of the bipartite Kneser graph H(v,t), which contains as vertices all t-element and (v-t)-element subsets of [v]:=\1,…,v\ and an edge between any two vertices when one is a subset of the other. In this paper, we propose a new framework for designing such 1-factorizations, by which we solve a nontrivial case where t=2 and v is an odd prime power. We also revisit two classic constructions for the case v=2t+1 --- the lexical factorization and modular factorization. We provide their simplified definitions and study their inner structures. As a result, an optimal algorithm is designed for computing the lexical factorizations. (An analogous algorithm for the modular factorization is trivial.)