Transversals and bipancyclicity in bipartite graph families

Abstract

A bipartite graph is called bipancyclic if it contains cycles of every even length from four up to the number of vertices in the graph. A theorem of Schmeichel and Mitchem states that for n ≥ 4, every balanced bipartite graph on 2n vertices in which each vertex in one color class has degree greater than n2 and each vertex in the other color class has degree at least n2 is bipancyclic. We prove a generalization of this theorem in the setting of graph transversals. Namely, we show that given a family G of 2n bipartite graphs on a common set X of 2n vertices with a common balanced bipartition, if each graph of G has minimum degree greater than n2 in one color class and minimum degree at least n2 in the other color class, then there exists a cycle on X of each even length 4 ≤ ≤ 2n that uses at most one edge from each graph of G. We also show that given a family G of n bipartite graphs on a common set X of 2n vertices meeting the same degree conditions, there exists a perfect matching on X that uses exactly one edge from each graph of G.