Some conjectures on r-graphs and equivalences

Abstract

An r-regular graph is an r-graph, if every odd set of vertices is connected to its complement by at least r edges. Seymour [On multicolourings of cubic graphs, and conjectures of Fulkerson and Tutte.~Proc.~London Math.~Soc.~(3), 38(3): 423-460, 1979] conjectured (1) that every planar r-graph is r-edge colorable and (2) that every r-graph has 2r perfect matchings such that every edge is contained in precisely two of them. We study several variants of these conjectures. A (t,r)-PM is a multiset of t · r perfect matchings of an r-graph G such that every edge is in precisely t of them. We show that the following statements are equivalent for every t, r ≥ 1: 1. Every planar r-graph has a (t,r)-PM. 2. Every K5-minor-free r-graph has a (t,r)-PM. 3. Every K3,3-minor-free r-graph has a (t,r)-PM. 4. Every r-graph whose underlying simple graph has crossing number at most 1 has a (t,r)-PM.