Edge colorings and circular flows on regular graphs

Abstract

Let φc(G) be the circular flow number of a bridgeless graph G. In [Edge-colorings and circular flow numbers of regular graphs, J. Graph Theory 79 (2015) 1-7] it was proved that, for every t ≥ 1, G is a bridgeless (2t+1)-regular graph with φc(G) ∈ \2+1t, 2 + 22t-1\ if and only if G has a perfect matching M such that G-M is bipartite. This implies that G is a class 1 graph. For t=1, all graphs with circular flow number bigger than 4 are class 2 graphs. We show for all t ≥ 1, that 2 + 22t-1 = ∈f \ φc(G) G is a (2t+1) -regular class 2 graph\. This was conjectured to be true in [Edge-colorings and circular flow numbers of regular graphs, J. Graph Theory 79 (2015) 1-7]. Moreover we prove that ∈f\ φc(G) G is a (2t+1)-regular class 1 graph with no perfect matching whose removal leaves a bipartite graph \ = 2 + 22t-1. We further disprove the conjecture that every (2t+1)-regular class 1 graph has circular flow number at most 2+2t.