On arc-density of pushably 3-critical oriented graphs

Abstract

An oriented graph G is pushably k-critical if it is not pushably k-colorable, but every proper subgraph of G is. The main result of this article is that every pushably 3-critical oriented graph on n vertices, but for four exceptions, has at least 15n+213 arcs, and that this bound is tight. As an application of this result, we show that the class of oriented graphs with maximum average degree strictly less than 3013 and girth at least 5, which includes all oriented planar and projective planar graphs with girth at least 15, have pushable chromatic number at most 3. Moreover, we provide an exhaustive list of pushably 3-critical graphs with maximum average degree equal to 3013 and a pushably 3-critical orientation of a 4-cycle to prove the tightness of our bound with respect to both maximum average degree and girth. We also show that these classes of oriented graphs admit a homomorphism to an oriented planar graph on six vertices (an orientation of K2,2,2) which (tightly) improves a result due to Borodin et al. [Discrete Mathematics 1998]. Furthermore, for these classes of oriented graphs, we prove that the 2-dipath L(p,q) and the oriented L(p,q) spans are upper bounded by 2p+3q for all q ≤ p. All these implications improve previously known results.