Density of 3-critical signed graphs

Abstract

We say that a signed graph is k-critical if it is not k-colorable but every one of its proper subgraphs is k-colorable. Using the definition of colorability due to Naserasr, Wang, and Zhu that extends the notion of circular colorability, we prove that every 3-critical signed graph on n vertices has at least 3n-12 edges, and that this bound is asymptotically tight. It follows that every signed planar or projective-planar graph of girth at least 6 is (circular) 3-colorable, and for the projective-planar case, this girth condition is best possible. To prove our main result, we reformulate it in terms of the existence of a homomorphism to the signed graph C3*, which is the positive triangle augmented with a negative loop on each vertex.