The width of quadrangulations of the projective plane

Abstract

We show that every 4-chromatic graph on n vertices, with no two vertex-disjoint odd cycles, has an odd cycle of length at most 12\,(1+8n-7). Let G be a non-bipartite quadrangulation of the projective plane on n vertices. Our result immediately implies that G has edge-width at most 12\,(1+8n-7), which is sharp for infinitely many values of n. We also show that G has face-width (equivalently, contains an odd cycle transversal of cardinality) at most 14(1+16 n-15), which is a constant away from the optimal; we prove a lower bound of n. Finally, we show that G has an odd cycle transversal of size at most 2 n inducing a single edge, where is the maximum degree. This last result partially answers a question of Nakamoto and Ozeki.