On the sizes of bipartite 1-planar graphs

Abstract

A graph is called 1-planar if it admits a drawing in the plane such that each edge is crossed at most once. Let G be a bipartite 1-planar graph with n ( 4) vertices and m edges. Karpov showed that m 3n-8 holds for even n 8 and m 3n-9 holds for odd n 7. Czap, Przybylo and Skrabul\'akov\'a proved that if the partite sets of G are of sizes x and y, then m 2n+6x-12 holds for 2≤ x≤ y, and conjectured that m 2n+4x-12 holds for x 3 and y 6x-12. In this paper, we settle their conjecture and our result is even under a weaker condition 2 x y.