Upper bound on the number of edges of an almost planar bipartite graph

Abstract

Let G be a bipartite graph without loops and multiple edges on v 4 vertices, which can be drawn on the plane such that any edge intersects at most one other edge. We prove that such graph has at most 3v-8 edges for even v 6 and at most 3v-9 edges for odd v and v=6. For all v 4 examples showing that these bounds are tight are constructed. In the end of paper we discuss a question about drawings of complete bipartite graphs on the plane such that any edge intersects at most one other edge. Keywords: topological graphs, planar graphs, bipartite graphs.