Non-Homotopic Drawings of Multigraphs

Abstract

A multigraph drawn in the plane is non-homotopic if no two edges connecting the same pair of vertices can be continuously deformed into each other without passing through a vertex, and is k-crossing if every pair of edges (self-)intersects at most k times. We prove that the number of edges in an n-vertex non-homotopic k-crossing multigraph is at most 613 n (k + 1), which is a substantial improvement over previous upper bounds. We also study this problem in the setting of monotone drawings where every edge is an x-monotone curve. We show that the number of edges, m, in such a drawing is at most 2 2nk + 1 and the number of crossings is Ω(m2 + 1/kn1 + 1/k). For fixed k these bounds are both best possible up to a constant multiplicative factor.