Moving Vertices to Make Drawings Plane

Abstract

A straight-line drawing δ of a planar graph G need not be plane, but can be made so by moving some of the vertices. Let shift(G,δ) denote the minimum number of vertices that need to be moved to turn δ into a plane drawing of G. We show that shift(G,δ) is NP-hard to compute and to approximate, and we give explicit bounds on shift(G,δ) when G is a tree or a general planar graph. Our hardness results extend to 1BendPointSetEmbeddability, a well-known graph-drawing problem.