Drawing Partially Embedded and Simultaneously Planar Graphs

Abstract

We investigate the problem of constructing planar drawings with few bends for two related problems, the partially embedded graph PEG problem--to extend a straight-line planar drawing of a subgraph to a planar drawing of the whole graph--and the simultaneous planarity SEFE problem--to find planar drawings of two graphs that coincide on shared vertices and edges. In both cases we show that if the required planar drawings exist, then there are planar drawings with a linear number of bends per edge and, in the case of simultaneous planarity, a constant number of crossings between every pair of edges. Our proofs provide efficient algorithms if the combinatorial embedding information about the drawing is given. Our result on partially embedded graph drawing generalizes a classic result of Pach and Wenger showing that any planar graph can be drawn with fixed locations for its vertices and with a linear number of bends per edge.