Simultaneous Embeddings with Few Bends and Crossings
Abstract
A simultaneous embedding with fixed edges (SEFE) of two planar graphs and is a pair of plane drawings of and that coincide when restricted to the common vertices and edges of and . We show that whenever and admit a SEFE, they also admit a SEFE in which every edge is a polygonal curve with few bends and every pair of edges has few crossings. Specifically: (1) if and are trees then one bend per edge and four crossings per edge pair suffice (and one bend per edge is sometimes necessary), (2) if is a planar graph and is a tree then six bends per edge and eight crossings per edge pair suffice, and (3) if and are planar graphs then six bends per edge and sixteen crossings per edge pair suffice. Our results improve on a paper by Grilli et al. (GD'14), which proves that nine bends per edge suffice, and on a paper by Chan et al. (GD'14), which proves that twenty-four crossings per edge pair suffice.
Keywords
Cite
@article{arxiv.1508.07921,
title = {Simultaneous Embeddings with Few Bends and Crossings},
author = {Fabrizio Frati and Michael Hoffmann and Vincent Kusters},
journal= {arXiv preprint arXiv:1508.07921},
year = {2015}
}
Comments
Full version of the paper "Simultaneous Embeddings with Few Bends and Crossings" accepted at GD '15