Polyline Drawings with Topological Constraints
Abstract
Let be a simple topological graph and let be a polyline drawing of . We say that \emph{partially preserves the topology} of if it has the same external boundary, the same rotation system, and the same set of crossings as . Drawing fully preserves the topology of if the planarization of and the planarization of have the same planar embedding. We show that if the set of crossing-free edges of forms a connected spanning subgraph, then admits a polyline drawing that partially preserves its topology and that has curve complexity at most three (i.e., at most three bends per edge). If, however, the set of crossing-free edges of is not a connected spanning subgraph, the curve complexity may be . Concerning drawings that fully preserve the topology, we show that if has skewness , it admits one such drawing with curve complexity at most ; for skewness-1 graphs, the curve complexity can be reduced to one, which is a tight bound. We also consider optimal -plane graphs and discuss trade-offs between curve complexity and crossing angle resolution of drawings that fully preserve the topology.
Cite
@article{arxiv.1809.08111,
title = {Polyline Drawings with Topological Constraints},
author = {Emilio Di Giacomo and Peter Eades and Giuseppe Liotta and Henk Meijer and Fabrizio Montecchiani},
journal= {arXiv preprint arXiv:1809.08111},
year = {2018}
}