Crossing Number of Simple 3-Plane Drawings
Abstract:
We study 3-plane drawings, that is, drawings of graphs in which every edge has at most three crossings. We show how the recently developed Density Formula for topological drawings of graphs [Kaufmann et al., 2024] can be used to count the crossings in terms of the number n of vertices. As a main result, we show that every 3-plane drawing has at most 5.5(n-2) crossings, which is tight. In particular, it follows that every 3-planar graph on n vertices has crossing number at most 5.5n, which improves upon a recent bound [Bekos et al., 2024] of 6.6n. To apply the Density Formula, we carefully analyze the interplay between certain configurations of cells in a 3-plane drawing. As a by-product, we also obtain an alternative proof for the known statement that every 3-planar graph has at most 5.5(n-2) edges.
| Zugehörige Institution(en) am KIT | Institut für Theoretische Informatik (ITI) |
| Publikationstyp | Proceedingsbeitrag |
| Publikationsdatum | 26.11.2025 |
| Sprache | Englisch |
| Identifikator | ISBN: 978-3-95977-403-1 ISSN: 1868-8969 KITopen-ID: 1000191317 |
| Erschienen in | 33rd International Symposium on Graph Drawing and Network Visualization (GD 2025). Ed.: V. Dujmović, F. Montecchiani; |
| Veranstaltung | 33rd International Symposium on Graph Drawing and Network Visualization (GD 2025), Norrköping, Schweden, 24.09.2025 – 26.09.2025 |
| Verlag | Schloss Dagstuhl - Leibniz-Zentrum für Informatik (LZI) |
| Seiten | Art.-Nr.: 15 |
| Serie | Leibniz International Proceedings in Informatics (LIPIcs) ; 357 |
| Schlagwörter | beyond planar graphs, edge density, crossing number, density formula, Mathematics of computing → Graphs and surfaces |
| Nachgewiesen in | Scopus OpenAlex |