Multi-Colored Spanning Graphs

Publication date

2016

Authors

Akatya, Hugo
Löffler, MaartenISNI 000000039666142X
Tóth, Csaba

Editors

Advisors

Supervisors

Document Type

Part of book
Open Access logo

License

taverne

Abstract

We study a problem proposed by Hurtado et al. [10] motivated by sparse set visualization. Given n points in the plane, each labeled with one or more primary colors, a colored spanning graph (CSG) is a graph such that for each primary color, the vertices of that color induce a connected subgraph. The Min-CSG problem asks for the minimum sum of edge lengths in a colored spanning graph. We show that the problem is NP-hard for k primary colors when k≥3k≥3 and provide a (2−13+2ϱ)(2−13+2ϱ) -approximation algorithm for k=3k=3 that runs in polynomial time, where ϱϱ is the Steiner ratio. Further, we give a O(n) time algorithm in the special case that the input points are collinear and k is constant.

Keywords

COMPUTATIONAL GEOMETRY, GRAPH DRAWING, GRAPHS THEORY, Taverne

Citation

Akatya, H, Löffler, M & Tóth, C 2016, Multi-Colored Spanning Graphs. in Graph Drawing and Network Visualization : 24th International Symposium, GD 2016, Athens, Greece, September 19-21, 2016, Revised Selected Papers. Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics), vol. 9801, pp. 81-93. https://doi.org/10.1007/978-3-319-50106-2_7