Journal of Graph Algorithms and Applications
http://jgaa.info ISSN: 1526-1719
DOI: 10.7155/jgaa.00114 Computing Radial Drawings on the Minimum Number of Circles Emilio Di Giacomo , Walter Didimo , Giuseppe Liotta , and Henk Meijer Vol. 9, no. 3, pp. 365-389, 2005. Regular paper Abstract A radial drawing is a representation of a graph in which the vertices lie on concentric circles of finite radius. In this paper we study the problem of computing radial drawings of planar graphs by using the minimum number of concentric circles. We assume that the edges are drawn as straight-line segments and that co-circular vertices can be adjacent. It is proven that the problem can be solved in polynomial time. The solution is based on a characterization of those graphs that admit a crossing-free straight-line radial drawing on k circles. For the graphs in this family, a linear time algorithm that computes a radial drawing on k circles is also presented.
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Revised: July 2005. Submitted: January 2005. Communicated by Emden Gansner and János Pach |
Journal of Graph Algorithms and Applications |