Low Ply Drawings of Trees

August 30, 2016 Β· Declared Dead Β· πŸ› International Symposium Graph Drawing and Network Visualization

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Authors Patrizio Angelini, Michael A. Bekos, Till Bruckdorfer, Jaroslav Hančl, Michael Kaufmann, Stephen Kobourov, Antonios Symvonis, Pavel Valtr arXiv ID 1608.08538 Category cs.DS: Data Structures & Algorithms Citations 4 Venue International Symposium Graph Drawing and Network Visualization Last Checked 4 months ago
Abstract
We consider the recently introduced model of \emph{low ply graph drawing}, in which the ply-disks of the vertices do not have many common overlaps, which results in a good distribution of the vertices in the plane. The \emph{ply-disk} of a vertex in a straight-line drawing is the disk centered at it whose radius is half the length of its longest incident edge. The largest number of ply-disks having a common overlap is called the \emph{ply-number} of the drawing. We focus on trees. We first consider drawings of trees with constant ply-number, proving that they may require exponential area, even for stars, and that they may not even exist for bounded-degree trees. Then, we turn our attention to drawings with logarithmic ply-number and show that trees with maximum degree $6$ always admit such drawings in polynomial area.
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