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GD
2009
Springer

4-Labelings and Grid Embeddings of Plane Quadrangulations

14 years 4 months ago
4-Labelings and Grid Embeddings of Plane Quadrangulations
We show that each quadrangulation on n vertices has a closed rectangle of influence drawing on the (n − 2) × (n − 2) grid. Further, we present a simple algorithm to obtain a straight-line drawing of a quadrangulation on the n 2 × 3n 4 grid. This is not optimal but has the advantage over other existing algorithms that it is not needed to add edges to the quadrangulation to make it 4-connected. The algorithm is based on angle labeling and simple face counting in regions analogous to Schnyder’s grid embedding for triangulation. This extends previous results on book embeddings for quadrangulations from Felsner, Huemer, Kappes, and Orden (2008). Our approach also yields a representation of a quadrangulation as a pair of rectangulations with a curious property.
Lali Barrière, Clemens Huemer
Added 24 Jul 2010
Updated 24 Jul 2010
Type Conference
Year 2009
Where GD
Authors Lali Barrière, Clemens Huemer
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