Title :
Smallest primitive embeddings of planar graphs
Author :
Perez Perez, S.L. ; Aguilar Cruz, G. ; Alfaro Quintero, C.D. ; Perez Arcos, J.A. ; Zaragoza Martinez, F.J.
Author_Institution :
Posgrado en Optimizacion, UAM Azcapotzalco, Mexico City, Mexico
fDate :
Sept. 29 2014-Oct. 3 2014
Abstract :
A graph is said to be planar if it can be drawn on the plane with vertices as different points and edges as continuous curves that only intersect its vertices. An embedding of a graph is said to be primitive if its edges are primitive segments. A recent conjecture is that all planar graphs with n vertices have a primitive embedding in a square grid of side O(n). It is known that trees have that type of embedding. A smallest primitive embedding is that in which the square grid has side as small as possible. In this work we present some results about the smallest primitive embeddings for trees, outerplanar graphs, and planar graphs with few vertices, as a computational approach to give evidence that the above conjecture might be true.
Keywords :
graph theory; graph edge; graph point; graph vertices; outerplanar graphs; planar graph embedding; smallest primitive embedding; square grid; trees; Algorithm design and analysis; Cities and towns; Computational geometry; Electrical engineering; Face; Lattices; outerplanar graph; planar graph; primitive embedding; smallest primitive embed-dings;
Conference_Titel :
Electrical Engineering, Computing Science and Automatic Control (CCE), 2014 11th International Conference on
Conference_Location :
Campeche
Print_ISBN :
978-1-4799-6228-0
DOI :
10.1109/ICEEE.2014.6978271
