Title :
The upper bound and lower bound of the genus of pancake graphs
Author :
Nguyen, Quan T. ; Bettayeb, Said
Author_Institution :
Sch. of Sci. & Comput. Eng., Univ. of Houston-Clear Lake, Houston, TX, USA
Abstract :
Both the pancake graph and star graph are Cayley graphs and are especially attractive for parallel processing. They both have sublogarithmic diameter, and are fairly sparse compared to hypercubes. In this paper, we focus on another important property, namely the genus. The genus of a graph is the minimum number of handles needed for drawing the graph on the plane without edges crossing. We will investigate the upper bound and lower bound for the genus of pancake graph and compare these values with the genus of the star graph as well as that of the hypercube.
Keywords :
graph theory; hypercube networks; parallel architectures; Cayley graphs; graph genus; hypercube network; pancake graph; parallel processing; star graph; sublogarithmic diameter; Concurrent computing; Hypercubes; Lakes; Multiprocessor interconnection networks; Parallel processing; Sorting; Upper bound; Cayley graph; Genus; binary hypercube; pancake network; permutation; prefix reversal; star network;
Conference_Titel :
Computers and Communications, 2009. ISCC 2009. IEEE Symposium on
Conference_Location :
Sousse
Print_ISBN :
978-1-4244-4672-8
Electronic_ISBN :
1530-1346
DOI :
10.1109/ISCC.2009.5202359
