Title :
Near-optimal embeddings of trees into Fibonacci cubes
Author :
Bin Gong ; Zheng, S.Q.
Author_Institution :
Dept. of Comput. Sci., South Dakota State Univ., Brookings, SD, USA
fDate :
31 Mar-2 Apr 1996
Abstract :
The Fibonacci cube network was proposed recently as an alternative to the hypercube network. In this paper, we consider the problems of simulating tree and X-tree structures by the Fibonacci cube. Such problems can be characterized as network embedding. There is a big gap between the hypercube and the Fibonacci cube with respect to the availability of routing and embedding results. We present near-optimal embedding results, which show that the Fibonacci cube can simulate trees and X-trees almost as efficiently as the hypercube, even though the Fibonacci cube is a network much sparser than the hypercube
Keywords :
computational complexity; hypercube networks; network routing; optimisation; parallel processing; trees (mathematics); Fibonacci cubes; X-tree structures; computational complexity; hypercube network; near-optimal embeddings; network routing; Algorithm design and analysis; Binary trees; Computational modeling; Computer science; Data communication; Delay; Hypercubes; Routing; Telecommunication network reliability; Tree graphs;
Conference_Titel :
System Theory, 1996., Proceedings of the Twenty-Eighth Southeastern Symposium on
Conference_Location :
Baton Rouge, LA
Print_ISBN :
0-8186-7352-4
DOI :
10.1109/SSST.1996.493541
