Title :
Cyclic-cubes: a new family of interconnection networks of even fixed-degrees
Author :
Fu, Ada Wai-Chee ; Chau, Siu-Cheung
Author_Institution :
Dept. of Comput. Sci. & Eng., Chinese Univ. of Hong Kong, Shatin, Hong Kong
fDate :
12/1/1998 12:00:00 AM
Abstract :
We introduce a new family of interconnection networks that are Cayley graphs with fixed degrees of any even number greater than or equal to four. We call the proposed graphs cyclic-cubes because contracting some cycles in such a graph results in a generalized hypercube. These Cayley graphs have optimal fault tolerance and logarithmic diameters. For comparable number of nodes, a cyclic-cube can have a diameter smaller than previously known fixed-degree networks. The proposed graphs can adopt an optimum routing algorithm known for one of its subfamilies of Cayley graphs. We also show that a graph in the new family has a Hamiltonian cycle and, hence, there is an embedding of a ring. Embedding of meshes and hypercubes are also discussed
Keywords :
fault tolerant computing; graph theory; multiprocessor interconnection networks; network routing; Cayley graphs; Hamiltonian cycle; cyclic-cubes; even fixed degree interconnection networks; generalized hypercube; hypercube embedding; logarithmic diameters; mesh embedding; optimal fault tolerance; optimum routing algorithm; ring embedding; Fault tolerance; Hypercubes; Multiprocessor interconnection networks; Routing;
Journal_Title :
Parallel and Distributed Systems, IEEE Transactions on
