Title :
Optimal total exchange in Cayley graphs
Author :
Dimakopoulos, Vassilios V. ; Dimopoulos, Nikitas J.
Author_Institution :
Dept. of Comput. Sci., Ioannina Univ., Greece
fDate :
11/1/2001 12:00:00 AM
Abstract :
Consider an interconnection network and the following situation: Every node needs to send a different message to every other node. This is the total exchange or all-to-all personalized communication problem, one of a number of information dissemination problems known as collective communications. Under the assumption that a node can send and receive only one message at each step (single-port model), it is seen that the minimum time required to solve the problem is governed by the status (or total distance) of the nodes in the network. We present a time-optimal solution for any Cayley network. Rings, hypercubes, cube-connected cycles, and butterflies are some well-known Cayley networks which can take advantage of our method. The solution is based on a class of algorithms which we call node-invariant algorithms and which behave uniformly across the network
Keywords :
distributed memory systems; graph theory; group theory; multiprocessor interconnection networks; queueing theory; Cayley graphs; Rings; all-to-all personalized communication problem; butterflies; cube-connected cycles; hypercubes; interconnection network; node-invariant algorithms; optimal total exchange; time-optimal solution; total exchange communication problem; Broadcasting; Communication standards; Hypercubes; Intelligent networks; Message passing; Multiprocessor interconnection networks; Scattering; Topology;
Journal_Title :
Parallel and Distributed Systems, IEEE Transactions on
