Abstract | ||
---|---|---|
A stochastic analysis of multidimensional networks with unidirectional links between nodes is presented, which is more accurate than previous models and valid for the hypercube. The results are reconciled with those of previous researchers who have reported conflicting conclusions. In addition to the classic constraints of constant link width, pin-out, and bisection width, a new constraint, constant maximum throughput, is introduced. This constraint dramatizes the performance and cost trade-offs between different network topologies. |
Year | DOI | Venue |
---|---|---|
1997 | 10.1109/ICPP.1997.622544 | ICPP |
Keywords | Field | DocType |
conflicting conclusion,classic constraint,multidimensional network performance,previous model,constant link width,constant maximum throughput,bisection width,new constraint,cost trade-offs,different network topology,unidirectional links,previous researcher,network topologies,computer networks,stochastic analysis,concurrent computing,network performance,stochastic processes,multidimensional systems,hypercube,throughput,network topology,routing,hypercubes,parallel processing | Bisection,Multidimensional network,Computer science,Parallel computing,Parallel processing,Stochastic process,Network topology,Theoretical computer science,Throughput,Hypercube,Distributed computing | Conference |
ISSN | ISBN | Citations |
0190-3918 | 0-8186-8108-X | 3 |
PageRank | References | Authors |
0.43 | 11 | 2 |
Name | Order | Citations | PageRank |
---|---|---|---|
James R Anderson | 1 | 73 | 4.71 |
Seth Abraham | 2 | 3 | 0.43 |