Title :
Wildcard dimensions, coding theory and fault-tolerant meshes and hypercubes
Author :
Bruck, Jehoshua ; Cypher, Robert ; Ho, Ching-Tien
Author_Institution :
California Inst. of Technol., Pasadena, CA, USA
fDate :
1/1/1995 12:00:00 AM
Abstract :
Hypercubes, meshes and tori are well known interconnection networks for parallel computers. The sets of edges in those graphs can be partitioned to dimensions. It is well known that the hypercube can be extended by adding a wildcard dimension resulting in a folded hypercube that has better fault-tolerant and communication capabilities. First we prove that the folded hypercube is optimal in the sense that only a single wildcard dimension ran be added to the hypercube. We then investigate the idea of adding wildcard dimensions to d-dimensional meshes and tori. Using techniques from error correcting codes we construct d-dimensional meshes and tori with wildcard dimensions. Finally, we show how these constructions can be used to tolerate edge and node faults in mesh and torus networks
Keywords :
error correction codes; fault tolerant computing; hypercube networks; reliability; coding theory; communication capabilities; edge faults; error correcting codes; fault-tolerant meshes; folded hypercube; interconnection networks; node faults; parallel computers; wildcard dimensions; Algorithm design and analysis; Computer networks; Concurrent computing; Costs; Error correction codes; Fault tolerance; Hypercubes; Multiprocessor interconnection networks; Network topology; Redundancy;
Journal_Title :
Computers, IEEE Transactions on
