Title :
Tolerating faults in hypercubes using subcube partitioning
Author :
Bruck, Jehoshua ; Cypher, Robert ; Soroker, Danny
Author_Institution :
IBM Almaden Res. Center, San Jose, CA, USA
fDate :
5/1/1992 12:00:00 AM
Abstract :
The authors examine the issue of running algorithms on a hypercube which has both node and edge faults, and they assume a worst-case distribution of the faults. It is proven that for any constant c, an n-dimensional hypercube (n-cube) with nc faulty components contains a fault-tree subgraph that can implement a large class of hypercube algorithms with only a constant factor slowdown. In addition, the approach yields practical implementations for small numbers of faults. For example, it is shown that any regular algorithm can be implemented on an n-cube that has at most n-1 faults with slowdowns of at most two for computation and at most four for communication. This is the first result showing that an n-cube can tolerate more than O(n ) arbitrarily placed faults with a constant factor slowdown
Keywords :
computational complexity; fault tolerant computing; graph theory; hypercube networks; parallel algorithms; edge faults; fault tolerance; fault-tree subgraph; faulty components; hypercube algorithms; node faults; subcube partitioning; worst-case distribution; Algorithm design and analysis; Concurrent computing; Fault tolerance; Helium; Hypercubes; Parallel machines; Parallel processing; Partitioning algorithms; Time measurement; Topology;
Journal_Title :
Computers, IEEE Transactions on
