Title :
Algorithms and bounds for shortest paths and diameter in faulty hypercubes
Author :
Tien, Sing-Ban ; Raghavendra, C.S.
Author_Institution :
Dept. of Electr. Eng., Southern Illinois Univ., Carbondale, IL, USA
fDate :
6/1/1993 12:00:00 AM
Abstract :
In an n-dimensional hypercube Qn, with the fault set |F|<2n-2, assuming S and D are not isolated, it is shown that there exists a path of length equal to at most their Hamming distance plus 4. An algorithm with complexity O (|F|logn) is given to find such a path. A bound for the diameter of the faulty hypercube Qn-F, when |F|<2n-2, as n+2 is obtained. This improves the previously known bound of n+6 obtained by A.-H. Esfahanian (1989). Worst case scenarios are constructed to show that these bounds for shortest paths and diameter are tight. It is also shown that when |F|<2n-2, the diameter bound is reduced to n+1 if every node has at least 2 nonfaulty neighbors and reduced to n if every node has at least 3 nonfaulty neighbors
Keywords :
computational complexity; fault tolerant computing; hypercube networks; parallel algorithms; bounds; complexity; diameter; faulty hypercubes; n-dimensional hypercube; shortest paths; Algorithm design and analysis; Costs; Fault tolerance; Hamming distance; Hardware; Hypercubes; Multiprocessing systems; Multiprocessor interconnection networks; Network topology; Routing;
Journal_Title :
Parallel and Distributed Systems, IEEE Transactions on
