Title :
Fault-tolerant graphs for hypercubes and tori
Author :
Yamada, Toshinori ; Yamamoto, Koji ; Ueno, Shuichi
Author_Institution :
Dept. of Electr. & Electron. Eng., Tokyo Inst. of Technol., Japan
Abstract :
Motivated by the design of fault-tolerant multiprocessor interconnection networks the paper considers the following problem: given a positive integer t and graph H, construct a graph G from H by adding a minimum number Δ(t,H) of edges such that even after deleting any t edges from G the remaining graph contains H as a subgraph. We estimate Δ(t,H) for the hypercube and torus, which are well-known as important interconnection networks for multiprocessor systems. If we denote the hypercube and square torus on N vertices by Q N and DN, respectively, we show among others, that Δ(t,QN)=O(tNlog(logN/t+log2e)) for any t and N (t⩾2), and Δ(1,DN)=N/2 if N is even
Keywords :
fault tolerant computing; graph theory; hypercube networks; multiprocessor interconnection networks; fault-tolerant graphs; fault-tolerant multiprocessor interconnection networks; hypercubes; subgraph; tori; Binary trees; Design engineering; Fault tolerance; Hamming weight; Hypercubes; Linear code; Multiprocessing systems; Multiprocessor interconnection networks; Upper bound;
Conference_Titel :
System Sciences, 1995. Proceedings of the Twenty-Eighth Hawaii International Conference on
Conference_Location :
Wailea, HI
Print_ISBN :
0-8186-6930-6
DOI :
10.1109/HICSS.1995.375507
