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Conditional Fault Diameter of Star Graph Networks

✍ Scribed by Yordan Rouskov; Shahram Latifi; Pradip K. Srimani

Publisher
Elsevier Science
Year
1996
Tongue
English
Weight
300 KB
Volume
33
Category
Article
ISSN
0743-7315

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✦ Synopsis

It is well known that star graphs are strongly resilient like the n cubes in the sense that they are optimally fault tolerant and the fault diameter is increased only by one in the presence of maximum number of allowable faults. We investigate star graphs under the conditions of forbidden faulty sets, where all the neighbors of any node cannot be faulty simultaneously; we show that under these conditions star graphs can tolerate upto (2n ؊ 5) faulty nodes and the fault diameter is increased only by 2 in the worst case in presence of maximum number of faults. Thus, star graphs enjoy the similar property of strong resilience under forbidden faulty sets like the n-cubes. We have developed algorithms to trace the vertex disjoint paths under different conditions.

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## Abstract Let __u__ and __v__ be any two distinct nodes of an undirected graph __G__, which is __k__‐connected. A container __C__(__u__,__v__) between __u__ and __v__ is a set of internally disjoint paths {__P__~1~,__P__~2~,…,__P__~__w__~} between __u__ and __v__ where 1 ≀ __w__ ≀ __k__. The widt