標題: Long paths in hypercubes with conditional node-faults
作者: Kueng, Tz-Liang
Liang, Tyne
Hsu, Lih-Hsing
Tan, Jimmy J. M.
資訊工程學系
Department of Computer Science
關鍵字: Interconnection network;Hypercube;Fault tolerance;Conditional fault;Linear array;Path embedding
公開日期: 15-Feb-2009
摘要: Let F be a set of f <= 2n - 5 faulty nodes in an n-cube Q(n) such that every node of Q(n) still has at least two fault-free neighbors. Then we show that Q(n) - F contains a path of length at least 2(n) - 2f - 1 (respectively, 2(n) - 2f - 2) between any two nodes of odd (respectively, even) distance. Since the n-cube is bipartite, the path of length 2(n) - 2f - 1 (or 2(n) - 2f - 2) turns out to be the longest if all faulty nodes belong to the same partite set. As a contribution, our study improves upon the previous result presented by [J.-S. Fu, Longest fault-free paths in hypercubes with vertex faults, Information Sciences 176 (2006) 759-771] where only n - 2 faulty nodes are considered. (c) 2008 Elsevier Inc. All rights reserved.
URI: http://dx.doi.org/10.1016/j.ins.2008.10.015
http://hdl.handle.net/11536/7628
ISSN: 0020-0255
DOI: 10.1016/j.ins.2008.10.015
期刊: INFORMATION SCIENCES
Volume: 179
Issue: 5
起始頁: 667
結束頁: 681
Appears in Collections:Articles


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