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The classic problem of determining the diagnosability of a given network has been studied extensively. Under the PMC model, this paper addresses the problem of determining the diagnosability of a class of networks called (1,2)-Matching Composition Networks, each of which is constructed by connecting two graphs via one or two perfect matchings. By applying our results to multiprocessor systems, we can determine the diagnosability of hypercubes, twisted cubes, locally twisted cubes, generalized twisted cubes, recursive circulants G(2^{n},4) for odd n, folded hypercubes, augmented cubes, crossed cubes, Möbius cubes, and hyper-Petersen networks, all of which belong to the class of (1,2)-matching composition networks.
Published in:
Dependable and Secure Computing, IEEE Transactions on
(Volume:8
,
Issue:
3
)
Date of Publication: May-June 2011
- Page(s):
- 353 - 362
- ISSN :
- 1545-5971
- INSPEC Accession Number:
- 11883033
- Digital Object Identifier :
- 10.1109/TDSC.2010.22
- Product Type:
- Journals & Magazines
- Date of Current Version :
- 14 March 2011
- Issue Date :
- May-June 2011
- Sponsored by :
- IEEE Computer Society
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