Open Access
Issue
JNWPU
Volume 37, Number 5, October 2019
Page(s) 897 - 902
DOI https://doi.org/10.1051/jnwpu/20193750897
Published online 14 January 2020
  1. Gertsbakh I B, Shpungin Y. Models of Network Reliability:Analysis, Combinatorics, and Monte Carlo[M]. Boca Rato, Florida, USA, CRC Press, 2009 [Google Scholar]
  2. Kamalja K K, Amrutkar K P. Reliability and Reliability Importance of Weighted-r-within-Consecutive-k-out-of-n:F System[J]. IEEE Trans on Reliability, 2018, 67(3): 951–969 [Article] [CrossRef] [Google Scholar]
  3. Birnbaum Z W. On the Importance of Different Components in a Multicomponent System Multivariate AnalysisⅡ[M]. New York, Academic Press, 1969: 581–592 [Google Scholar]
  4. Vesely W E. A Time-Dependent Methodology for Fault Tree Evaluation[J]. Nuclear Engineering and Design, 1970, 13(2): 337–360 [Article] [CrossRef] [Google Scholar]
  5. Fussell J B. How to Hand-Calculate System Reliability and Safety Characteristics[J]. IEEE Trans on Reliability, 1975, 24(3): 169–174 [Article] [CrossRef] [Google Scholar]
  6. Bhattacharya D, Roychowdhury S. Bayesian Importance Measure-Based Approach for Optimal Redundancy Assignment[J]. American Journal of Mathematical and Management Sciences, 2016, 35(4): 335–344 [Article] [CrossRef] [Google Scholar]
  7. Dui Hongyan, Si Shubin, Richard C M Y. A Cost-Based Integrated Importance Measure of System Components for Preventive Maintenance[J]. Reliability Engineering & System Safety, 2017, 168: 98–104 [Article] [CrossRef] [Google Scholar]
  8. Si Shubin, Yang Liu, Cai Zhiqiang, et al. A New and Efficient Computation Method of IM (Integrated Importance Measures) for Components in Binary Coherent Systems[J]. Journal of Northwestern Polytechnical University, 2011, 29(6): 939–947 [Article] [Google Scholar]
  9. Kuo W, Prasad V R, Tillman F A, et al. Optimal Reliability Design:Fundamentals and Applications[M]. Cambridge, UK, Cambridge University Press, 2006 [Google Scholar]
  10. Boland P J, Proschan F, Tong Y L. Optimal Arrangement of Components via Pairwise Rearrangements[J]. Naval Research Logistics, 1989, 36(6): 807–815 [Article] [CrossRef] [Google Scholar]
  11. Page L B, Perry J E. Reliability Polynomials and Link Importance in Networks[J]. IEEE Trans on Reliability, 1994, 43(1): 51–58 [Article] [CrossRef] [Google Scholar]
  12. Hsu S J, Yuang M C. Efficient Computation of Marginal Reliability-Importance for Reducible Networks[J]. IEEE Transactions on Reliability, 2001, 50(1): 98–106 [Article] [CrossRef] [Google Scholar]
  13. Hong J S, Lie C H. Joint Reliability-Importance of Two Edges in an Undirected Network[J]. IEEE Trans on Reliability, 1993, 42(1): 17–23 [Article] [CrossRef] [Google Scholar]
  14. Du Y J, Si S B, Gao H Y, et al. Birnbaum Importance Measure of Network Based on C-Spectrum under Saturated Poisson Distribution[C]//2017 IEEE International Conference on Industrial Engineering and Engineering Management, Singapore, 2017: 934–938 [Article] [Google Scholar]
  15. Du Yongjun, Hou Peiyong, Guo Yaqi. Network Birnbaum Importance Measure under Saturated Poisson Distribution[J]. Journal of Northwestern Polytechnical University, 2017, 35(5): 870–875 [Article] [Article] [Google Scholar]
  16. Gertsbakh I, Shpungin Y. Network Reliability Importance Measures:Combinatories and Monte Carlo Based Computations[J]. WSEAS Trans on Computers, 2008, 7(4): 216–227 [Article] [Google Scholar]
  17. Gertsbakh I B, Shpungin Y. Combinatorial Approach to Computing Component Importance Indexes in Coherent Systems[J]. Probability in the Engineering and Informational Sciences, 2012, 26(1): 117–128 [Article] [CrossRef] [Google Scholar]

Current usage metrics show cumulative count of Article Views (full-text article views including HTML views, PDF and ePub downloads, according to the available data) and Abstracts Views on Vision4Press platform.

Data correspond to usage on the plateform after 2015. The current usage metrics is available 48-96 hours after online publication and is updated daily on week days.

Initial download of the metrics may take a while.