http://orcid.org/0000-0003-4872-5679
References
- Akiba, T. and Yamamoto, H. (2001) Reliability of a 2-dimensional k-within-consecutive-r × s-out-of-m × n:F system. Naval Research Logistics, 48, 625–637.
- Au, S.-K. and Beck, J.L. (2001) Estimation of small failure probabilities in high dimensions by subset simulation. Probabilistic Engineering Mechanics, 16, 263–277.
- Baca, A. (1993) Examples of Monte Carlo methods in reliability estimation based on reduction of prior information. IEEE Transactions on Reliability, 42, 645–649.
- Cancela, H. and El Khadiri, M. (1998) Series-parallel reductions in Monte Carlo network-reliability evaluation. IEEE Transactions on Reliability, 47, 159–164.
- Ching, J., Beck, J.L. and Au, S.K. (2005) Hybrid subset simulation method for reliability estimation of dynamical systems subject to stochastic excitation. Probabilistic Engineering Mechanics, 20, 199–214.
- Geist, R.M. and Smotherman, M.K. (1989) Ultrahigh reliability estimates through simulation, in Proceedings of the Annual Reliability and Maintainability Symposium, IEEE, Piscataway, NJ, USA, pp. 350–355.
- Heidelberger, P. (1993) Fast simulation of rare events in queueing and reliability models, in Performance Evaluation of Computer and Communication Systems, Springer, Berlin, Germany, pp. 165–202.
- Hua, D. and Elsayed, E.A. (2016a) Degradation analysis of k-out-of-n pairs: G balanced system with spatially distributed units. IEEE Transactions on Reliability, 65, 941–956.
- Hua, D. and Elsayed, E.A. (2016b) Reliability estimation of k-out-of-n pairs: G balanced systems with spatially distributed units. IEEE Transactions on Reliability, 65, 886–900.
- Juneja, S. and Shahabuddin, P. (2001) Splitting-based importance-sampling algorithm for fast simulation of Markov reliability models with general repair-policies. IEEE Transactions on Reliability, 50, 235–245.
- Kamat, S.J. and Riley, M.W. (1975) Determination of reliability using event-based Monte Carlo simulation. IEEE Transactions on Reliability, 24, 73–75.
- Karger, D. (2001) A randomized fully polynomial time approximation scheme for the all-terminal network reliability problem. SIAM Review, 43, 499–522.
- Kulkarni, M.G. and Kashikar, A.S. (2014) Signature and reliability of conditional three-dimensional consecutive-(s, s, s)-out-of-(s, s, m):F system. International Journal of Reliability, Quality and Safety Engineering, 21, 1450009–1450022.
- Kumamoto, H., Tanaka, K. and Inoue, K. (1977) Efficient evaluation of system reliability by Monte Carlo method. IEEE Transactions on Reliability, 26, 311–315.
- Landers, T.L., Taha, H.A. and King, C.L. (1991) A reliability simulation approach for use in the design process. IEEE Transactions on Reliability, 40, 177–181.
- Psillakis, Z.M. (1995) A simulation algorithm for computing failure probability of a consecutive-k-out-of-r-from-n:F system. IEEE Transactions on Reliability, 44, 523–531.
- Sarper, H. and Sauer, W.J. (2002) New reliability configuration for large planetary descent vehicles. Journal of Spacecraft and Rockets, 39, 639–642.