References
- Ahmad, I. A., Kayid, M., & Pellerey, F. (2005). Further results involving the MIT order and the IMIT class. Probability in the Engineering and Informational Sciences, 19(3), 337–395.
- El-Bassiouny, A. H., & Alwasel, I. A. (2003). A goodness of fit approach to testing mean residual times. Applied Mathematics and Computation, 143(2–3), 301–307.
- Eryilmaz, S. (2011). The behavior of warm standby components with respect to a coherent system. Statistics & Probability Letters, 81(8), 1319–1325.
- Eryilmaz, S. (2012). On the mean residual life of a k-out-of-n:G system with a single cold standby component. European Journal of Operational Research, 222(2), 273–277.
- Eryilmaz, S. (2013). Reliability of a k-out-of-n system equipped with a single warm standby component. IEEE Transactions on Reliability, 62(2), 499–503.
- Gupta, R. D., & Kundu, D. (2001). Generalized exponential distribution: Different method of estimations. Journal of Statistical Computation and Simulation, 69(4), 315–337.
- Hu, T., & Zhuang, W. (2005). Stochastic properties of p-spacings of generalized order statistics. Probability in the Engineering and Informational Sciences, 19(02), 257–276.
- Kaur, G., & Gupta, P. (2017). Availability improvement of a hot standby system by inclusion of a substitute system. International Journal of Statistics and Reliability Engineering, 4(2), 105–109.
- Khaledi, B. E., & Shaked, M. (2007). Ordering conditional lifetimes of coherent systems. Journal of Statistical Planning and Inference, 137(4), 1173–1184.
- Kayid, M., & Ahmad, I. A. (2004). On the mean inactivity time ordering with reliability applications. Probability in the Engineering and Informational Sciences, 8, 395–409.
- Kayid, M., & Izadkhah, S. (2014). Mean inactivity time function, associated orderings and classes of life distributions. IEEE Transactions on Reliability, 63(2), 593–602.
- Kundu, D., & Gupta, R. D. (2009). Bivariate generalized exponential distribution. Journal of Multivariate Analysis, 100, 581–593.
- Kundu, C., & Sarkar, K. (2017). Characterizations based on higher order and partial moments of inactivity time. Statistical Papers, 58(3), 607–626.
- Lai, C. D., & Xie, M. (2006). Stochastic Aging and Dependence for Reliability. Springer Science and Business Media, Inc., New York, USA.
- Lehmann, E. L. (1966). Some concepts of dependence. The Annals of Mathematical Statistics, 37(5), 1137–1153.
- Levitin, G., Xing, L., Johnson, B. W., Y., & Dai, Y. (2015). Mission reliability, cost and time for cold standby computing systems with periodic backup. IEEE Transactions on Computers, 64(4), 1043–1057.
- Levitin, G., Xing, L., & Dai, Y. (2014a). Minimum mission cost cold–standby sequencing in non-repairable multi-phase systems. IEEE Transactions on Reliability, 63(1), 251–258.
- Levitin, G., Xing, G. L., & Dai, Y. (2014b). Optimal component loading in 1-out-of-N cold standby systems. Reliability Engineering & System Safety, 127, 58–64.
- Liu, B., Cui, L., Wen, Y., & Guo, F. (2016). A cold standby repairable system with the repairman having multiple vacations and operational, repair, and vacation times following phase-type distributions. Communications in Statistics - Theory and Methods, 45(4), 850–858.
- Mahdy, M. (2009). On Some New Stochastic Orders and their Properties in The Statistical Reliability Theory (Ph.D. Dissertation). Benha University, Egypt.
- Mahdy, M. (2012). Characterization and preservations of the variance inactivity time ordering and the increasing variance inactivity time class. Journal of Advanced Research, 3(1), 29–34.
- Mahdy, M. (2016). Further results related to variance past lifetime class and associated orderings and their properties. Physica A: Statistical Mechanics and Its Applications, 462(15), 1148–1160.
- Mendes, A. A., Ribeiro, J. L. D., & Coit, D. W. (2017). Optimal time interval between periodic inspections for a two–component cold standby multistate system. IEEE Transactions on Reliability, 66(2), 559–574.
- Meng, X., Yuan, L., & Yin, R. (2006). The reliability analysis of a two–unit cold standby system with failable switch and maintenance equipment. IEEE International Conference on Computational Intelligence and Security, 2, 941–944.
- Müller, A., & Stoyan, D. (2002). Comparison Methods for Stochastic Models and Risks. Chichester: Wiley.
- Nair, N. U., & Sudheesh, K. K. (2010). Characterization of continuous distributions by properties of conditional variance. Statistical Methodology, 7(1), 30–40.
- Nadarajah, S., & Kotz, S. (2004). The beta gumbel distribution. Mathematical Problems in Engineering, 2004(4), 323–332.
- Nanda, A. K., & Shaked, M. (2001). The hazard rate and the reversed hazard rate orders, with applications to order statistics. Annals of the Institute of Statistical Mathematics, 53(4), 853–864.
- Nanda, A. K., Singh, H., Misra, N., & Paul, P. (2003). Reliability properties of reversed residual lifetime. Communications in Statistics - Theory and Methods, 32(10), 2031–2042.
- Navarro, J., del Águila, Y., Sordo, M. A., & Suárez-Llorens, A. (2013). Stochastic ordering properties for systems with dependent identically distributed components. Applied Stochastic Models in Business and Industry, 29(3), 264–278.
- Navarro, J., & Spizzichino, F. (2010). Comparisons of series and parallel systems with components sharing the same copula. Applied Stochastic Models in Business and Industry, 26(6), 775–791.
- Nelsen, R. B. (2006). An Introduction to Copulas (2nd ed.). New York: Springer.
- Rezaei, M., Gholizadeh, B., & Izadkhah, S. (2015). On relative reversed hazard rate order. Communications in Statistics – Theory and Methods, 44(2), 300–308.
- Sarhan, A. M., & Balakrishnan, N. (2007). A new class of bivariate distributions and its mixture. Journal of Multivariate Analysis, 98(7), 1508–1527.
- Shaked, M., & Shanthikumar, J. G. (2007). Stochastic Orders. New York: Springer.
- Tannous, O., Xing, L., Rui, P., Xie, M., & Ng, S. H. (2011). Redundancy allocation for series-parallel warm-standby systems. In Industrial Engineering and Engineering Management (IEEM), 2011 IEEE International Conference. IEEE, 1261–1265.
- Wang, D. Q., Lai, C. D., & Li, G. Y. (2003). Life distribution of series under the successive damage model. Journal of Systems Science and Complexity, 16(2), 191–194.
- Wu, Q., & Wu, S. (2011). Reliability analysis of two–unit cold standby repairable systems under poisson shocks. Applied Mathematics and Computation, 218(1), 171–182.
- Xing, L., Tannous, O., & Dugan, J. B. (2012). Reliability analysis of nonrepairable cold–standby systems using sequential binary decision diagrams. IEEE Transactions on Systems, Man, and Cybernetics – Part A: Systems and Humans, 42(3), 715–726.
- Yang, N., & Dhillon, B. S. (1995). Stochastic analysis of a general standby system with constant human error and arbitrary system repair rates. Microelectronics Reliability, 35(7), 1037–1045.
- Zhai, Q., Peng, R., Xing, L., & Yang, J. (2013). BDD-based reliability evaluation of k-out-of-(n + k) warm standby systems subject to fault-level coverage. Proceedings of the Institution of Mechanical Engineers, Part O: Journal of Risk and Reliability, 227(5), 540–548.
![Supercharge Your Next Research Paper: Research and write your next paper with Jenni AI.]({"type":"image" , "src" : "/sda/112446/MPU-L1EB.png"})