References
- Aydoğdu, H., and M. Kara. 2012. Nonparametric estimation in α-series process. Computational Statistics & Data Analysis 56 (1):190–201. doi:10.1016/j.csda.2011.06.037.
- Aydoǧdu, H., B. Senoglu, and M. Kara. 2010. Application of MML methodology to an α-series process with Weibull distribution. Hacettepe Journal of Mathematics and Statistics 39:449–60.
- Braun, W. J., W. Li, and Y. Zhao. 2005. Properties of the geometric and related processes. Naval Research Logistics 52 (7):607–16. doi:10.1002/nav.20099.
- Braun, W. J., W. Li, and Y. Q. Zhao. 2008. Some theoretical properties of the geometric and α-series processes. Communications in Statistics - Theory and Methods 37 (9):1483–96. doi:10.1080/03610920701825999.
- Cheng, G., and L. Li. 2014. An optimal replacement policy for a degenerative system with two-types of failure states. Journal of Computational and Applied Mathematics 261:139–45. doi:10.1016/j.cam.2013.11.002.
- Cheng, G., B. Zhou, and L. Li. 2016. A semi-geometric process model for a deteriorating system and its optimal order-replacement policy. IEEE Transactions on Reliability 65 (2):582–11. doi:10.1109/TR.2015.2494687.
- Dong, W., S. Liu, L. Tao, Y. Cao, and Z. Fang. 2019. Reliability variation of multi-state components with inertial effect of deteriorating output performances. Reliability Engineering & System Safety 186:176–85. doi:10.1016/j.ress.2019.02.018.
- Eryilmaz, S. 2015. Assessment of a multi-state system under a shock model. Applied Mathematics and Computation 269:1–8. doi:10.1016/j.amc.2015.06.129.
- Finkelstein, M. 2010. A note on converging geometric-type processes. Journal of Applied Probability 47 (2):601–607. doi:10.1239/jap/1276784913.
- Huang, J., M. Zuo, and Y. Wu. 2000. Generalized multi-state k-out-of-n:G systems. IEEE Transactions on Reliability 49 (1):105–11. doi:10.1109/24.855543.
- Kara, M., Ö. Altındağ, M. H. Pekalp, and H. Aydoğdu. 2019. Parameter estimation in α-process with lognormal distribution. Communications in Statistics - Theory and Methods 48 (20):4976–98. doi:10.1080/03610926.2018.1504075.
- Kara, M., O. Türksen, and H. Aydoǧdu. 2017. Statistical inference for α-series process with the inverse Gaussian distribution. Communications in Statistics–Simulation and Computation 46:4930–50.
- Lam, Y. 1988. A note on the optimal replacement problem. Advances in Applied Probability 20:479–82.
- Lam, Y. 2007. The geometric process and its applications. Singapore: World Scientific Publishing Company.
- Lam, Y., and Y. Zhang. 2003. A geometric process maintenance model for a deteriorating system under a random environment. IEEE Transactions on Reliability 52:83–89.
- Lisnianski, A., and G. Levitin. 2003. Multi-state system reliability: Assessment, optimization and applications. Singapore: World Scientific Publishing Company.
- Mi, J., Y. Li, W. Peng, and h Huang. 2018. Reliability analysis of complex multi-state system with common cause failure based on evidential networks. Reliability Engineering & System Safety 174:71–81. doi:10.1016/j.ress.2018.02.021.
- Nakagawa, T. 2005. Maintenance theory of reliability. London: Springer-Verlag.
- Tian, Z., M. Zuo, and R. C. Yam. 2008. Multi-state k-out-of-n systems and their performance evaluation. IIE Transactions 41 (1):32–44. doi:10.1080/07408170802322655.
- Wang, G., and Y. Zhang. 2009. A bivariate mixed policy for a simple repairable system based on preventive repair and failure repair. Applied Mathematical Modelling 33 (8):3354–59. doi:10.1016/j.apm.2008.11.008.
- Wang, G., and Y. Zhang. 2014. Geometric process model for a system with inspections and preventive repair. Computers & Industrial Engineering 75:13–19. doi:10.1016/j.cie.2014.06.007.
- Wang, J., J. Ye, Q. Ma, and P. Xie. 2019. An extended geometric process repairable model with its repairman having vacation. Annals of Operations Research. Advance online publication. doi:10.1007/s10479-019-03187-1.
- Yu, M., Y. Tang, and Y. Fu. 2013. A geometric process model for M/PH(M/PH)1/K queue with new service machine procurement lead time. International Journal of Systems Science 44:1061–75.
- Yu, M., Y. Tang, Y. Fu, L. Pan, and X. Tang. 2012. A deteriorating repairable system with stochastic lead time and replaceable repair facility. Computers & Industrial Engineering 62 (2):609–15. doi:10.1016/j.cie.2011.11.023.
- Yu, M., Y. Tang, L. Liu, and J. Cheng. 2013. A phase-type geometric process repair model with spare device procurement and repairman’s multiple vacations. European Journal of Operational Research 225 (2):310–23. doi:10.1016/j.ejor.2012.09.029.
- Yu, M., Y. Tang, W. Wu, and J. Zhou. 2014. Optimal order-replacement policy for a phase-type geometric process model with extreme shocks. Applied Mathematical Modelling 38 (17–18):4323–32. doi:10.1016/j.apm.2014.02.010.
- Zhang, Y. 1994. A bivariate optimal replacement policy for a repairable system. Journal of Applied Probability 31 (4):1123–27. doi:10.2307/3215336.
- Zhang, Y., and G. Wang. 2017. A geometric process repair model for a cold standby repairable system with imperfect delay repair and priority in use. Communications in Statistics - Theory and Methods 46 (16):8046–58. doi:10.1080/03610926.2016.1171356.