References
- Abdelhameed, M. 1975. A gamma wear process. IEEE Transactions on Reliability 2:152–3.
- Celeux, G., and J. Diebolt. 1985. The SEM algorithm: A probabilistic teacher algorithm derived from the EM algorithm for the mixture problem. Computational Statistics Quarterly 2:73–82.
- Chen, N., Z. Ye, Y. Xiang, and L. Zhang. 2015. Condition-based maintenance using the inverse Gaussian degradation model. European Journal of Operational Research 243 (1):190–9. doi:10.1016/j.ejor.2014.11.029.
- Diebolt, J., and G. Celeux. 1993. Asymptotic properties of a stochastic EM algorithm for estimating mixing proportions. Communications in Statistics: Stochastic Models 9 (4):599–613. doi:10.1080/15326349308807283.
- Diebolt, J., and E. H. S. Ip. 1996. Stochastic EM: Method and application. In Markov Chain Monte Carlo in practice, ed. W. R. Gilks, S. Richardson, and D. J. Spiegelhalter, 259–73. London: Chapman & Hall.
- Erişoğlu, Ü., M. Erişoğlu, and H. Erol. 2011. A mixture model of two different distributions approach to the analysis of heterogeneous survival data. World Academy of Science, Engineering and Technology 78:41–5.
- Everitt, B. S. 1996. An introduction to finite mixture distributions. Statistical Methods in Medical Research 5 (2):107–27. doi:10.1177/096228029600500202.
- Fugate, M. L., M. S. Hamada, and B. P. Weaver. 2017. Analyzing degradation data with a random effects spline regression model. Quality Engineering 29 (3):358–65. doi:10.1080/08982112.2017.1307390.
- Guo, H., A. Gerokostopoulos, H. Liao, and P. Niu. 2013. Modeling and analysis for degradation with an initiation time. In 2013 Proceedings Annual Reliability and Maintainability Symposium (RAMS), 1–6. Orlando, FL: IEEE.
- Hamada, M. S. 2005. Using degradation data to assess reliability. Quality Engineering 17 (4):615–20. doi:10.1080/08982110500225489.
- Hao, S., and J. Yang. 2019. Dependent competing failure modeling for the GIL subject to partial discharge and air leakage with random degradation initiation time. IEEE Transactions on Reliability 68 (3):1070–9. doi:10.1109/TR.2018.2875819.
- Hong, L., and Z. Ye. 2017. When is acceleration unnecessary in a degradation test? Statistica Sinica 27:1461–83.
- Hu, L., L. Li, and Q. Hu. 2017. Degradation modeling, analysis, and applications on lifetime prediction. In Statistical modeling for degradation data, ed. D. G. Chen, Y. Lio, H. Ng, and T. R. Tsai, 43–66. Singapore: Springer.
- Jiang, P. 2022. Statistical inference of Wiener constant-stress accelerated degradation model with random effects. Mathematics 10 (16):2863. doi:10.3390/math10162863.
- Kahle, W., and A. Lehmann. 2010. The Wiener process as a degradation model: Modeling and parameter estimation. In Advances in degradation modeling, ed. M. S. Nikulin, N. Limnios, N. Balakrishnan, W. Kahle, and C. Huber-Carol, 127–46. Boston, MA: Birkhäuser Boston.
- Li, Z., Q. Hu, Q. Yang, and D. Yu. 2022. Statistical analysis and optimal inspection planning for lifetime delayed gamma degradation processes. Quality and Reliability Engineering International 38 (6):2986–3001. doi:10.1002/qre.2969.
- Li, Z., F. Wang, C. Wang, Q. Hu, and D. Yu. 2021. Reliability modeling and evaluation of lifetime delayed degradation process with nondestructive testing. Reliability Engineering & System Safety 208:107358. doi:10.1016/j.ress.2020.107358.
- Liu, D., S. Wang, C. Zhang, and M. Tomovic. 2018. Bayesian model averaging based reliability analysis method for monotonic degradation dataset based on inverse Gaussian process and Gamma process. Reliability Engineering & System Safety 180:25–38. doi:10.1016/j.ress.2018.06.019.
- Lu, C. J., and W. Q. Meeker. 1993. Using degradation measures to estimate a time-to-failure distribution. Technometrics 35 (2):161–74. doi:10.1080/00401706.1993.10485038.
- Lubrano, M., and A. A. J. Ndoye. 2016. Income inequality decomposition using a finite mixture of log-normal distributions: A Bayesian approach. Computational Statistics & Data Analysis 100:830–46. doi:10.1016/j.csda.2014.10.009.
- Marín, J. M., M. T. Rodríguez-Bernal, and M. P. Wiper. 2005. Using Weibull mixture distributions to model heterogeneous survival data. Communications in Statistics - Simulation and Computation 34 (3):673–84. doi:10.1081/SAC-200068372.
- Mclachlan, G. J., and T. Krishnan. 2008. The EM algorithm and extensions. Hoboken, NJ: John Wiley & Sons.
- Meeker, W. Q. 2010. Trends in the statistical assessment of reliability. In Advances in degradation modeling, ed. M. S. Nikulin, N. Limnios, N. Balakrishnan, W. Kahle, and C. Huber-Carol, 3–16. Boston, MA: Birkhäuser Boston.
- Meeker, W. Q., and L. A. Escobar. 1998. Statistical methods for reliability data. New York: John Wiley & Sons.
- Mendenhall, W., and R. J. Hader. 1958. Estimation of parameters of mixed exponentially distributed failure time distributions from censored life test data. Biometrika 45 (3–4):504–20. doi:10.1093/biomet/45.3-4.504.
- Mercier, S., and G. Verdier. 2022. On the modeling of dependence between univariate Lévy wear processes and impact on the reliability function. Applied Stochastic Models in Business and Industry doi:10.1002/asmb.2726.
- Pan, D., J. Liu, F. Huang, J. Cao, and A. Alsaedi. 2017. A Wiener process model with truncated normal distribution for reliability analysis. Applied Mathematical Modelling 50:333–46. doi:10.1016/j.apm.2017.05.049.
- Pan, Z., and Q. Sun. 2014. Optimal design for step-stress accelerated degradation test with multiple performance characteristics based on gamma processes. Communications in Statistics - Simulation and Computation 43 (2):298–314. doi:10.1080/03610918.2012.700749.
- Paroissin, C. 2016. Inference for the Wiener process with random initiation time. IEEE Transactions on Reliability 65 (1):147–57. doi:10.1109/TR.2015.2456056.
- Peng, H., and Q. Feng. 2013. Reliability modeling for ultrathin gate oxides subject to logistic degradation processes with random onset time. Quality and Reliability Engineering International 29 (5):709–18. doi:10.1002/qre.1421.
- Song, K., and L. Cui. 2022. A common random effect induced bivariate gamma degradation process with application to remaining useful life prediction. Reliability Engineering & System Safety 219:108200. doi:10.1016/j.ress.2021.108200.
- Wang, X. 2010. Wiener processes with random effects for degradation data. Journal of Multivariate Analysis 101 (2):340–51. doi:10.1016/j.jmva.2008.12.007.
- Wang, X., N. Balakrishnan, and B. Guo. 2016. Residual life estimation based on a generalized Wiener process with skew-normal random effects. Communications in Statistics - Simulation and Computation 45 (6):2158–81. doi:10.1080/03610918.2014.894057.
- Wang, X., P. Jiang, B. Guo, and Z. Cheng. 2014. Real-time reliability evaluation with a general Wiener process-based degradation model. Quality and Reliability Engineering International 30 (2):205–20. doi:10.1002/qre.1489.
- Wang, X., and D. Xu. 2010. An inverse Gaussian process model for degradation data. Technometrics 52 (2):188–97. doi:10.1198/TECH.2009.08197.
- Xiang, Y., D. W. Coit, and Q. Feng. 2013. n Subpopulations experiencing stochastic degradation: Reliability modeling, burn-in, and preventive replacement optimization. IIE Transactions 45 (4):391–408. doi:10.1080/0740817X.2012.689124.
- Xu, A., J. Hu, and P. Wang. 2020. Degradation modeling with subpopulation heterogeneities based on the inverse Gaussian process. Applied Mathematical Modelling 81:177–93. doi:10.1016/j.apm.2019.12.017.
- Yan, B., X. Ma, L. Yang, H. Wang, and T. Wu. 2020. A novel degradation-rate-volatility related effect Wiener process model with its extension to accelerated ageing data analysis. Reliability Engineering & System Safety 204:107138. doi:10.1016/j.ress.2020.107138.
- Ye, Z., and N. Chen. 2014. The inverse Gaussian process as a degradation model. Technometrics 56 (3):302–11. doi:10.1080/00401706.2013.830074.
- Ye, Z., Y. Hong, and Y. Xie. 2013. How do heterogeneities in operating environments affect field failure predictions and test planning? The Annals of Applied Statistics 7 (4):2249–71. doi:10.1214/13-AOAS666.
- Ye, Z., and H. K. T. Ng. 2014. On analysis of incomplete field failure data. The Annals of Applied Statistics 8 (3):1713–27. doi:10.1214/14-AOAS752.
- Ye, Z., and M. Xie. 2015. Stochastic modelling and analysis of degradation for highly reliable products. Applied Stochastic Models in Business and Industry 31 (1):16–32. doi:10.1002/asmb.2063.
- Yuan, T., and Y. Ji. 2015. A hierarchical Bayesian degradation model for heterogeneous data. IEEE Transactions on Reliability 64 (1):63–70. doi:10.1109/TR.2014.2354934.
- Zhai, Q., P. Chen, L. Hong, and L. Shen. 2018. A random-effects Wiener degradation model based on accelerated failure time. Reliability Engineering & System Safety 180:94–103. doi:10.1016/j.ress.2018.07.003.
- Zhang, Y., and H. Liao. 2015. Analysis of destructive degradation tests for a product with random degradation initiation time. IEEE Transactions on Reliability 64 (1):516–27. doi:10.1109/TR.2014.2336411.
- Zhang, Z., X. Si, C. Hu, and Y. Lei. 2018. Degradation data analysis and remaining useful life estimation: A review on Wiener-process-based methods. European Journal of Operational Research 271 (3):775–96. doi:10.1016/j.ejor.2018.02.033.
- Zheng, B., C. Chen, Y. Lin, X. Ye, and G. Zhai. 2023a. Reliability analysis based on a bivariate degradation model considering random initial state and its correlation with degradation rate. IEEE Transactions on Reliability 72 (1):37–48. doi:10.1109/TR.2022.3172416.
- Zheng, H., X. Kong, H. Xu, and J. Yang. 2021. Reliability analysis of products based on proportional hazard model with degradation trend and environmental factor. Reliability Engineering & System Safety 216:107964. doi:10.1016/j.ress.2021.107964.
- Zheng, H., J. Yang, H. Xu, and Y. Zhao. 2023b. Reliability acceptance sampling plan for degraded products subject to Wiener process with unit heterogeneity. Reliability Engineering & System Safety 229:108877. doi:10.1016/j.ress.2022.108877.
- Zhou, S., A. Xu, Y. Lian, and Y. Tang. 2021. Variational Bayesian analysis for Wiener degradation model with random effects. Communications in Statistics - Theory and Methods 50 (16):3769–89. doi:10.1080/03610926.2020.1846747.