TY - JOUR
T1 - A competing risks model with multiply censored reliability data under multivariate weibull distributions
AU - Fan, Tsai Hung
AU - Wang, Yi Fu
AU - Ju, She Kai
N1 - Funding Information:
Manuscript received December 6, 2017; revised April 30, 2018, December 6, 2018, and February 24, 2019; accepted March 21, 2019. Date of publication April 26, 2019; date of current version May 28, 2019. The work of Tsai-Hung Fan was supported by the Ministry of Science and Technology in Taiwan under Grant MOST 105-2118-M008-003-MY2. The work of Yi-Fu Wang was supported by the Ministry of Science and Technology in Taiwan under Grant MOST 107-2118-M-194-002. Associate Editor: F. Sun. (Corresponding author: Tsai-Hung Fan.) T.-H. Fan and S.-K. Ju are with the Graduate Institute of Statistics, National Central University, Taoyuan City 32001, Taiwan (e-mail:,[email protected]; [email protected]).
Publisher Copyright:
© 1963-2012 IEEE.
PY - 2019/6
Y1 - 2019/6
N2 - A competing risks model is composed of more than one failure mode that naturally arises when reliability systems are made of two or more components. A series system fails if any of its components fail. As these components are all part of the same system, they may be correlated. In this paper, we consider a competing risks model with k failure modes and whose lifetimes follow a joint k-variate Marshall-Olkin Weibull distribution, when the data are multiply censored. Normally, each observation contains the failure time as well as the failure mode. In practice, however, it is common to have masked data in which the component that causes failure of the system is not observed. We apply the maximum likelihood approach via expectation-maximization algorithm, along with the missing information principle, to estimate the parameters and the standard errors of the maximum likelihood estimates. Statistical inference on the model parameters, the mean time to failure, and the quantiles of the failure time of the system as well as of the components are all developed. The proposed method is evaluated by a simulation study and also applied to two two-component real datasets successfully.
AB - A competing risks model is composed of more than one failure mode that naturally arises when reliability systems are made of two or more components. A series system fails if any of its components fail. As these components are all part of the same system, they may be correlated. In this paper, we consider a competing risks model with k failure modes and whose lifetimes follow a joint k-variate Marshall-Olkin Weibull distribution, when the data are multiply censored. Normally, each observation contains the failure time as well as the failure mode. In practice, however, it is common to have masked data in which the component that causes failure of the system is not observed. We apply the maximum likelihood approach via expectation-maximization algorithm, along with the missing information principle, to estimate the parameters and the standard errors of the maximum likelihood estimates. Statistical inference on the model parameters, the mean time to failure, and the quantiles of the failure time of the system as well as of the components are all developed. The proposed method is evaluated by a simulation study and also applied to two two-component real datasets successfully.
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U2 - 10.1109/TR.2019.2907518
DO - 10.1109/TR.2019.2907518
M3 - Article
AN - SCOPUS:85066928806
SN - 0018-9529
VL - 68
SP - 462
EP - 475
JO - IEEE Transactions on Reliability
JF - IEEE Transactions on Reliability
IS - 2
M1 - 8700612
ER -