Optimal Design for Destructive Degradation Tests With Random Initial Degradation Values Using the Wiener Process

This study investigates modeling, estimation and optimization of destructive degradation tests (DDTs) for highly reliable products with random initial degradation values. It is common to observe that the degradation paths of distinct products start from different values specified by a random variable. The random initial value introduces additional uncertainties to the degradation of the product. In this study, Wiener-process-based degradation models are developed for products with random initial values. We first consider a DDT without stress acceleration. In a DDT, the measurement of the degradation destroys a test unit and, thus, only one measurement is available for each unit. Closed-form maximum likelihood (ML) estimators are derived. Then, an accelerated DDT (ADDT) is considered. Based on these results, we investigate optimal designs of both DDT and ADDT with the objective of minimizing the asymptotic variance of the estimated p th-quantile of the failure time distribution under use conditions. The optimal test plans have to be obtained through a numerical approach. Optimality of the plans is verified by the general equivalence theorem. An adhesive bond example with real degradation data is analyzed to show the performance of the proposed methods.

[1]  Ye Zhang,et al.  Analysis of Destructive Degradation Tests for a Product With Random Degradation Initiation Time , 2015, IEEE Transactions on Reliability.

[2]  Narayanaswamy Balakrishnan,et al.  Optimal Step-Stress Accelerated Degradation Test Plan for Gamma Degradation Processes , 2009, IEEE Transactions on Reliability.

[3]  William Q. Meeker,et al.  Accelerated Destructive Degradation Test Planning , 2009, Technometrics.

[4]  Min Xie,et al.  Stochastic modelling and analysis of degradation for highly reliable products , 2015 .

[5]  Jian Yang,et al.  Constrained hierarchical modeling of degradation data in tissue-engineered scaffold fabrication , 2016 .

[6]  Wayne Nelson,et al.  Analysis of Performance-Degradation Data from Accelerated Tests , 1981, IEEE Transactions on Reliability.

[7]  J. Bert Keats,et al.  Statistical Methods for Reliability Data , 1999 .

[8]  Narayanaswamy Balakrishnan,et al.  Mis-specification analyses of gamma and Wiener degradation processes , 2011 .

[9]  William Q. Meeker,et al.  Accelerated Destructive Degradation Tests Robust to Distribution Misspecification , 2011, IEEE Transactions on Reliability.

[10]  Suk Joo Bae,et al.  Degradation models and implied lifetime distributions , 2007, Reliab. Eng. Syst. Saf..

[11]  Narayanaswamy Balakrishnan,et al.  Optimal Design for Degradation Tests Based on Gamma Processes With Random Effects , 2012, IEEE Transactions on Reliability.

[12]  William Q. Meeker,et al.  Planning Accelerated Destructive Degradation Test with Competing Risks , 2010 .

[13]  G A Whitmore,et al.  Estimating degradation by a wiener diffusion process subject to measurement error , 1995, Lifetime data analysis.

[14]  Guangbin Yang Life cycle reliability engineering , 2007 .

[15]  Ewan Macarthur,et al.  Accelerated Testing: Statistical Models, Test Plans, and Data Analysis , 1990 .

[16]  Xiao Wang,et al.  Wiener processes with random effects for degradation data , 2010, J. Multivar. Anal..

[17]  W. J. Padgett,et al.  Accelerated Degradation Models for Failure Based on Geometric Brownian Motion and Gamma Processes , 2005, Lifetime data analysis.

[18]  Narayanaswamy Balakrishnan,et al.  Optimal Design for Accelerated Destructive Degradation Tests , 2013 .

[19]  Sheng-Tsaing Tseng,et al.  Optimal design for step-stress accelerated degradation tests , 2006, IEEE Trans. Reliab..

[20]  M. Crowder,et al.  Covariates and Random Effects in a Gamma Process Model with Application to Degradation and Failure , 2004, Lifetime data analysis.

[21]  Nan Chen,et al.  The Inverse Gaussian Process as a Degradation Model , 2014, Technometrics.

[22]  Nan Chen,et al.  A new class of Wiener process models for degradation analysis , 2015, Reliab. Eng. Syst. Saf..

[23]  Yili Hong,et al.  Planning accelerated destructive degradation tests with initiation time , 2015, 2015 Annual Reliability and Maintainability Symposium (RAMS).

[24]  Steven M. Cox,et al.  Stochastic models for degradation-based reliability , 2005 .

[25]  M. H. Moore A Convex Matrix Function , 1973 .

[26]  G. A. Whitmore,et al.  Failure Inference From a Marker Process Based on a Bivariate Wiener Model , 1998, Lifetime data analysis.

[27]  G A Whitmore,et al.  Modelling Accelerated Degradation Data Using Wiener Diffusion With A Time Scale Transformation , 1997, Lifetime data analysis.

[28]  William Q. Meeker,et al.  Accelerated Destructive Degradation Tests: Data, Models, and Analysis , 2003 .

[29]  Xiao Wang,et al.  An Inverse Gaussian Process Model for Degradation Data , 2010, Technometrics.

[30]  B. Yum,et al.  Optimal design of accelerated degradation tests based on Wiener process models , 2011 .

[31]  William Q. Meeker,et al.  Bayesian Methods for Accelerated Destructive Degradation Test Planning , 2012, IEEE Transactions on Reliability.