Asymptotic Comparison Between Constant-stress Testing and Step-stress Testing for Type-I Censored Data from Exponential Distribution |
| |
| Authors: | David Han H.K.T. Ng |
| |
| Affiliation: | 1. Department of Management Science and Statistics, University of Texas at San Antonio, San Antonio, Texas, USAdavid.han@utsa.edu;3. Department of Statistical Science, Southern Methodist University at Dallas, Dallas, Texas, USA |
| |
| Abstract: | By running the life tests at higher stress levels than normal operating conditions, accelerated life testing quickly yields information on the lifetime distribution of a test unit. The lifetime at the design stress is then estimated through extrapolation using a regression model. In constant-stress testing, a unit is tested at a fixed stress level until failure or the termination time point of the test, while step-stress testing allows the experimenter to gradually increase the stress levels at some pre-fixed time points during the test. In this article, the optimal k-level constant-stress and step-stress accelerated life tests are compared for the exponential failure data under Type-I censoring. The objective is to quantify the advantage of using the step-stress testing relative to the constant-stress one. A log-linear relationship between the mean lifetime parameter and stress level is assumed and the cumulative exposure model holds for the effect of changing stress in step-stress testing. The optimal design point is then determined under C-optimality, D-optimality, and A-optimality criteria. The efficiency of step-stress testing compared to constant-stress testing is discussed in terms of the ratio of optimal objective functions based on the information matrix. |
| |
| Keywords: | Accelerated life testing Change-point Constant-stress testing Cumulative exposure model Fisher information Maximum likelihood estimation Optimal allocation Optimal regression design Step-stress testing Type-I censoring |
|
|
