Bayesian Estimation and Prediction Based on Constant Stress-Partially Accelerated Life Testing for Topp Leone-Inverted Kumaraswamy Distribution
G. R. Al-Dayian
Statistics Department, Faculty of Commerce, AL-Azhar University (Girls’ Branch), Cairo, Egypt.
A. A. El-Helbawy *
Statistics Department, Faculty of Commerce, AL-Azhar University (Girls’ Branch), Cairo, Egypt.
R. M. Refaey
Statistics Department, Faculty of Commerce, AL-Azhar University (Girls’ Branch), Cairo, Egypt.
S. M. Behairy
Statistics Department, Faculty of Commerce, AL-Azhar University (Girls’ Branch), Cairo, Egypt.
*Author to whom correspondence should be addressed.
Abstract
Accelerated life testing or partially accelerated life tests is very important in life testing experiments because it saves time and cost. Partially accelerated life tests are used when the data obtained from accelerated life tests cannot be extrapolated to usual conditions. This paper proposes, constant–stress partially accelerated life test using Type II censored samples, assuming that the lifetime of items under usual condition have the Topp Leone-inverted Kumaraswamy distribution. The Bayes estimators for the parameters, acceleration factor, reliability and hazard rate function are obtained. Bayes estimators based on informative priors is derived under the balanced square error loss function as a symmetric loss function and balanced linear exponential loss function as an asymmetric loss function. Also, Bayesian prediction (point and bounds) is considered for a future observation based on Type-II censored under two samples prediction. Numerical studies are given and some interesting comparisons are presented to illustrate the theoretical results. Moreover, the results are applied to real data sets.
Keywords: Topp Leone-inverted Kumaraswamy distribution, censored samples, balanced, square error, LINEX loss functions, Bayesian two-sample prediction, MCMC