Sequential fixed-accuracy confidence intervals for the stress–strength reliability parameter for the exponential distribution: two-stage sampling procedure

In this paper, a two-stage sequential estimation procedure is considered to construct fixed-accuracy confidence intervals of the reliability parameter R under the stress–strength model when the stress and strength are independent exponential random variables with different scale parameters. The exact distribution of the total sample size, explicit formulas for the expected value, and mean squared error of the maximum likelihood estimator of the reliability parameter under the stress–strength model are provided under the two-stage sequential procedure. Performances of the proposed methodology are investigated with the help of simulations. Finally, using three pairs of real datasets, the procedure is clearly illustrated. We used MATLAB in order to implement computations, simulation studies, and real data analysis.

[1]  Sudeep R. Bapat,et al.  Multistage estimation of the difference of locations of two negative exponential populations under a modified Linex loss function: Real data illustrations from cancer studies and reliability analysis , 2016 .

[2]  Debasis Kundu,et al.  Estimation of for Weibull Distributions , 2006 .

[3]  J. E. Freund A Bivariate Extension of the Exponential Distribution , 1961 .

[4]  A. N. Patowary,et al.  Interference theory of reliability: a review , 2013, Int. J. Syst. Assur. Eng. Manag..

[5]  H. Tong,et al.  A Note on the Estimation of Pr {Y < X} in the Exponential Case , 1974 .

[6]  On fixed-accuracy and bounded accuracy confidence interval estimation problems in Fisher’s “Nile” example , 2016 .

[7]  On the estimation ofPr{Y, 1980 .

[8]  Adnan M. Awad,et al.  Some inference results on pr(x < y) in the bivariate exponential model , 1981 .

[9]  Sudeep R. Bapat Purely Sequential Fixed Accuracy Confidence Intervals for P(X < Y) under Bivariate Exponential Models , 2018, American Journal of Mathematical and Management Sciences.

[10]  I. Olkin,et al.  A generalized bivariate exponential distribution , 1967 .

[11]  Anne Chao,et al.  On Comparing Estimators of Pr{Y < X} in the Exponential Case , 1982, IEEE Transactions on Reliability.

[12]  B. Efron Logistic Regression, Survival Analysis, and the Kaplan-Meier Curve , 1988 .

[13]  W. R. Schucany,et al.  Efficient Estimation of P(Y < X) in the Exponential Case , 1976 .

[14]  E. Chiodo Model robustness analysis of a Bayes stress-strength reliability estimation with limited data , 2014, 2014 International Symposium on Power Electronics, Electrical Drives, Automation and Motion.

[15]  C. Stein A Two-Sample Test for a Linear Hypothesis Whose Power is Independent of the Variance , 1945 .

[16]  Hagos Fesshaye,et al.  On Modeling of Lifetime Data Using One Parameter Akash, Lindley and Exponential Distributions , 2016 .

[17]  Seymour Geisser,et al.  Estimation of the Probability that Y , 1971 .

[18]  Y. S. Sathe,et al.  On estimating P(X > Y) for the exponential distribution , 1981 .

[19]  N. Mukhopadhyay,et al.  Exact Bounded Risk Estimation When the Terminal Sample Size and Estimator Are Dependent: The Exponential Case , 2006 .

[20]  N. Mukhopadhyay,et al.  Purely Sequential and Two-Stage Fixed-Accuracy Confidence Interval Estimation Methods for Count Data from Negative Binomial Distributions in Statistical Ecology: One-Sample and Two-Sample Problems , 2014 .

[21]  N. Mukhopadhyay,et al.  A general sequential fixed-accuracy confidence interval estimation methodology for a positive parameter: illustrations using health and safety data , 2016 .

[22]  Samuel Kotz,et al.  Reliability for some bivariate exponential distributions , 2006 .

[23]  A. Biswas,et al.  Fixed Width Confidence Interval of P ( X < Y ) in Partial Sequential Sampling Scheme , 2003 .

[24]  Udo Kamps,et al.  The UMVUE ofP(X, 1997 .

[25]  Bounded risk estimation of the hazard rate function of the exponential distribution: Two-stage procedure , 2017 .

[26]  Debasis Kundu,et al.  Estimation of P[Y, 2006, IEEE Transactions on Reliability.

[27]  Longdi Cheng,et al.  Study on the breaking strength of jute fibres using modified Weibull distribution , 2009 .

[28]  Z. Birnbaum,et al.  A Distribution-Free Upper Confidence Bound for $\Pr \{Y < X\}$, Based on Independent Samples of $X$ and $Y$ , 1958 .

[29]  Hamzeh Torabi,et al.  Stress-strength Reliability of Exponential Distribution based on Type-I Progressively Hybrid Censored Samples , 2016 .

[30]  Richard A. Johnson,et al.  3 Stress-strength models for reliability , 1988 .

[31]  Minimum risk sequential point estimation of the stress-strength reliability parameter for exponential distribution , 2019, Sequential Analysis.