References
- Jose, J. K., and M. Manoharan. 2016. Beta half-logistic distribution – A new probability model for lifetime data. Journal of Statistics and Management Systems 19 (4):587–604. doi:10.1080/09720510.2015.1103457.
- Jose J. K., T. Xavier, and M. Drisya. 2019. Estimation of stress-strength reliability for Kumaraswamy half-logistic distribution. Journal of Probability and Statistical Science 17 (2):141–54.
- Krishnarani, S. D. 2016. On a power transformation of half-logistic distribution. Journal of Probability and Statistics 2016:1–10. doi:10.1155/2016/2084236.
- Kundu, D., and R. D. Gupta. 2005. Estimation of P(Y<X) for the generalized exponential distribution. Metrika 61:291–308.
- Kundu, D., and R. D. Gupta. 2006. Estimation of P(Y<X) for Weibull distribution. IEEE Transactions on Reliability 55 (2):270–80. doi:10.1109/TR.2006.874918.
- Kundu, D., and M. Z. Raqab. 2009. Estimation of R=P(Y<X) for three-parameter Weibull distribution. Statistics & Probability Letters 79:1839–46. doi:10.1016/j.spl.2009.05.026.
- Kundu, D., and M. Z. Raqab. 2013. Estimation of R=P(Y<X) for three-parameter generalized Rayleigh distribution. Journal of Statistical Computation and Simulation 85:725–39.
- Mathai, A. M. 2012. Stochastic models under power transformations and exponentiation. Journal of the Indian Society for Probability and Statistics 13 (2012):1–19.
- Mathai, A. M. and Haubould, H. J. 2008. Special Function for Applied Scientists. New York: Springer-Verlag.
- Mokhlis, N. A. 2005. Reliability of a stress-strength model with Burr type III distributions. Communications in Statistics – Theory and Methods 34 (7):1643–57. doi:10.1081/STA-200063183.
- Rao, G. S. 2015. Estimation of stress-strength reliability from truncated type-I generalised logistic distribution. International Journal of Mathematics in Operational Research 7 (4):372–82. doi:10.1504/IJMOR.2015.070188.
- Rao, G. S., K. Rosaiah, and M. S. Babu. 2016. Estimation of stress-strength reliability from exponentiated Fréchet distribution. The International Journal of Advanced Manufacturing Technology 86 (9–12):3041–9. doi:10.1007/s00170-016-8404-z.
- Raqab, M. Z., M. T. Madi, and D. Kundu. 2008. Estimation of P(Y<X) for the three-parameter generalized exponential distribution. Communications in Statistics – Theory and Methods 37 (18):2854–64.
- Sathe, Y. S., and S. P. Shah. 1981. On estimating P(Y<X) for the exponential distribution. Communications in Statistics – Theory and Methods 10 (1):39–47.
- Smith, R. L., and J. C. Naylor. 1987. A comparison of maximum likelihood and Bayesian estimators for the three-parameter Weibull distribution. Journal of the Royal Statistical Society. Series C (Applied Statistics) 36 (3):358–69. doi:10.2307/2347795.
- Surles, J. G., and W. J. Padgett. 1998. Inference for P(Y<X) in the Burr type X model. Journal of Applied Statistical Science 7 (4):225–38.
- Surles, J. G., and W. J. Padgett. 2001. Inference for reliability and stress-strength for a scaled Burr-type X distribution. Lifetime Data Analysis 7 (2):187–200.
- Tong, H. 1974. A note on the estimation of P(Y<X) in the exponential case. Technometrics 16 (4):625. (Errara 1975, Vol. 17; 395).
- Tong, H. 1977. On the estimation of P(Y<X) for exponential families. IEEE Transactions on Reliability 26 (1):54–6. doi:10.1109/TR.1977.5215074.