https://orcid.org/0000-0001-6181-7127
References
- Birnbaum ZW. On a use of the Mann-Whitney statistic. In Proceedings of the third Berkeley symposium on mathematical statistics and probability. Berkeley (CA): University of California Press; 1956. p. 13–17.
- Birnbaum ZW, McCarty RC. A distribution-free upper confidence bound for Pr{Y <X}, based on independent samples of X and Y. Ann Math Stat. 1958;29:558–562.
- Domma F, Giordano S. A copula-based approach to account for dependence in stress-strength models. Stat Pap. 2013;54:807–826.
- Kotz S, Lumelskii Y, Pensky M. The stress–strength model and its generalizations: theory and applications. Singapore: World Scientific; 2003.
- Parzen E. Nonparametric statistical data modeling. J Am Stat Assoc. 1979;74:105–121.
- Gilchrist W. Statistical modelling with quantile functions. Boca Raton (FL): Chapman Hall/CRC; 2000.
- Nair NU, Sankaran PG, Balakrishnan N. Quantile-based reliability analysis. New York: Springer; 2013.
- Kayal S, Moharana R, Sunoj SM. Quantile-based study of (dynamic) inaccuracy measures. Probab Eng Informational Sci. 2020;34:183–199.
- Parzen E. Quantiles, parametric-select density estimations, and bi-information parameter estimators. [Internet] 1982. Available from: https://apps.dtic.mil/sti/citations/ADA117460.
- Cwik J, Mielniczuk J. Estimating density ratio with application to discriminant analysis. Commun Stat - Theory Methods. 1989;18:3057–3069.
- Zardasht V, Asadi M. Evaluation of P(Xt >Yt) when both Xt and Yt are residual lifetimes of two systems. Stat Neerl. 2010;64:460–481.
- Bhattacharyya GK, Johnson RA. Estimation of reliability in a multicomponent stress-strength model. J Am Stat Assoc. 1974;69:966–970.