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Journal of Statistics and Management Systems Volume 19, 2016 - Issue 4
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Original Articles

Transmuted Power Function Distribution : A more flexible Distribution

Mirza Naveed ShahzadDepartment of Statistics, University of Gujrat, Gujrat, PakistanCorrespondence[email protected]
&
Zahid AsgharDepartment of Statistics, Quaid-i-Azam University, Islamabad, Pakistan
Pages 519-539 | Received 01 Jul 2014, Published online: 14 Sep 2016

References

  • Ahsanullah, M. and Lutful-Kabir, A.B.M. (1974). A characterization of the Power Function distribution. The Canadian journal of Statistics 2:95–98. doi: 10.2307/3314967
  • Ali, M.M., Woo, J. and Nadarajah, S. (2005). On the Ratio X/(X + Y) for the Power Function Distribution. Pakistan Journal of Statistics 2:131–138.
  • Aryal, G. R. (2013). Transmuted log-logistic distribution. Journal of Statistics Applications & Probability, 2(1), 11–20. doi: 10.12785/jsap/020102
  • Aryal, G. R., & Tsokos, C. P. (2009). On the transmuted extreme value distribution with application. Nonlinear Analysis: Theory, Methods & Applications, 71(12), e1401–e1407. doi: 10.1016/j.na.2009.01.168
  • Aryal, G. R., & Tsokos, C. P. (2011). Transmuted Weibull Distribution: A Generalization of the Weibull Probability Distribution. European Journal of Pure & Applied Mathematics, 4(2).
  • Ashour, S. K., & Eltehiwy, M. A. (2013). Transmuted Exponentiated Lomax Distribution. Australian Journal of Basic & Applied Sciences, 7(7).
  • Bayazit, M., & Önöz, B. (2002). LL-moments for estimating low flow quantiles/Estimation des quantiles d’étiage grâce aux LL-moments. Hydrological sciences journal, 47(5), 707–720. doi: 10.1080/02626660209492975
  • Chang, S.K. (2007). Characterization of the Power Function by the Independence of Record values. Journal of the Chungcheong mathematical society, 20:140–145.
  • Elamir, E. A., & Seheult, A. H. (2003). Trimmed L-moments. Computational Statistics & Data Analysis, 43(3), 299–314. doi: 10.1016/S0167-9473(02)00250-5
  • Elbatal, I. (2013). • Transmuted modified inverse Weibull Distribution: A Generalization of the modified inverse Weibull probability distribution. International Journal of Mathematical Archive (IJMA) ISSN 2229–5046, 4(8).
  • Elbatal, I., & Elgarhy, M. (2013). Transmuted Quasi Lindley Distribution: A Generalization of the Quasi Lindley Distribution. Int. J. Pure Appl. Sci. Technol, 18(2), 59–70.
  • Hosking, J. R. (1990). L-moments: analysis and estimation of distributions using linear combinations of order statistics. Journal of the Royal Statistical Society. Series B (Methodological), 105–124.
  • Mendenhall, W., & Hader, R. J. (1958). Estimation of parameters of mixed exponentially distributed failure time distributions from censored life test data. Biometrika, 45(3–4), 504–520. doi: 10.1093/biomet/45.3-4.504
  • Meniconi, M., & Barry, D. M. (1996). The power function distribution: a useful and simple distribution to assess electrical component reliability. Microelectronics Reliability, 36(9), 1207–1212. doi: 10.1016/0026-2714(95)00053-4
  • Merovci, F. (2013). Transmuted generalized Rayleigh distribution. Journal of Statistics Applications and Probability, 2(3), 1–12.
  • Rahman, H., Roy, M.K. and Baizid, A.R. (2012). Bayes Estimation under Conjugate Prior for the Case of Power Function Distribution. American Journal of Mathematics and Statistics 2:44–48. doi: 10.5923/j.ajms.20120203.06
  • Saleem, M., Aslam, M., & Economou, P. (2010). On the Bayesian analysis of the mixture of power function distribution using the complete and the censored sample. Journal of Applied Statistics, 37(1), 25–40. doi: 10.1080/02664760902914557
  • Saran, J. and Pandey, A. (2004). Estimation of parameters of a Power function distribution and its characterization by kth record values. Statistica, anno LXIV 3:523–536.
  • Shahzad, M. N., & Asghar, Z. (2016). Transmuted Dagum Distribution: A more flexible and broad shaped hazard function model. Hacettepe Journal of Mathematics and Statistics, 45(1), 1–18.
  • Shaw, W. T., & Buckley, I. R. (2009). The alchemy of probability distributions: beyond Gram-Charlier expansions, and a skew-kurtotic-normal distribution from a rank transmutation map. arXiv preprint arXiv:0901.0434.
  • Sinha, S.K., Singh, P., Singh, D.C. and Singh, R. (2008). Preliminary test estimator for scale parameter of the power function distribution. Journal of Reliability and Statistics Studies 1:18–27.
  • Tavangar, M. (2011). Power function distribution characterized by dual generalized order statistics. Journal of Iranian Statistical Society, 10(1), 13–27.
  • Wang, Q. J. (1997). LH moments for statistical analysis of extreme events. Water Resources Research, 33(12), 2841–2848. doi: 10.1029/97WR02134

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