Abstract
The new continuous class of probability distribution named the Power Burr X-T (PBX-T) family is proposed in this paper. The essential characteristics of the PBX-T family of distributions, i.e. conventional moments and associated procedures, stress-strength reliability, and Rényi entropy, are derived and studied. Some special models belonging to the new family have been comprehensively explored concerning their shapes. Extensive simulations have been conducted to compare the maximum likelihood (ML) estimates with other classical estimators. It is found that the mean squared errors and the bias of the ML estimates are relatively least for large samples. Moreover, real-life applications from medical and engineering fields have been used to demonstrate the potentiality and adequacy of the suggested sub-models from the PBX-T family. The values of observed goodness-of-fit measures show that the sub-models of the suggested family of distributions are superior in adequacy parallel to the other generalized models.
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References
Afify AZ, Alizadeh M (2020) The odd Dagum family of distributions: properties and applications. J Appl Probab Stat 15:45–72
Ahmad Sartawi H, Abu-Salih MS (1991) Bayesian prediction bounds for the Burr type X model. Commun Stat Theory Methods 20(7):2307–2330
Aldahlan MA, Jamal F, Chesneau C, Elbatal I, Elgarhy M (2020) Exponentiated power generalized Weibull power series family of distributions: properties, estimation and applications. PLoS ONE 15(3):e0230004
Alizadeh M, Afify AZ, Eliwa M, Ali S (2020) The odd log-logistic Lindley-G family of distributions: properties, Bayesian and non-Bayesian estimation with applications. Comput Stat 35(1):281–308
Almarashi AM, Elgarhy M, Jamal F, Chesneau C (2020) The exponentiated truncated inverse Weibull-generated family of distributions with applications. Symmetry 12(4):650
Alzaatreh A, Lee C, Famoye F (2013) A new method for generating families of continuous distributions. Metron 71(1):63–79
Burr IW (1942) Cumulative frequency functions. Ann Math Stat 13(2):215–232
Consul PC, Famoye F (2006) Lagrangian probability distributions. Springer, Berlin
Cordeiro GM, Ortega EM, Popović BV, Pescim RR (2014) The Lomax generator of distributions: properties, minification process and regression model. Appl Math Comput 247(3):465–486
Cordeiro GM, Afify AZ, Yousof HM, Pescim RR, Aryal GR (2017) The exponentiated Weibull-H family of distributions: theory and applications. Mediterr J Math 14(4):155
El-Bassiouny A, Abdo N, Shahen H (2015) Exponential lomax distribution. Int J Comput Appl 121(13):24–29
El-Bassiouny A, El-Damcese M, Mustafa A, Eliwa M (2017) Exponentiated generalized Weibull–Gompertz distribution with application in survival analysis. J Stat Appl Probab 6(1):7–16
Elbatal I, Jamal F, Chesneau C, Elgarhy M, Alrajhi S (2019) The modified beta Gompertz distribution: theory and applications. Mathematics 7(1):3
Elgarhy M, Haq M, Ozel G (2017) A new exponentiated extended family of distributions with applications. Gazi Univ J Sci 30(3):101–115
Eliwa M, El-Morshedy M (2020) Bivariate odd Weibull-G family of distributions: properties, Bayesian and non-Bayesian estimation with bootstrap confidence intervals and application. J Taibah Univ Sci 14(1):331–345
Eugene N, Lee C, Famoye F (2002) Beta-normal distribution and its applications. Communications in Statistics-Theory and Methods 31(4):497–512
Handique L, ul Haq MA, Chakraborty S (2020) Generalized modified Exponential0G family of distributions: its properties and applications. Int J Math Stat 21(2020):1–17
Haq M, Elgarhy M (2018) The odd Fréchet-G family of probability distributions. J Stat Appl Probab 7(1):189–203
Jaheen Z (1996) Empirical Bayes estimation of the reliability and failure rate functions of the Burr type X failure model. J Appl Stat Sci 3(4):281–288
Jaheen ZF (1995) Bayesian approach to prediction with outliers from the Burr type X model. Microelectron Reliab 35(4):703–705
Jamal F, Nasir MA (2018) Generalized Burr X family of distributions. Int J Math Stat 19(2018):1–20
Johnson NL, Kotz S, Balakrishnan N (1994) Continuous univariate distributions. John Wiley, New York
Kao JH (1958) Computer methods for estimating Weibull parameters in reliability studies. IRE Trans Reliab Qual Control. https://doi.org/10.1109/IRE-PGRQC.1958.500716415-22
Lee ET, Wang J (2003) Statistical methods for survival data analysis, vol 476. John Wiley & Sons, New York
Luceño A (2006) Fitting the generalized Pareto distribution to data using maximum goodness-of-fit estimators. Comput Stat Data Anal 51(2):904–917
Mann NR, Schafer RE, Singpurwalla ND (1974) Methods for statistical analysis of reliability and life data(Book). Research supported by the U. S. Air Force and Rockwell International Corp. New York, John Wiley and Sons, Inc., 1974. p 573
Mudholkar GS, Srivastava DK (1993) Exponentiated Weibull family for analyzing bathtub failure-rate data. IEEE Trans Reliab 42(2):299–302
Rényi A (1961) On measures of entropy and information. Paper presented at the Proceedings of the Fourth Berkeley Symposium on Mathematical Statistics and Probability, Volume 1: Contributions to the Theory of Statistics
Rodriguez RN (1977) A guide to the Burr type XII distributions. Biometrika 64(1):129–134
Silva RCD, Sanchez JJ, Lima FP, Cordeiro GM (2021) The kumaraswamy gompertz distribution. J Data Sci 13(2):241–260
Surles J, Padgett W (2001) Inference for reliability and stress-strength for a scaled Burr Type X distribution. Lifetime Data Anal 7(2):187–200
Surles J, Padgett W (2005) Some properties of a scaled Burr type X distribution. J Stat Plan Inference 128(1):271–280
Usman RM, Ilyas M (2020) The power Burr type X distribution: properties, regression modeling and applications. Punjab Univ J Math 52(8):27–44
Wingo DR (1993) Maximum likelihood methods for fitting the Burr type XII distribution to multiply (progressively) censored life test data. Metrika 40(1):203–210
Xu K, Xie M, Tang LC, Ho S (2003) Application of neural networks in forecasting engine systems reliability. Appl Soft Comput 2(4):255–268
Yousof HM, Afify AZ, Hamedani G, Aryal G (2017) The Burr X generator of distributions for lifetime data. J Stat Theory Appl 16(3):288–305
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Usman, R.M., Ilyas, M. Power Burr X-T family of distributions: properties, estimation methods and real-life applications. Comput Stat (2023). https://doi.org/10.1007/s00180-023-01405-w
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DOI: https://doi.org/10.1007/s00180-023-01405-w