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References
- M.V. Aarset, How to identify bathtub hazard rate, IEEE Trans. Reliab. 36 (1987), pp. 106–108. doi: 10.1109/TR.1987.5222310
- A. Adler, lamW: Lambert-W function, R package version 1.3.0, 2017.
- H. Akaike, A new look at the statistical model identification, IEEE Trans. Automat. Control 19 (1974), pp. 716–723. doi: 10.1109/TAC.1974.1100705
- E.K. AL-Hussaini and M. Ahsanullah, Exponentiated Distributions. Atlantis Studies in Probability and Statistics, Atlantis Press, Paris, 2015.
- T.W. Anderson and S.G. Ghurye, Identification of parameters by the distribution of a maximum random variable, J. R. Stat. Soc. Ser. B (Methodol.) 39 (1977), pp. 337–342.
- T.A.N.D. Andrade and L.M. Zea, The exponentiated generalized extended pareto distribution, J. Data Sci. 16 (2018), pp. 781–800.
- D.F. Andrews and A.M. Herzberg, Data: A Collection of Problems From Many Fields for the Student and Research Worker, Springer-Verlag, New York, 1985.
- N. Balakrishnan and M.M. Ristic, Multivariate families of gamma-generated distributions with finite or infinite support above or below the diagonal, J. Multivar. Anal. 143 (2016), pp. 194–207. doi: 10.1016/j.jmva.2015.09.012
- A.P. Basu and J.K. Ghosh, Identifiability of distributions under competing risks and complementary risks model, Commun. Stat. – Theory Methods 9 (1980), pp. 1515–1525. doi: 10.1080/03610928008827978
- K.P. Burnham and D.R. Anderson, Model Selection and Multimodel Inference: A Practical Information-Theoretic Approach, 2nd ed., Springer-Verlag, New York, 2002.
- R. Cheng and N. Amin, Estimating parameters in continuous univariate distributions with a shifted origin, J. R. Stat. Soc. Ser. B 45 (1983), pp. 394–403.
- G.M. Cordeiro, M. Alizadeh, and E.M.M. Ortega, The exponentiated half-logistic family of distributions: properties and applications, J. Probab. Stat. 2014 (2014), pp. 1–21. doi: 10.1155/2014/864396
- R. Corless, G. Gonnet, D. Hare, D. Jefrey, and D. Knuth, On the Lambert W function, Adv. Comput. Math. 5 (1996), pp. 329–359. doi: 10.1007/BF02124750
- S. Dey, D. Kumar, P.L. Ramos, and F. Louzada, Exponentiated chen distribution: properties and estimation, Commun. Stat. – Simul. Comput. 46 (2017), pp. 8118–8139. doi: 10.1080/03610918.2016.1267752
- M. Ekström, Maximum product of spacings estimation, in Wiley StatsRef: Statistics Reference Online, N. Balakrishnan, T. Colton, B. Everitt, W. Piegorsch, F. Ruggeri, and J.L. Teugels, eds., John Wiley & Sons, Inc., 2014.
- R.E. Glaser, Bathtub and related failure rate characterization, J. Am. Stat. Assoc. 75 (1980), pp. 667–672. doi: 10.1080/01621459.1980.10477530
- R.C. Gupta, P.L. Gupta, and R.D. Gupta, Modeling failure time data by Lehman alternatives, Commun. Stat. – Theory Methods 27 (2007), pp. 887–904. doi: 10.1080/03610929808832134
- R.D. Gupta and D. Kundu, Exponentiated exponential family: an alternative to Gamma and Weibull distributions, Biomet. J. 43 (2001), pp. 117–130. doi: 10.1002/1521-4036(200102)43:1<117::AID-BIMJ117>3.0.CO;2-R
- L. Handique, S. Chakraborty, and T.A.N. de Andrade, The exponentiated generalized Marshall–Olkin family of distribution: its properties and applications, Ann. Data Sci. 6 (2019), pp. 391–411. doi: 10.1007/s40745-018-0166-z
- P. Jodra, H.W. Gómez, M.D. Jiménez-Gamero, and M.V. Alba-Fernández, The power muth distribution, Math. Modell. Anal. 22 (2017), pp. 186–201. doi: 10.3846/13926292.2017.1289481
- P. Jodra, M.D. Jiménez-Gamero, and M.V. Alba-Fernández, On the muth distribution, Math. Modell. Anal. 20 (2015), pp. 291–310. doi: 10.3846/13926292.2015.1048540
- D. Kundu and R.D. Gupta, Characterizations of the proportional (reversed) hazard model, Commun. Stat. – Theory Methods 33 (2004), pp. 3095–3102. doi: 10.1081/STA-200039053
- A. Laurent, Failure and mortality from wear and aging. The Teissier model, in Statistical Distributions in Scientific Work, Model Building and Model Selection, Vol. 2, R. Reidel Publishing Company, Dordrecht, Holland, 1975, pp. 301–320.
- E.L. Lehmann, The power of rank tests, Ann. Math. Stat. 24 (1953), pp. 23–43. doi: 10.1214/aoms/1177729080
- F. Louzada, V.A.A. Marchi, and M. Roman, The exponentiated exponential–geometric distribution: a distribution with decreasing, increasing and unimodal failure rate, Stat.: J. Theor. Appl. Stat. 48 (2012), pp. 167–181. doi: 10.1080/02331888.2012.667103
- A.W. Marshall and I. Olkin, Life Distributions: Structure of Nonparametric, Semiparametric, and Parametric Families, Springer Series in Statistics, Springer, New York, 2007.
- G.S. Mudholkar and D.K. Srivastava, Exponentiated Weibull family for analyzing bathtub failure-rate data, IEEE Trans. Reliab. 42 (1993), pp. 299–302. doi: 10.1109/24.229504
- G.S. Mudholkar, D.K. Srivastava, and M. Freimer, The exponentiated Weibull family: a reanalysis of the bus-motor-failure data, Technometrics 37 (1995), pp. 436–445. doi: 10.1080/00401706.1995.10484376
- J.E. Muth, Reliability models with positive memory derived from the mean residual life function, in The Theory and Applications of Reliability, Vol. 2, Academic Press, Inc., New York, 1977, pp. 401–435.
- S. Nadarajah, Exponentiated pareto distributions, Stat.: J. Theor. Appl. Stat. 39 (2005), pp. 255–260. doi: 10.1080/02331880500065488
- S. Nadarajah, H.S. Bakouch, and R. Tahmasbi, A generalized lindley distribution, Sankhya: Indian J. Stat., Ser. B 73 (2011), pp. 331–359. doi: 10.1007/s13571-011-0025-9
- S. Nadarajah, G.M. Cordeiro, and E.M.M. Ortega, The exponentiated Weibull distribution: a survey, Stat. Pap. 54 (2013), pp. 839–877. doi: 10.1007/s00362-012-0466-x
- S. Nadarajah and S. Kotz, The exponentiated type distributions, Acta Appl. Math. 92 (2006), pp. 97–111. doi: 10.1007/s10440-006-9055-0
- R Core Team, R: A Language and Environment for Statistical Computing, R Foundation for Statistical Computing, Vienna, Austria, 2019.
- M.M. Ristic, B.V. Popovic, K. Zografos, and N. Balakrishnan, Discrimination among bivariate beta-generated distributions, Statistics 52 (2018), pp. 303–320. doi: 10.1080/02331888.2017.1397156
- A. Shah and D.V. Gokhale, On maximum product of spacings (MPS) estimation for burr XII distributions, Commun. Stat. – Simul. Comput. 22 (1993), pp. 615–641. doi: 10.1080/03610919308813112
- V.K. Sharma, Bayesian analysis of head and neck cancer data using generalized inverse lindley stress–strength reliability model, Commun. Stat. – Theory Methods 47 (2018a), pp. 1155–1180. doi: 10.1080/03610926.2017.1316858
- V.K. Sharma, Topp -Leone normal distribution with application to increasing failure rate data, J. Stat. Comput. Simul. 88 (2018b), pp. 1782–1803. doi: 10.1080/00949655.2018.1447574
- V.K. Sharma, Chapter 11 – R for lifetime data modeling via probability distributions, in Handbook of Probabilistic Models, P. Samui, D.T. Bui, S. Chakraborty, and R.C. Deo, eds., Butterworth-Heinemann, Cambridge, 2020, pp. 265–287.
- V.K. Sharma, S.K. Singh, U. Singh, and F. Merovci, The generalized inverse lindley distribution: a new inverse statistical model for the study of upside-down bathtub data, Commun. Stat. – Theory Methods 45 (2016), pp. 5709–5729. doi: 10.1080/03610926.2014.948206
- W. Stute, W.G. Manteiga, and M.P. Quindimil, Bootstrap based goodness-of-fit-tests, Metrika 40 (1993), pp. 243–256. doi: 10.1007/BF02613687
- G. Teissier, Recherches sur le vieillissement et sur les lois de mortalite, Ann. Physiol. Phys. Chim. Biol. 10 (1934), pp. 237–284.
- F.K. Wang, A new model with bathtub-shaped failure rate using an additive burr XII distribution, Reliab. Eng. Syst. Saf. 70 (2000), pp. 305–312. doi: 10.1016/S0951-8320(00)00066-1
- M. Xie, Y. Tang, and T.N. Goh, A modified Weibull extension with bathtub-shaped failure rate function, Reliab. Eng. Syst. Saf. 76 (2002), pp. 279–285. doi: 10.1016/S0951-8320(02)00022-4