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http://dx.doi.org/10.14317/jami.2021.785

THE WEIBULL MARSHALL-OLKIN LOMAX DISTRIBUTION WITH APPLICATIONS TO BLADDER AND HEAD CANCER DATA  

KUMAR, DEVENDRA (Department of Statistics, Central University of Haryana)
KUMAR, MANEESH (Department of Statistics, Central University of Haryana)
ABD EL-BAR, AHMED M.T. (Department of Mathematics, College of Science, Taibah University)
LIMA, MARIA DO CARMO S. (Department of Statistics, Federal University of Pernambuco)
Publication Information
Journal of applied mathematics & informatics / v.39, no.5_6, 2021 , pp. 785-804 More about this Journal
Abstract
The proposal of new families has been worked out by many authors over recent years. Many ways to generate new families have been developed as the methods of addition, linear combination, composition and, one of the newer, the T-X family of distributions. Using this latter method, Korkmaz et al. (2018) proposed a new class called Weibull Marshall-Olkin-G (WMO-G) family. In the present work, we propose a new distribution, based on the WMO-G family, using the Lomax distribution as baseline, called Weibull Marshall-Olkin Lomax (WMOL) distribution. The hazard rate function of this distribution can be increasing, decreasing, bathtub-shaped, decreasing-increasing-decreasing and unimodal. Some properties of the proposed model are developed. Besides that, we consider method of maximum likelihood for estimating the unknown parameters of the WMOL distribution. We provide a simulation study in order to verify the asymptotic properties of the maximum likelihood estimates. The applicability of the new distribution to modeling real life data is proved by two real data sets.
Keywords
Lomax distribution; simulation study; Weibull Marshall Olkin-G family;
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1 A.Z. Afify, D. Kumar and I. Elbatal, Marshall-Olkin Power Generalized Weibull distribution with applications in Engineering and Medicine, Journal of Statistical Theory and Applications 19 (2020a), 223-237.   DOI
2 A.Z. Afify, M. Nassar, G.M. Cordeiro and D. Kumar, The Weibull Marshall-Olkin Lindley distribution: properties and estimation, Journal of Taibah University for Science 14 (2020b), 192-204.   DOI
3 I.E.L. Bata and A. Kareem, Statistical properties of Kumaraswamy exponentiated Lomax distribution, journal of Modern Mathematics and Statistics 8 (2014), 1-7.
4 G.M. Cordeiro, A.J. Lemonte and E.M. Ortega, The Marshall-Olkin family of distributions: mathematical properties and new models, Journal of Statistical Theory and Practice 8 (2014), 343-366.   DOI
5 G.M. Cordeiro, A.Z. Afify, H.M. Yousof, R.R. Pescim and G.R. Aryal, The exponentiated Weibull-H family of distributions: theory and applications, Mediterr. J. Math. 14 (2017). https://doi.org/10.1007/s00009-017-0955-1   DOI
6 P. Flajonet and A. Odlyzko, Singularity analysis of generating function, SIAM: SIAM J. Discr. Math. 3 (1990), 216-240.   DOI
7 P. Flajonet and R. Sedgewick, Analytic Combinatorics, Cambridge University Press, ISBN:978-0-521-89806-5 2009.
8 M.E. Ghitany, F.A. Al-Awadhi and L.A. Alkhalfan, Marshall-Olkin extended Lomax distribution and its application to censored data, Communications in Statistics-Theroy and Methods 36 (2007), 1855-1866.   DOI
9 A. Hassan and M. Abd-Allah, Exponentiated Weibull-Lomax Distribution: Properties and Estimation, Journal of data science 16 (2018), 277-298.
10 A.S. Hassan and M.A. Abdelghafar, Exponentiated Lomax Geometric Distribution: Properties and Applications, Pak. J. Stat. Oper. Res. 13 (2017), 545-566.   DOI
11 S.A. Kemaloglu and M. Yilmaz, Transmuted two-parameter Lindley distribution, Commun Stat. Theory Methods 46 (2017), 11866-11879.   DOI
12 T.M. Shams, The Kumaraswamy-Generalized Lomax Distribution, Middle-East Journal of Scientific Research 17 (2013), 641-646.
13 E.L. Lehmann, The power of rank tests, Annals of Mathematical Statistics 24 (1953), 23-43.   DOI
14 E.T. Lee and J.W. Wang, Statistical methods for survival data analysis, Wiley, New York, 2003.
15 E.A. Rady, W.A. Hassanein and T.A. Elhaddad, The power Lomax distribution with an application to bladder cancer data, Springer Plus 5 (2016), 18-38.   DOI
16 M.H. Tahir, G.M. Cordeiro, M. Mansoor and M. Zubair, The Weibull-Lomax distribution: properties and applications, Hacettepe Journal of Mathematics and Statistics 44 (2015), 461-480.
17 M.C. Korkmaz, G.M. Cordeiro, H.M. Yousof, R.R. Pescim, A.Z. Afify and S. Nadarahah, The Weibull Marshall-Olkin family: regression model and applications to censored data, Commun. Stat. Theory and Methods 48 (2018), 4171-4194.   DOI
18 C.J. Tablada and G.M. Cordeiro, The Beta Marshall-Olkin Lomax distribution, 2018. https://www.ine.pt/revstat/pdf/thebetamarshallolkinlomaxdistribution.pdf
19 A.W. Marshall and I. Olkin, A new method for adding a parameter to a family of distributions with application to the exponential and Weibull families, Biometrika 84 (1997), 641-652.   DOI
20 P.E. Oguntunde, M.A. Khaleel, M.T. Ahmed, A.O. Adejumo and O.A. Odetunmibi, A new generalization of the Lomax distribution with increasing, decreasing, and constant failure rate, Modelling and Simulation in Engineering 2017 (2017), 1-6.
21 A. Alzaatreh, C. Lee and F. Famoye, A new method for generating families of continuous distributions, Metron 71 (2013), 63-79.   DOI
22 B. Efron, Logistic regression, survival analysis and the Kaplan-Meier curve, Journal of the American Statistical Association 83 (1988), 402, 414-425.   DOI
23 M.V. Aarset, How to Identify a Bathtub Hazard Rate Reliability, IEEE Transactions R-36 (1987), 106-108.
24 M.E. Mead, On Five-Parameter Lomax Distribution: Properties and Applications, Pak. j. stat. oper. res. 12 (2016), 185-199.   DOI
25 G.M. Cordeiro, E.M.M. Ortega and T.G. Ramires, A new generalized Weibull family of distributions: mathematical properties and applications, J. Stat. Distrib. Appl. 2 (2015), 1-25.   DOI
26 J. Navarro, M. Franco and J.M. Ruiz, Characterization through moments of the residual life and conditional spacing, The Indian Journal of Statistics 60 (1998), 36-48.
27 I.B. Abdul-Moniem and H.F. Abdel-Hameed, On exponentiated Lomax distribution, International Journal of Mathematical Archive 3 (2012), 2144-2150.
28 A.Z. Afify, Z.M. Nofal, H.M. Yousof, Y.M. El Gebaly and N.S. Butt, The Transmuted Weibull Lomax Distribution: Properties and Application, Pakistan Journal of Statistics and Operations Research 11 (2015), 135-152.   DOI