Transmuted Gumbel univariate exponential distribution

A functional composition of the distribution function of one probability distribution with the inverse distribution function of another is called the transmutation map. The present paper is purported to show how the transmuted distribution can be obtained by using the convex combination of failure probability of two-component systems. The transmuted Gumbel univariate exponential distribution is presented by changing convex combination parameter. This new distribution is dened and studied. Some mathematical properties of this distribution including the generating function and ordinary moments are derived. The survival, hazard rate and mean residual life functions are discussed. Finally, three applications to real data are presented.

Keywords:

Gumbel exponential distribution, convex combination, transmutation method hazard rate function, Exponential Distribution,

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Abd El Hady, N. E., Exponentiated Transmuted Weibull Distribution, International Journal of Mathematical, Computational, Statistical, Natural and Physical Engineering, 8(6) (2014).
Akinsete, A., Famoye, F. and Lee, C., The Beta-Pareto distribution, Statistics, 42(6) (2008) 547--563.
Al-Mutairi, D. K., Ghitany, M. E., and Kundu, D., Inferences on stress-strength reliability from Lindley distributions, Communications in Statistics-Theory and Methods, 42 (8), (2013), 1443--1463.
Aryal, G. R. and Tsokos, C. P., On the transmuted extreme value distribution with application, Nonlinear Analysis: Theory, Methods & Applications, 71(12) (2009), 1401--1407.
Aryal, G. R. and Tsokos, C. P., Transmuted Weibull Distribution: A Generalization of the Weibull Probability Distribution, European Journal of Pure and Applied Mathematics, 4(2) (2011), 89--102.
Aryal, G. R., Transmuted log-logistic distribution, Journal of Statistics Applications & Probability, 2(1) (2013), 11-20.
Ashour, S. K. and Eltehiwy, M. A., Transmuted Lomax distribution, American Journal of Applied Mathematics and Statistics, 1(6) (2013a), 121--127.
Ashour, S. K. and Eltehiwy, M. A., Transmuted exponentiated Lomax distribution, Aust J Basic Appl Sci, 7(7) (2013b), 658--667.
Bourguignon, M., Silva, R. B., Zea, L. M. and Cordeiro, G. M., The Kumaraswamy Pareto distribution, Journal of Statistical Theory and Applications, 12(2) (2013), 129--144.
Choulakian, V. and Stephens, M. A., Goodness-of-fit tests for the generalized Pareto distribution, Technometrics, 43(4) (2001), 478--484.
Elbatal, I., Asha, G. and Raja, V., Transmuted exponentiated Fréchet distribution: properties and applications, J. Stat. Appl. Prob, 3 (2014), 379--394.
Elbatal, I. and Aryal, G., On the Transmuted Additive Weibull Distribution, Austrian Journal of Statistics, 42(2) (2016), 117--132.
Eltehiwy, M. and Ashour, S., Transmuted exponentiated modified Weibull distribution, International Journal of Basic and Applied Sciences, 2(3) (2013), 258--269.
Gentle, J. E., Random number generation and Monte Carlo methods, Springer Science & Business Media, 2013.
Gumbel, E.J., Bivariate Exponential Distributions, Journal of the American Statistical Association, 55(292) (1960), 698--707.
Hussian, M. A., Transmuted exponentiated gamma distribution: A generalization of the exponentiated gamma probability distribution, Applied Mathematical Sciences, 8(27) (2014), 1297--1310.
Johnson, N. L. and Kotz, S., A vector multivariate hazard rate, Journal of Multivariate Analysis, 5(1) (1975), 53--66.
Lee, E. T. and Wang, J., Statistical methods for survival data analysis, John Wiley & Sons Vol. 476, 2003.
Merovci, F., Transmuted Lindley distribution, International Journal of Open Problems in Computer Science and Mathematics, 6, (2013a).
Merovci, F., Transmuted exponentiated exponential distribution, Mathematical Sciences and Applications E-Notes, 1(2) (2013b).
Merovci, F. and Elbatal, I., Transmuted Lindley-geometric distribution and its applications, arXiv preprint arXiv:1309, 3774, (2013).
Merovci, F. and Puka, L., Transmuted pareto distribution, In ProbStat Forum, Vol. 7 (2014), 1--11. Merovci2016 : Merovci, F., Transmuted Rayleigh distribution, Austrian Journal of Statistics, 42(1) (2016), 21--31.
Nasiru, S. and Luguterah, A., The new Weibull-Pareto distribution, Pakistan Journal of Statistics and Operation Research, 11(1), (2015).
Rényi, A., On measures of entropy and information, In Proceedings of the fourth Berkeley symposium on mathematical statistics and probability, (Vol. 1) (1961), 547--561.
Shaked, M. and Shanthikumar, J. G., Multivariate conditional hazard rate functions--an overview, Applied Stochastic Models in Business and Industry, 31(3) (2015), 285--296.
Shaw, W. T. and Buckley, I. R., The alchemy of probability distributions: Beyond gram-charlier and cornish-fisher expansions, and skew-normal or kurtotic-normal distributions, Submitted, Feb, 7, 64, 2007.
Shaw, W. T. and Buckley, I. R., 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, 2009.
Singh, S. K., Singh, U., and Sharma, V. K., Estimation on System Reliability in Generalized Lindley Stress-Strength Model, J. Stat. Appl. Prob, 3, (2014), 61--75.
Tahir, M. H., Cordeiro, G. M., Alzaatreh, A., Mansoor, M. and Zubair, M., A New Weibull--Pareto Properties and Applications, Communications in Statistics-Simulation and Computation, 45(10) (2016), 3548--3567.
Yilmaz, M., Hameldarbandi, M. and Kemaloglu, S. A., Exponential-modified discrete Lindley distribution, SpringerPlus, 5(1) (2016), 1660.

Communications Faculty of Sciences University of Ankara Series A1 Mathematics and Statistics-Cover

ISSN: 1303-5991
Yayın Aralığı: Yılda 4 Sayı
Başlangıç: 1948
Yayıncı: Ankara Üniversitesi

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