Abstract
In this paper, our main objective is to illustrate the flexibility of the wider class of generalized gamma distribution to model right censored survival data. This distribution contains the commonly used gamma, Weibull, and lognormal distributions as particular cases and this flexibility allows us to carry out a model discrimination, within its class, to choose a lifetime distribution that provides the best fit to a given data. A detailed Monte Carlo simulation study is carried out to display the flexibility of the generalized distribution using likelihood ratio test and information-based criteria. The maximum likelihood estimates of the parameters are obtained by using inbuilt optimization techniques available in R statistical software. We also display the performance of the estimation technique by calculating the bias, mean square error, and coverage probabilities of the confidence intervals for different confidence levels. Finally, we illustrate the advantage of using the generalized gamma distribution using two real datasets and we motivate the use of an extended version of the generalized gamma distribution.
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References
Agarwal SK, Al-Saleh JA (2001) Generalized gamma type distribution and its hazard rate function. Commun Stat Theory Methods 30:309–318
Balakrishnan N, Pal S (2015) An EM algorithm for the estimation of parameters of a flexible cure rate model with generalized gamma lifetime and model discrimination using likelihood- and information-based methods. Comput Stat 30:151–189
Balakrishnan N, Peng Y (2006) Generalized gamma frailty model. Stat Med 25:2797–2816
Cordeiro GM, Ortega EMM, Silva GO (2011) The exponentiated generalized gamma distribution with application to lifetime data. J Stat Comput Simul 81:827–842
Cox C (2008) The generalized F distribution: an umbrella for parametric survival analysis. Stat Med 27:4301–4312
Curtis JP, Wang Y, Portnay EL, Masoudi FA, Havranek EP, Krumholz HM (2003) Aspirin, ibuprofen, and mortality after myocardial infarction: retrospective cohort study. BMJ 327:1322–1323
Hirose H (2000) Maximum likelihood parameter estimation by model augmentation with applications to the extended four-parameter generalized gamma distribution. Math Comput Simul 54:81–97
Huang PH, Hwang TY (2006) On new moment estimation of parameters of the generalized gamma distribution using it’s characterization. Taiwan J Math 10:1083–1093
Jackson C (2016) flexsurv: a platform for parametric survival modeling in R. J Stat Softw 70:1–33
Johnson NL, Kotz S, Balakrishnan N (1994) Continuous univariate distributions, vol 1, 2nd edn. Wiley, New York
Loprinzi CL, Laurie JA, Wieand HS et al (1994) Prospective evaluation of prognostic variables from patient-completed questionnaires. J Clin Oncol 12:601–607
Pal S, Balakrishnan N (2017) An EM type estimation procedure for the destructive exponentially weighted Poisson regression cure rate model under generalized gamma lifetime. J Stat Comput Simul 87:1107–1129
Prentice RL (1974) A log gamma model and its maximum likelihood estimation. Biometrika 61:539–544
Sauerbrei W, Royston P (1999) Building multivariable prognostic and diagnostic models: transformation of the predictors using fractional polynomials. J R Stat Soc Ser A 162:71–94
Self SG, Liang KY (1987) Asymptotic properties of maximum likelihood estimators and likelihood ratio tests under nonstandard conditions. J Am Stat Assoc 82:605–610
Stacy EW (1962) A generalization of the gamma distribution. Ann Math Stat 33:1187–1192
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The authors express their sincere thanks to the editor and to two anonymous referees for providing comments and suggestions that led to this improved version of the manuscript.
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Pal, S., Yu, H., Loucks, Z.D. et al. Illustration of the Flexibility of Generalized Gamma Distribution in Modeling Right Censored Survival Data: Analysis of Two Cancer Datasets. Ann. Data. Sci. 7, 77–90 (2020). https://doi.org/10.1007/s40745-019-00224-5
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DOI: https://doi.org/10.1007/s40745-019-00224-5
Keywords
- Maximum likelihood estimates
- Mixture chi-square
- Likelihood ratio test
- Goodness-of-fit
- Model discrimination