Log-epsilon-skew normal: A generalization of the log-normal distribution |
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| Authors: | Alan D Hutson Terry L Mashtare Jr Govind S Mudholkar |
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| Institution: | 1. Biostatistics, University at Buffalo, Buffalo, New York, USA;2. ahutson@buffalo.edu;4. Biostatistics, University at Buffalo - The State University of New York, Buffalo, New York, USA;5. Department of Statistics, Hylan Building, University of Rochester, Rochester, New York, United States |
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| Abstract: | AbstractThe log-normal distribution is widely used to model non-negative data in many areas of applied research. In this paper, we introduce and study a family of distributions with non-negative reals as support and termed the log-epsilon-skew normal (LESN) which includes the log-normal distributions as a special case. It is related to the epsilon-skew normal developed in Mudholkar and Hutson (2000 Mudholkar, G. S., and A. D. Hutson. 2000. The epsilon-skew-normal distribution for analyzing near-normal data. Journal of Statistical Planning and Inference 83 (2):291–309. doi:10.1016/S0378-3758(99)00096-8.Crossref], Web of Science ®] , Google Scholar]) the way the log-normal is related to the normal distribution. We study its main properties, hazard function, moments, skewness and kurtosis coefficients, and discuss maximum likelihood estimation of model parameters. We summarize the results of a simulation study to examine the behavior of the maximum likelihood estimates, and we illustrate the maximum likelihood estimation of the LESN distribution parameters to two real world data sets. |
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| Keywords: | Hazard function log-normal distribution maximum likelihood estimation |
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