We study some mathematical properties of a new generator of continuous distributions with two additional shape parameters called the
Zografos-Balakrishnan odd log-logistic family. We present some special
models and investigate the asymptotes and shapes. The density function of the new family can be expressed as a mixture of exponentiated
densities based on the same baseline distribution. We derive a power
series for its quantile function. Explicit expressions for the ordinary and
incomplete moments, quantile and generating functions, Shannon and
Rényi entropies and order statistics, which hold for any baseline model,
are determined. We estimate the model parameters by maximum likelihood. Two real data sets are used to illustrate the potentiality of the
proposed family
Estimation Gamma distribution Generated family Maximum likelihood Mean deviation Moment Quantile function
Primary Language | English |
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Subjects | Statistics |
Journal Section | Statistics |
Authors | |
Publication Date | December 1, 2016 |
Published in Issue | Year 2016 Volume: 45 Issue: 6 |