İndranil Ghosh scite author profile

A family of generalized Cauchy distributions, T-Cauchy{Y} family, is proposed using the T-R{Y} framework. The family of distributions is generated using the quantile functions of uniform, exponential, log-logistic, logistic, extreme value, and Fréchet distributions. Several general properties of the T-Cauchy{Y} family are studied in detail including moments, mean deviations and Shannon's entropy. Some members of the T-Cauchy{Y} family are developed and one member, gamma-Cauchy{exponential} distribution, is studied in detail. The distributions in the T-Cauchy{Y} family are very flexible due to their various shapes. The distributions can be symmetric, skewed to the right or skewed to the left.

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Alpha-Power Transformed Lindley Distribution: Properties and Associated Inference with Application to Earthquake Data

Dey¹,

Ghosh

Kumar

2018

Ann. Data. Sci.

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General Results for the Transmuted Family of Distributions and New Models

Bourguignon

Ghosh

Cordeiro

2016

Journal of Probability and Statistics

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The transmuted family of distributions has been receiving increased attention over the last few years. For a baselineGdistribution, we derive a simple representation for the transmuted-Gfamily density function as a linear mixture of theGand exponentiated-Gdensities. We investigate the asymptotes and shapes and obtain explicit expressions for the ordinary and incomplete moments, quantile and generating functions, mean deviations, Rényi and Shannon entropies, and order statistics and their moments. We estimate the model parameters of the family by the method of maximum likelihood. We prove empirically the flexibility of the proposed model by means of an application to a real data set.

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The Generalized Transmuted Poisson-G Family of Distributions: Theory, Characterizations and Applications

Yousof¹,

Afify²,

Alizadeh³

et al. 2018

Pak.j.stat.oper.res.

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In this work, we introduce a new class of continuous distributions called the generalized poissonfamily which extends the quadratic rank transmutation map. We provide some special models for thenew family. Some of its mathematical properties including RÃ©nyi and q-entropies, order statistics andcharacterizations are derived. The estimations of the model parameters is performed by maximumlikelihood method. The Monte Carlo simulations is used for assessing the performance of the maximumlikelihood estimators. The â€¡exibility of the proposed family is illustrated by means of two applicationsto real data sets.

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