A Generalization of Reciprocal Exponential Model: Clayton Copula, Statistical Properties and Modeling Skewed and Symmetric Real Data Sets

We introduce a new extension of the reciprocal Exponential distribution for modeling the extreme values. We used the Morgenstern family and the clayton copula for deriving many bivariate and multivariate extensions of the new model. Some of its properties are derived. We assessed the performance of the maximum likelihood estimators (MLEs) via a graphical simulation study. The assessment was based on the sample size. The new reciprocal model is employed for modeling the skewed and the symmetric real data sets. The new reciprocal model is better than some other important competitive models in statistical modeling.

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The Generalized Odd Generalized Exponential Fréchet Model: Univariate, Bivariate and Multivariate Extensions with Properties and Applications to the Univariate Version

Pakistan Journal of Statistics and Operation Research ◽

10.18187/pjsor.v16i3.2953 ◽

2020 ◽

pp. 529-544 ◽

Cited By ~ 3

Author(s):

Hisham Abdel Hamid Elsayed ◽

Haitham M. Yousof

Keyword(s):

Maximum Likelihood ◽

Generating Functions ◽

Residual Life ◽

Maximum Likelihood Estimators ◽

Real Data ◽

Simple Type ◽

Data Sets ◽

New Model ◽

Clayton Copula ◽

Stochastic Properties

A new univariate extension of the Fréchet distribution is proposed and studied. Some of its fundamental statistical properties such as stochastic properties, ordinary and incomplete moments, moments generating functions, residual life and reversed residual life functions, order statistics, quantile spread ordering, Rényi, Shannon and q-entropies are derived. A simple type Copula based construction using Morgenstern family and via Clayton Copula is employed to derive many bivariate and multivariate extensions of the new model. We assessed the performance of the maximum likelihood estimators using a simulation study. The importance of the new model is shown by means of two applications to real data sets.

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Extended Reciprocal Rayleigh Distribution: Copula, Properties and Real Data Modeling

Pakistan Journal of Statistics and Operation Research ◽

10.18187/pjsor.v16i1.3112 ◽

2020 ◽

pp. 35-52

Author(s):

Hoda Ragab Rezk

Keyword(s):

Simulation Study ◽

Estimation Method ◽

Data Modeling ◽

Real Data ◽

Rayleigh Distribution ◽

Simple Type ◽

Data Sets ◽

New Model ◽

Graphical Simulation ◽

Better Than

Abstract: A new extension of the reciprocal Rayleigh distribution is introduced. Simple type copula-based construction is presented for deriving and many bivariate and multivariate type distributions of the reciprocal Rayleigh model. The new reciprocal Rayleigh model generalizes another three reciprocal Rayleigh distributions. The performance of the estimation method is assessed using a graphical simulation study. The new model is better than some other important competitive models in modeling different real data sets.

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The Odd Log-Logistic Poisson Inverse Rayleigh Distribution: Statistical Properties and Applications

Pakistan Journal of Statistics and Operation Research ◽

10.18187/pjsor.v16i4.2930 ◽

2020 ◽

pp. 775-787

Author(s):

Ibrahim Elbatal

Keyword(s):

Maximum Likelihood ◽

Simulation Study ◽

Maximum Likelihood Estimators ◽

Real Data ◽

Rayleigh Distribution ◽

Statistical Properties ◽

Data Sets ◽

New Model ◽

Fundamental Properties

In this work, a new extension of the Inverse Rayleigh model is proposed and studied. We derive some of its fundamental properties. We assess the performance of the maximum likelihood estimators via a simulation study. The importance of the new model is shown via two applications to real data sets. The new model is better fit than other important competitive models based on two real data sets.

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Transforming variables to central normality

Machine Learning ◽

10.1007/s10994-021-05960-5 ◽

2021 ◽

Author(s):

Jakob Raymaekers ◽

Peter J. Rousseeuw

Keyword(s):

Maximum Likelihood ◽

Maximum Likelihood Estimator ◽

Simulation Study ◽

Real Data ◽

Data Sets ◽

Transformation Parameter ◽

Likelihood Estimator ◽

Extensive Simulation ◽

Highly Sensitive

AbstractMany real data sets contain numerical features (variables) whose distribution is far from normal (Gaussian). Instead, their distribution is often skewed. In order to handle such data it is customary to preprocess the variables to make them more normal. The Box–Cox and Yeo–Johnson transformations are well-known tools for this. However, the standard maximum likelihood estimator of their transformation parameter is highly sensitive to outliers, and will often try to move outliers inward at the expense of the normality of the central part of the data. We propose a modification of these transformations as well as an estimator of the transformation parameter that is robust to outliers, so the transformed data can be approximately normal in the center and a few outliers may deviate from it. It compares favorably to existing techniques in an extensive simulation study and on real data.

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A New Flexible Three-Parameter Model: Properties, Clayton Copula, and Modeling Real Data

Symmetry ◽

10.3390/sym12030440 ◽

2020 ◽

Vol 12 (3) ◽

pp. 440 ◽

Cited By ~ 8

Author(s):

Abdulhakim A. Al-babtain ◽

I. Elbatal ◽

Haitham M. Yousof

Keyword(s):

Maximum Likelihood ◽

Maximum Likelihood Method ◽

Real Data ◽

Likelihood Method ◽

Model Parameters ◽

Simple Type ◽

Data Sets ◽

New Model ◽

Clayton Copula ◽

Mathematical Properties

In this article, we introduced a new extension of the binomial-exponential 2 distribution. We discussed some of its structural mathematical properties. A simple type Copula-based construction is also presented to construct the bivariate- and multivariate-type distributions. We estimated the model parameters via the maximum likelihood method. Finally, we illustrated the importance of the new model by the study of two real data applications to show the flexibility and potentiality of the new model in modeling skewed and symmetric data sets.

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Generalized Truncation Positive Normal Distribution

Symmetry ◽

10.3390/sym11111361 ◽

2019 ◽

Vol 11 (11) ◽

pp. 1361

Author(s):

Héctor J. Gómez ◽

Diego I. Gallardo ◽

Osvaldo Venegas

Keyword(s):

Maximum Likelihood ◽

Normal Distribution ◽

Fisher Information ◽

Fisher Information Matrix ◽

Information Matrix ◽

Maximum Likelihood Estimators ◽

Real Data ◽

Data Sets ◽

New Model ◽

Positive Support

In this article we study the properties, inference, and statistical applications to a parametric generalization of the truncation positive normal distribution, introducing a new parameter so as to increase the flexibility of the new model. For certain combinations of parameters, the model includes both symmetric and asymmetric shapes. We study the model’s basic properties, maximum likelihood estimators and Fisher information matrix. Finally, we apply it to two real data sets to show the model’s good performance compared to other models with positive support: the first, related to the height of the drum of the roller and the second, related to daily cholesterol consumption.

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The Three-parameters Marshall-Olkin Generalized Weibull Model with Properties and Different Applications to Real Data Sets

Pakistan Journal of Statistics and Operation Research ◽

10.18187/pjsor.v16i4.2339 ◽

2020 ◽

pp. 675-688

Author(s):

Mohamed G. Khalil ◽

Wagdy M. Kamel

Keyword(s):

Maximum Likelihood ◽

Likelihood Estimation ◽

Real Data ◽

Weibull Model ◽

Parametric Model ◽

Data Sets ◽

Unknown Parameters ◽

Graphical Simulation ◽

Method Of Maximum Likelihood ◽

New Distribution

A new three-parameter life parametric model called the Marshall-Olkin generalized Weibull is defined and studied. Relevant properties are mathematically derived and analyzed. The new density exhibits various important symmetric and asymmetric shapes with different useful kurtosis. The new failure rate can be “constant”, “upside down-constant (reversed U-HRF-constant)”, “increasing then constant”, “monotonically increasing”, “J-HRF” and “monotonically decreasing”. The method of maximum likelihood is employed to estimate the unknown parameters. A graphical simulation is performed to assess the performance of the maximum likelihood estimation. We checked and proved empirically the importance, applicability and flexibility of the new Weibull model in modeling various symmetric and asymmetric types of data. The new distribution has a high ability to model different symmetric and asymmetric types of data.

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The Exponentiated Exponential Burr XII distribution: Theory and application to lifetime and simulated data

PLoS ONE ◽

10.1371/journal.pone.0248873 ◽

2021 ◽

Vol 16 (3) ◽

pp. e0248873

Author(s):

Majdah Badr ◽

Muhammad Ijaz

Keyword(s):

Parameter Estimation ◽

Maximum Likelihood ◽

Probability Distribution ◽

Simulation Study ◽

Probability Distributions ◽

Simulated Data ◽

Maximum Likelihood Estimators ◽

Data Sets ◽

Lifetime Data ◽

Confidence Bounds

The paper addresses a new four-parameter probability distribution called the Exponentiated Exponential Burr XII or abbreviated as EE-BXII. We derive various statistical properties in addition to the parameter estimation, moments, and asymptotic confidence bounds. We estimate the precision of the maximum likelihood estimators via a simulation study. Furthermore, the utility of the proposed distribution is evaluated by using two lifetime data sets and the results are compared with other existing probability distributions. The results clarify that the proposed distribution provides a better fit to these data sets as compared to the existing probability distributions.

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The Two-Parameter Odd Lindley Weibull Lifetime Model with Properties and Applications

International Journal of Statistics and Probability ◽

10.5539/ijsp.v7n4p57 ◽

2018 ◽

Vol 7 (4) ◽

pp. 57 ◽

Cited By ~ 7

Author(s):

Jehhan. A. Almamy ◽

Mohamed Ibrahim ◽

M. S. Eliwa ◽

Saeed Al-mualim ◽

Haitham M. Yousof

Keyword(s):

Maximum Likelihood ◽

Real Data ◽

Weibull Model ◽

Good Alternative ◽

Model Parameters ◽

Data Sets ◽

New Model ◽

Lifetime Model ◽

Two Parameter ◽

Better Than

In this work, we study the two-parameter Odd Lindley Weibull lifetime model. This distribution is motivated by the wide use of the Weibull model in many applied areas and also for the fact that this new generalization provides more flexibility to analyze real data. The Odd Lindley Weibull density function can be written as a linear combination of the exponentiated Weibull densities. We derive explicit expressions for the ordinary and incomplete moments, moments of the (reversed) residual life, generating functions and order statistics. We discuss the maximum likelihood estimation of the model parameters. We assess the performance of the maximum likelihood estimators in terms of biases, variances, mean squared of errors by means of a simulation study. The usefulness of the new model is illustrated by means of two real data sets. The new model provides consistently better fits than other competitive models for these data sets. The Odd Lindley Weibull lifetime model is much better than \ Weibull, exponential Weibull, Kumaraswamy Weibull, beta Weibull, and the three parameters odd lindly Weibull with three parameters models so the Odd Lindley Weibull model is a good alternative to these models in modeling glass fibres data as well as the Odd Lindley Weibull model is much better than the Weibull, Lindley Weibull transmuted complementary Weibull geometric and beta Weibull models so it is a good alternative to these models in modeling time-to-failure data.

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An Asymmetric Bimodal Double Regression Model

Symmetry ◽

10.3390/sym13122279 ◽

2021 ◽

Vol 13 (12) ◽

pp. 2279

Author(s):

Yolanda M. Gómez ◽

Diego I. Gallardo ◽

Osvaldo Venegas ◽

Tiago M. Magalhães

Keyword(s):

Maximum Likelihood ◽

Regression Model ◽

Simulation Study ◽

Maximum Likelihood Estimators ◽

Real Data ◽

Cauchy Distribution ◽

Scale Parameters ◽

Finite Samples ◽

Data Application ◽

Different Shapes

In this paper, we introduce an extension of the sinh Cauchy distribution including a double regression model for both the quantile and scale parameters. This model can assume different shapes: unimodal or bimodal, symmetric or asymmetric. We discuss some properties of the model and perform a simulation study in order to assess the performance of the maximum likelihood estimators in finite samples. A real data application is also presented.

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