Transmuted Topp-Leone Weibull Lifetime Distribution: Statistical Properties and Different Method of Estimation

In this work we focus on proposing a new lifetime Weibull type model called the transmuted Topp-Leone Weibull and studying its properties. We derive some new bivariate and multivariate transmuted Topp-Leone Weibull versions using “Farlie Gumbel Morgenstern (FGM) Copula”, “modified FGM Copula”, “Clayton Copula” and “Renyi's entropy Copula”. The estimation of its unknown parameters is carried out by considering different method of estimation. The statistical performances of all methods are studied by two real data sets and a numerical Monte Carlo simulation. The Cramer-Von Mises method is the best method for modeling the carbon fibers data. The maximum likelihood method is the best method for modeling the Leukemia data, however all other methods performed well.

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On Modified Burr XII-Inverse Weibull Distribution: Development, Properties, Characterizations and Applications

Pakistan Journal of Statistics and Operation Research ◽

10.18187/pjsor.v16i4.2622 ◽

2020 ◽

pp. 721-735

Author(s):

Fiaz Ahmad Bhatti ◽

G. G. Hamedani ◽

Haitham M. Yousof ◽

Azeem Ali ◽

Munir Ahmad

Keyword(s):

Maximum Likelihood ◽

Hazard Rate ◽

Maximum Likelihood Method ◽

Real Data ◽

Lifetime Distribution ◽

Maximum Likelihood Estimates ◽

Likelihood Method ◽

Data Sets ◽

Quarterly Earnings ◽

Inverse Weibull Distribution

A flexible lifetime distribution with increasing, decreasing, inverted bathtub and modified bathtub hazard rate called Modified Burr XII-Inverse Weibull (MBXII-IW) is introduced and studied. The density function of MBXII-IW is exponential, left-skewed, right-skewed and symmetrical shaped. Descriptive measures on the basis of quantiles, moments, order statistics and reliability measures are theoretically established. The MBXII-IW distribution is characterized via different techniques. Parameters of MBXII-IW distribution are estimated using maximum likelihood method. The simulation study is performed to illustrate the performance of the maximum likelihood estimates (MLEs). The potentiality of MBXII-IW distribution is demonstrated by its application to real data sets: serum-reversal times and quarterly earnings.

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Extended Odd Fréchet-G Family of Distributions

Journal of Probability and Statistics ◽

10.1155/2018/2931326 ◽

2018 ◽

Vol 2018 ◽

pp. 1-12 ◽

Cited By ~ 6

Author(s):

Suleman Nasiru

Keyword(s):

Maximum Likelihood Method ◽

Real Data ◽

Likelihood Method ◽

Data Sets ◽

Data Set ◽

New Class ◽

New Family ◽

Rate Functions ◽

The Given ◽

Family Of Distributions

The need to develop generalizations of existing statistical distributions to make them more flexible in modeling real data sets is vital in parametric statistical modeling and inference. Thus, this study develops a new class of distributions called the extended odd Fréchet family of distributions for modifying existing standard distributions. Two special models named the extended odd Fréchet Nadarajah-Haghighi and extended odd Fréchet Weibull distributions are proposed using the developed family. The densities and the hazard rate functions of the two special distributions exhibit different kinds of monotonic and nonmonotonic shapes. The maximum likelihood method is used to develop estimators for the parameters of the new class of distributions. The application of the special distributions is illustrated by means of a real data set. The results revealed that the special distributions developed from the new family can provide reasonable parametric fit to the given data set compared to other existing distributions.

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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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The Generalized Additive Weibull-G Family of Distributions

International Journal of Statistics and Probability ◽

10.5539/ijsp.v6n5p65 ◽

2017 ◽

Vol 6 (5) ◽

pp. 65 ◽

Cited By ~ 6

Author(s):

Amal S. Hassan ◽

Saeed E. Hemeda ◽

Sudhansu S. Maiti ◽

Sukanta Pramanik

Keyword(s):

Maximum Likelihood Method ◽

Real Data ◽

Random Variable ◽

Likelihood Method ◽

Parameter Estimates ◽

Data Sets ◽

New Family ◽

The Family ◽

Generated Family ◽

Family Of Distributions

In this paper, we present a new family, depending on additive Weibull random variable as a generator, called the generalized additive Weibull generated-family (GAW-G) of distributions with two extra parameters. The proposed family involves several of the most famous classical distributions as well as the new generalized Weibull-G family which already accomplished by Cordeiro et al. (2015). Four special models are displayed. The expressions for the incomplete and ordinary moments, quantile, order statistics, mean deviations, Lorenz and Benferroni curves are derived. Maximum likelihood method of estimation is employed to obtain the parameter estimates of the family. The simulation study of the new models is conducted. The efficiency and importance of the new generated family is examined through real data sets.

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A New Version of the Exponentiated Exponential Distribution: Copula, Properties and Application to Relief and Survival Times

Statistics Optimization & Information Computing ◽

10.19139/soic-2310-5070-1093 ◽

2021 ◽

Vol 9 (2) ◽

pp. 311-333

Author(s):

Hanaa Elgohari

Keyword(s):

Exponential Distribution ◽

Hazard Function ◽

Real Data ◽

Likelihood Method ◽

Type Model ◽

Data Sets ◽

Survival Times ◽

Mathematical Properties ◽

Mean Variance ◽

New Distribution

In this paper, we introduce a new generalization of the Exponentiated Exponential distribution. Various structural mathematical properties are derived. Numerical analysis for mean, variance, skewness and kurtosis and the dispersion index is performed. The new density can be right skewed and symmetric with "unimodal" and "bimodal" shapes. The new hazard function can be "constant", "decreasing", "increasing", "increasing-constant", "upside down-constant", "decreasing nstant". Many bivariate and multivariate type model have been also derived. We assess the performance of the maximum likelihood method graphically via the biases and mean squared errors. The usefulness and flexibility of the new distribution is illustrated by means of two real data sets.

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Binomial-exponential 2 Distribution: Different Estimation Methods and Weather Applications

TEMA (São Carlos) ◽

10.5540/tema.2017.018.02.0233 ◽

2017 ◽

Vol 18 (2) ◽

pp. 0233 ◽

Cited By ~ 4

Author(s):

Hassan S Bakouch ◽

Sanku Dey ◽

Pedro Luiz Ramos ◽

Francisco Louzada

Keyword(s):

Method Of Moments ◽

Minimum Distance ◽

Real Data ◽

Ordinary Least Squares ◽

Estimation Methods ◽

Data Sets ◽

Unknown Parameters ◽

Anderson Darling ◽

Von Mises ◽

Modified Moments

In this paper, we have considered different estimation methods of the unknown parameters of a binomial-exponential 2 distribution. First, we briefly describe different frequentist approaches such as the method of moments, modified moments, ordinary least-squares estimation, weightedleast-squares estimation, percentile, maximum product of spacings, Cramer-von Mises type minimum distance, Anderson-Darling and Right-tail Anderson-Darling, and compare them using extensive numerical simulations. We apply our proposed methodology to three real data sets related to the total monthly rainfall during April, May and September at Sao Carlos, Brazil.

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TRANSMUTED ARCSINE DISTRIBUTION PROPERTIES AND APPLICATION

International Journal of Research -GRANTHAALAYAH ◽

10.29121/granthaalayah.v6.i10.2018.1159 ◽

2018 ◽

Vol 6 (10) ◽

pp. 38-47

Author(s):

Salma Omar Bleed ◽

Arwa Elsunousi Ali Abdelali

Keyword(s):

Maximum Likelihood Method ◽

Risk Function ◽

Real Data ◽

Moment Generating Function ◽

Likelihood Method ◽

Model Parameters ◽

Data Sets ◽

Residual Function ◽

Arcsine Distribution ◽

New Distribution

The distribution of ArcSine will be developed to another new distribution using the Quadratic Rank Transmutation (QRT) method proposed by Shaw and Buckley (2007). The new distribution will be called the Transmuted ArcSine distribution, some of its mathematical characteristics such as variance, expectation, residual function, risk function, moments, moment generating function and characteristic function will be presented. The model parameters will be estimated by the maximum likelihood method. Finally, two real data sets are analyzed to illustrates the usefulness of the TAS distribution.

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The Topp-Leone Generated Weibull Distribution: Regression Model, Characterizations and Applications

International Journal of Statistics and Probability ◽

10.5539/ijsp.v6n1p126 ◽

2016 ◽

Vol 6 (1) ◽

pp. 126 ◽

Cited By ~ 11

Author(s):

Gokarna R. Aryal ◽

Edwin M. Ortega ◽

G. G. Hamedani ◽

Haitham M. Yousof

Keyword(s):

Weibull Distribution ◽

Regression Model ◽

Maximum Likelihood Method ◽

Real Data ◽

Likelihood Method ◽

Data Sets ◽

Lifetime Model ◽

First Time ◽

Two Parameter ◽

New Distribution

This paper introduces a new four-parameter lifetime model called the Topp Leone Generated Weibull (TLGW) distribution. This distribution is a generalization of the two parameter Weibull distribution using the genesis of Topp-Leone distribution. We derive many of its structural properties including ordinary and incomplete moments, quantile and generating functions and order statistics. Parameter estimation using maximum likelihood method and simulation results to assess effectiveness of the distribution are discussed. Also, for the first time, we introduce a regression model based on the new distribution. We prove empirically the importance and flexibility of the new model in modeling various types of real data sets.

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On the Alpha Power Kumaraswamy Distribution: Properties, Simulation and Application

Revista Colombiana de Estadística ◽

10.15446/rce.v43n2.83598 ◽

2020 ◽

Vol 43 (2) ◽

pp. 285-313

Author(s):

Mohamed Ali Ahmed

Keyword(s):

Maximum Likelihood Method ◽

Real Data ◽

Parameters Estimation ◽

Likelihood Method ◽

Data Sets ◽

Alpha Power ◽

Simulation Studies ◽

Data Set ◽

Kumaraswamy Distribution ◽

Mathematical Properties

Adding new parameters to classical distributions becomes one of the most important methods for increasing distributions ﬂexibility, especially, in simulation studies and real data sets. In this paper, alpha power transformation (APT) is used and applied to the Kumaraswamy (K) distribution and a proposed distribution, so called the alpha power Kumaraswamy (AK) distribution, is presented. Some important mathematical properties are derived, parameters estimation of the AK distribution using maximum likelihood method is considered. A simulation study and a real data set are used to illustrate the ﬂexibility of the AK distribution compared with other distributions.

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New Regression Models Based on the Unit-Sinh-Normal Distribution: Properties, Inference, and Applications

Mathematics ◽

10.3390/math9111231 ◽

2021 ◽

Vol 9 (11) ◽

pp. 1231

Author(s):

Guillermo Martínez-Flórez ◽

Roger Tovar-Falón

Keyword(s):

Maximum Likelihood ◽

Regression Models ◽

Maximum Likelihood Method ◽

Real Data ◽

Random Variable ◽

Maximum Likelihood Estimates ◽

Likelihood Method ◽

Data Sets ◽

Modeling Data ◽

Positive Support

In this paper, two new distributions were introduced to model unimodal and/or bimodal data. The first distribution, which was obtained by applying a simple transformation to a unit-Birnbaum–Saunders random variable, is useful for modeling data with positive support, while the second is appropriate for fitting data on the (0,1) interval. Extensions to regression models were also studied in this work, and statistical inference was performed from a classical perspective by using the maximum likelihood method. A small simulation study is presented to evaluate the benefits of the maximum likelihood estimates of the parameters. Finally, two applications to real data sets are reported to illustrate the developed methodology.

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