The New Odd Log-Logistic Generalized Inverse Gaussian Regression Model

Vasconcelos, Julio Cezar Souza; Cordeiro, Gauss M.; Ortega, Edwin M. M.; Araújo, Elton Gean

doi:10.1155/2019/8575424

Cited by 11 publications

(3 citation statements)

References 16 publications

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“…Plots of (4.1) in Figure 5 show the bimodality and great flexibility of the density of Y . Recently, some extended regressions can be found in [19,[21][22][23]. In a similar manner, we propose the LMOOLLW regression as an alternative for modeling four types of failure rate functions.…”

Section: The Lmoollw Regressionmentioning

confidence: 96%

A new extended log-Weibull regression: Simulations and applications

Cordeiro

Tahir

Vasconcelos

et al. 2021

Hacettepe Journal of Mathematics and Statistics

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The induction of one or more parameter(s) in parent distributions opened new doors for flexible modeling in modern distribution theory. Among well-established generalized (G) classes for flexible modeling, the exponentiated-G, Marshall-Olkin-G and odd log-logistic-G families offer induction of one additional parameter while the beta-G and Kumaraswamy-G classes offer two extra shape parameters. The Marshall-Olkin-odd-loglogistic-G (MOOLL-G) family serves as an alternative to the beta-G and Kumaraswamy-G classes. A new motivation for the MOOLL-G family for competing risk scenarios, some useful properties, and parameter estimation are addressed. The new log-MOOLL-Weibull regression is useful for analysis of real life data. The accuracy of the estimates and the residuals is addressed via Monte Carlo simulations. The presented models outperform some other well-known models.

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Section: The Lmoollw Regressionmentioning

confidence: 96%

A new extended log-Weibull regression: Simulations and applications

Cordeiro

Tahir

Vasconcelos

et al. 2021

Hacettepe Journal of Mathematics and Statistics

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“…(2019) [15] formulated the exponentiated power exponential regression and Souza Vasconcelos et al. (2019) [16] studied the odd log‐logistic regression based on a generalised inverse Gaussian distribution.…”

Section: The Ollln Regressionmentioning

confidence: 99%

“…Prataviera et al (2018) [12] defined the generalised odd log-logistic flexible Weibull regression model with applications in repairable systems and Hashimoto et al (2019) [13] introduced the zero-spiked regression models with application in the resin oil production. More recently, Hashimoto et al (2019) [14] proposed the Burr XII gamma-Weibull regression model with random effects and censored data, Prataviera et al (2019) [15] formulated the exponentiated power exponential regression and Souza Vasconcelos et al (2019) [16] studied the odd log-logistic regression based on a generalised inverse Gaussian distribution.…”

Section: The Ollln Regressionmentioning

confidence: 99%

A regression model for extreme events and the presence of bimodality with application to energy generation data

Vasconcelos

Cordeiro

Ortega

et al. 2021

IET Renewable Power Gen

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The application of the theory of extreme values has been growing due to increasing interest in extreme natural events. Many articles on extreme values in data modelling consider unimodal data. This work introduces an appropriate regression for extreme values to detect the presence of bimodality by means of systematic components of two parameters of the odd log‐logistic log‐normal distribution. The global influence is addressed to verify the model robustness and to find possible influential points. Quantile residuals are proposed to detect distribution deficiencies and outliers in the new regression. A real dataset from the electricity generation area is analysed, namely the Santo Antônio Hydroelectric Plant in the state of Rondônia (Brazil), to illustrate the potential of the new regression. The main results indicate that the proposed regression can identify changes in the means and variability of the power generation between extreme events, that is, between the months of June and December.

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