Abstract
In this paper, we propose the classical and Bayesian regression models for use in conjunction with the inverted Weibull (IW) distribution; there are the inverted Weibull Regression model (IW-Reg) and inverted Weibull Bayesian regression model (IW-BReg). In the proposed models, we suggest the logarithm and identity link functions, while in the Bayesian approach, we use a gamma prior and two loss functions, namely zero-one and modified general entropy (MGE) loss functions. To deal with the outliers in the proposed models, we apply Huber and Tukey’s bisquare (biweight) functions. In addition, we use the iteratively reweighted least squares (IRLS) algorithm to estimate Bayesian regression coefficients. Further, we compare IW-Reg and IW-BReg using some performance criteria, such as Akaike’s information criterion (AIC), deviance (D), and mean squared error (MSE). Finally, we apply the some real datasets collected from Saudi Arabia with the corresponding explanatory variables to the theoretical findings. The Bayesian approach shows better performance compare to the classical approach in terms of the considered performance criteria.
Highlights
McCullagh and Nelder [1] published a book on the generalized linear models (GLMs) that led to their widespread use and appreciation
The iteratively reweighted least squares (IRLS) algorithm is amenable to some statistics and measures that are common to all the GLMs
In order to develop a Bayesian approach, we suggest inverted Weibull Bayesian generalized linear models (IW-BReg) that are similar to the approach in Section 3, except that the distribution of the response variable is not a member of the exponential family
Summary
McCullagh and Nelder [1] published a book on the generalized linear models (GLMs) that led to their widespread use and appreciation They extended the scoring method to maximum likelihood estimation (MLE) in exponential families. Calabria and Pulcini [8] proposed the IW distribution as a suitable model to describe mechanical degradation phenomena They investigated a statistical property of the maximum likelihood estimator of the IW reliability. MLE and the least square method (LSE)) and the Bayesians (the squared error loss function (SQR), Linex loss function (LIN), General entropy loss function (GE), the Precautionary loss function (PRE)) to estimate the unknown parameters of the IW distribution when data under consideration are progressively type-II censoring.
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