Stein‐type shrinkage estimators in gamma regression model with application to prostate cancer data

Mandal, Saumen; Belaghi, Reza Arabi; Mahmoudi, Akram; Aminnejad, Minoo

doi:10.1002/sim.8297

Cited by 14 publications

(11 citation statements)

References 28 publications

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“…According to (5), the first three order derivative of l n (θ) with respect to θ is continuous and finite for all θ ∈ K θ . This condition ensures the existence of the Taylor expansion, the finite variance of the derivatives of l n (θ).…”

Section: A Model and Estimationmentioning

confidence: 99%

“…Because of the flexibility of the relationship to many other distributions, the Gamma distribution can be a suitable alternative for modelling such kinds of the positive-valued dependent variable. The Gamma distribution-based models have been applied in many areas, such as medical science [4], [5], biology [6], economics [7], [8], forest science [9] and education [10]. Considering the ubiquitous heteroscedasticity of actually applied data, as a member of the well-known GLM, the Gamma distribution based generalized linear model (GaGLM) is more widely used when α and β are both dependent variables.…”

Section: Introductionmentioning

confidence: 99%

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Consistency and Asymptotic Normality of the Maximum Likelihood Estimator in GaGLM

Wang

Qin

2022

IEEE Access

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The Gamma distribution based generalized linear model (GaGLM) is a kind of statistical model feasible for the positive value of a non-stationary stochastic system, in which the location and the scale are regressed by the corresponding explanatory variables. This paper theoretically investigates the asymptotic properties of maximum likelihood estimates (MLE) of GaGLM, which can benefit the further interval estimates, hypothesis tests and stochastic control design. First, the score function and the Fisher information matrix for GaGLM are derived. Then, the Lyapunov condition is derived to ensure the asymptotic normality of the score function normalized by the Fisher information matrix. Based on this condition, the asymptotic normality of the MLE of GaGLM is proven. Finally, a numerical example is given to testify the asymptotic properties obtained in the research. The numerical results indicate that the MLE of GaGLM converged to a normal distribution as the number of sample measurements increased.INDEX TERMS Gamma distribution, Gamma regression, consistency and asymptotic normality, central limit theorem, maximum likelihood estimator.

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Section: A Model and Estimationmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Consistency and Asymptotic Normality of the Maximum Likelihood Estimator in GaGLM

Wang

Qin

2022

IEEE Access

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show abstract

“…According to (5), the first three order derivative of l n (θ θ θ) with respect to θ θ θ is continuous and finite for all θ θ θ ∈ K θ θ θ . This condition ensures the existence of the Taylor expansion, the finite variance of the derivatives of l n (θ θ θ).…”

Section: A Model and Estimationmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Consistency and Asymptotic Normality of the Maximum Likelihood Estimator in GaGLM

Wang¹,

Gu²,

Pan³

2021

Preprint

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This paper theoretically investigates the asymptotic properties of maximum likelihood estimates of GaGLM, and discusses some properties about Gamma distribution. It can provide theoretical foundation for expanding the application scope of gamma distribution based regression model, and benefit the further interval estimates, hypothesis tests and stochastic control design.The existence of the Gamma function in Gamma distribution makes correlation analysis certain specificity, and few researchers do relevant theoretical research. To complement this part, we established the asymptotic properties and the application condition of maximum likelihood estimates of GaGLM. In addition to this, we also discussed the propertis of the Fisher information matrix ,and n-order moment of Z and log(Z).

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“…Its main advantage over the ridge regression estimator is that it is a linear function of the shrinkage parameter. 2 Lately, shrinkage estimators have been used for different types of datasets such as Mandal et al [22] where the Gamma regression model was considered to analyze the prostate cancer data, Maronna [25] suggesting methods for high dimensional data, and Peterson and Kuhn [30] developed methods to deal with noise variables. Different estimators have been proposed in the literature to improve the original ridge estimator by Hoerl and Kennard [9].…”

Section: Introductionmentioning

confidence: 99%

A new class of efficient and debiased two-step shrinkage estimators: method and application

Qasim

Månsson

Sjölander

et al. 2021

Journal of Applied Statistics

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This paper introduces a new class of efficient and debiased two-step shrinkage estimators for a linear regression model in the presence of multicollinearity. We derive the proposed estimators' mean square error and define the necessary and sufficient conditions for superiority over the existing estimators. In addition, we develop an algorithm for selecting the shrinkage parameters for the proposed estimators. The comparison of the new estimators versus the traditional ordinary least squares, ridge regression, Liu, and the two-parameter estimators is done by a matrix mean square error criterion. The Monte Carlo simulation results show the superiority of the proposed estimators under certain conditions. In the presence of high but imperfect multicollinearity, the two-step shrinkage estimators' performance is relatively better. Finally, two real-world chemical data are analyzed to demonstrate the advantages and the empirical relevance of our newly proposed estimators. It is shown that the standard errors and the estimated mean square error decrease substantially for the proposed estimator. Hence, the precision of the estimated parameters is increased, which of course is one of the main objectives of the practitioners.

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Stein‐type shrinkage estimators in gamma regression model with application to prostate cancer data

Cited by 14 publications

References 28 publications

Consistency and Asymptotic Normality of the Maximum Likelihood Estimator in GaGLM

Consistency and Asymptotic Normality of the Maximum Likelihood Estimator in GaGLM

Consistency and Asymptotic Normality of the Maximum Likelihood Estimator in GaGLM

A new class of efficient and debiased two-step shrinkage estimators: method and application

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