A Bayesian Multiple Comparison Procedure for Simple Order-Restricted Mixed Models with Missing Values

Shang, Junfeng

doi:10.6339/jds.201107_09(3).0001

Journal of Data Science

2021

DOI: 10.6339/jds.201107_09(3).0001

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A Bayesian Multiple Comparison Procedure for Simple Order-Restricted Mixed Models with Missing Values

Junfeng Shang¹

Abstract: A Bayesian hierarchical model is developed for multiple comparisons in mixed models with missing values where the population means satisfy a simple order restriction. We employ the Gibbs sampling and Metropolis-within-Gibbs sampling techniques to obtain parameter estimates and estimates of the posterior probabilities of the equality of the mean pairs. The latter estimates are used to test whether any two means are significantly different, and to test the global hypothesis of the equality of all means. The perf… Show more

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2024

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Cited by 3 publications

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A Bayesian Hierarchical Model for Multiple Comparisons in Mixed Models

2015

Communications in Statistics - Theory and Methods

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Multiple comparison techniques are to compare more than one pair of treatment means by employing various effective methodologies. In some applications, researchers may believe that before the data are collected, the underlying parameters satisfy an order restriction. But some researchers believe otherwise for certain applications. For instance, in quality control experiments, researchers study the effect of different setting of significant factors, such as the temperature, the pressure, and the different types of machines. The researchers believe that in order to find complete significant results, all treatments should be mixed up and comparisons should be applied to each pair of them. To facilitate multiple comparisons, certain methodologies are proposed and applied. Generally, the frequentist and the Bayesian methodologies are used to conduct multiple comparisons. In this dissertation, we are interested in the Bayesian approach. We propose a hierarchical model in developing and applying multiple comparisons without any restriction in mixed models. The model facilitates inferences in parameterizing the successive differences of the population means, and for them we choose independent prior distributions that are mixtures of a normal distribution and a discrete distribution with its entire mass at zero. For the other parameters, we choose conjugate or non-informative priors, and we derive the full conditional posterior distributions for the parameters in the mixed models. A simulation study is performed to investigate the effectiveness of the proposed hierarchical model. In the simulations, a sequence of different simulated data sets is utilized. To Finally, I would like to give my deepest gratitude to my parents, my wife Xiangyi Li, and my four-month-old son Aaron for their support and love.

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A Bayesian Hierarchical Model for Multiple Comparisons in Mixed Models

2015

Communications in Statistics - Theory and Methods

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Bayesian Model Selection in Order-Restricted Two-Way ANOVA Mixed Models

Shi

2019

Statistics in Biopharmaceutical Research

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Simultaneous Fixed and Random Effects Selection in Order-restricted Mixed Effects Models

Shi,

2024

Wseas Transactions on Mathematics

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When dealing with longitudinal data, if we directly select a specific model for modeling without any prior information about the existence of significant random effects before utilizing the mixed model, it may result in the misuse of the model, thereby affecting the final estimation results. This paper investigates a variable selection method that can jointly select both ﬁxed and random eﬀects in Bayesian mixed model under order constraints. This method can effectively prevent model misuse. A computationally feasible Gibbs algorithm is proposed for posterior inference. The performance of our proposal is evaluated by simulated data and two real applications related to Blood lead levels and Ramus bone heights. Results show that the proposed approaches perform very well in various situations.

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A Bayesian Multiple Comparison Procedure for Simple Order-Restricted Mixed Models with Missing Values

Cited by 3 publications

References 18 publications

A Bayesian Hierarchical Model for Multiple Comparisons in Mixed Models

A Bayesian Hierarchical Model for Multiple Comparisons in Mixed Models

Bayesian Model Selection in Order-Restricted Two-Way ANOVA Mixed Models

Simultaneous Fixed and Random Effects Selection in Order-restricted Mixed Effects Models

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