A robust multivariate measurement error model with skew-normal/independent distributions and Bayesian MCMC implementation

“…Compared to the EM‐type algorithm, utilizing Bayesian methods can also simplify the parameter estimation procedure, especially when the conditional expectations do not exist. Therefore, a possible research direction is to investigate a fully Bayesian treatment via exploring Markov Chain Monte Carlo procedures, such as the Gibbs sampler and the Metropolis‐Hastings algorithm (Arellano‐Valle et al, 2005; Lachos et al, 2009). Analyzing censored data has unceasingly been encountered in diverse scientific fields such as econometrics, biometrics, and clinical trials.…”

“…Bolfarine and Lachos (2006) extended structural probit measurement error models by assuming the skew-normal distribution on the unobserved covariates for analyzing data with binary response variables. Later on, Lachos et al (2009Lachos et al ( , 2010 proposed a robust extension of the MEMs by considering a class of asymmetric thick-tailed distributions, including the skew-normal/independent and scale mixtures of the skew-normal distributions. More recently, Arellano-Valle et al (2020) defined a novel MEM based on the two-piece normal distribution that acts as an alternative model for accommodating asymmetrical features.…”

Multivariate measurement error models with normal mean‐variance mixture distributions

“…Compared to the EM‐type algorithm, utilizing Bayesian methods can also simplify the parameter estimation procedure, especially when the conditional expectations do not exist. Therefore, a possible research direction is to investigate a fully Bayesian treatment via exploring Markov Chain Monte Carlo procedures, such as the Gibbs sampler and the Metropolis‐Hastings algorithm (Arellano‐Valle et al, 2005; Lachos et al, 2009). Analyzing censored data has unceasingly been encountered in diverse scientific fields such as econometrics, biometrics, and clinical trials.…”

“…Bolfarine and Lachos (2006) extended structural probit measurement error models by assuming the skew-normal distribution on the unobserved covariates for analyzing data with binary response variables. Later on, Lachos et al (2009Lachos et al ( , 2010 proposed a robust extension of the MEMs by considering a class of asymmetric thick-tailed distributions, including the skew-normal/independent and scale mixtures of the skew-normal distributions. More recently, Arellano-Valle et al (2020) defined a novel MEM based on the two-piece normal distribution that acts as an alternative model for accommodating asymmetrical features.…”

Multivariate measurement error models with normal mean‐variance mixture distributions

Miscellaneous Topics

Multivariate measurement error models using finite mixtures of skew-Student t distributions