https://orcid.org/0000-0001-6776-6690
References
- Fuller WA. Measurement error models. New York: John Wiley & Sons; 1987.
- Cheng CL, Van Ness JW. Statistical regression with measurement error. New York: John Wiley & Sons; 1999.
- Carroll RJ, Ruppert D, Stefanski LA, et al. Measurement error in nonlinear models: a modern perspective. Boca Raton: CRC Press; 2006.
- Rees F, Doherty M, Grainge MJ, et al. The worldwide incidence and prevalence of systemic lupus erythematosus: a systematic review of epidemiological studies. Rheumatology. 2017;56:1945–1961.
- Nieves CEF, Izmirly PM. Mortality in systemic lupus erythematosus: an updated review. Curr Rheumatol Rep. 2016;18:21.
- Lima DS. Estudo da relação proteína/creatinina em amostra isolada de urina x proteinúria de 24 horas na avaliação de pacientes com lúpus eritematoso sistêmico. Technical Report. Federal University of Amazonas; 2015.
- Bolfarine H, Arellano-Valle RB. Robust modelling in measurement error models using the t distribution. Brazilian J Probab Stat. 1994;8:67–84.
- Galea M, Bolfarine H, Vilca F. Local influence in comparative calibration models under elliptical t-distributions. Biometrical J: J Math Methods Biosci. 2005;47:691–706.
- de Castro M, Galea M. Robust inference in an heteroscedastic measurement error model. J Korean Stat Soc. 2010;39:439–447.
- Rocha GH, Loschi RH, Arellano-Valle RB. Bayesian mismeasurement t-models for censored responses. Statistics. 2016;50:841–869.
- Matos LA, Castro LM, Cabral CR, et al. Multivariate measurement error models based on Student-t distribution under censored responses. Statistics. 2018;52:1395–1416.
- Lachos V, Garibay V, Labra F, et al. A robust multivariate measurement error model with skew-normal/independent distributions and Bayesian MCMC implementation. Stat Methodol. 2009;6:527–541.
- Lachos V, Labra F, Bolfarine H, et al. Multivariate measurement error models based on scale mixtures of the skew–normal distribution. Statistics. 2010;44:541–556.
- Tomaya LC, de Castro M. A heteroscedastic measurement error model based on skew and heavy-tailed distributions with known error variances. J Stat Comput Simul. 2018;88:2185–2200.
- Carroll RJ, Roeder K, Wasserman L. Flexible parametric measurement error models. Biometrics. 1999;55:44–54.
- McLachlan G, Peel D. Finite mixture models. New York: John Wiley & Sons; 2000.
- Cabral CRB, Lachos VH, Prates MO. Multivariate mixture modeling using skew-normal independent distributions. Comput Stat Data Anal. 2012b;56:126–142.
- Cabral CRB, Lachos VH, Zeller CB. Multivariate measurement error models using finite mixtures of skew-student t distributions. J Multivar Anal. 2014;124:179–198.
- Birnbaum ZW. Effect of linear truncation on a multinormal population. Ann Math Stat. 1950;21:272–279.
- Nelson LS. The sum of values from a normal and a truncated normal distribution. Technometrics. 1964;6:469–471.
- Azzalini A. A class of distributions which includes the normal ones. Scand J Stat. 1985;12:171–178.
- Azzalini A, Dalla Valle A. The multivariate skew-normal distribution. Biometrika. 1996;83:715–726.
- Arellano-Valle RB, Azzalini A. On the unification of families of skew-normal distributions. Scand J Stat. 2006;33:561–574.
- Azzalini A, Capitanio A. The skew-normal and related families. Cambridge: Cambridge University Press; 2014.
- Arellano-Valle RB, Genton MG. On fundamental skew distributions. J Multivar Anal. 2005;96:93–116.
- Branco MD, Dey DK. A general class of multivariate skew-elliptical distributions. J Multivar Anal. 2001;79:99–113.
- Andrews DF, Mallows CL. Scale mixtures of normal distributions. J R Stat Soc, Ser B. 1974;36:99–102.
- R Core Team, R: A language and environment for statistical computing. Vienna, Austria: R Foundation for Statistical Computing; 2020.
- Dávila VHL, Cabral CRB, Zeller CB. Finite mixture of skewed distributions. Cham: Springer; 2018.
- Vidal I, Castro LM. Influential observations in the independent student-t measurement error model with weak nondifferential error. Chil J Stat. 2010;1:17–34.
- Cabral CRB, Lachos VH, Madruga MR. Bayesian analysis of skew-normal independent linear mixed models with heterogeneity in the random-effects population. J Stat Plan Inference. 2012a;142:181–200.
- Richardson S, Green PJ. On Bayesian analysis of mixtures with an unknown number of components. J R Stat Soc, Ser B. 1997;59:731–792.
- Fonseca TCO, Ferreira MAR, Migon HS. Objective Bayesian analysis for the Student-t regression model. Biometrika. 2008;95:325–333.
- Garay AM, Bolfarine H, Lachos VH, et al. Bayesian analysis of censored linear regression models with scale mixtures of normal distributions. J Appl Stat. 2015;42:2694–2714.
- Congdon P. Bayesian statistical modelling. New York: John Wiley & Sons; 2007.
- Plummer M, et al. JAGS: A program for analysis of Bayesian graphical models using Gibbs sampling. In: Proceedings of the 3rd International Workshop on Distributed Statistical Computing. Vol. 124. Vienna, Austria; 2003, p. 1–10.
- Carpenter B, Gelman A, Hoffman MD, et al. Stan: a probabilistic programming language. J Stat Softw. 2017;76:1–32.
- Spiegelhalter DJ, Best NG, Carlin BP, et al. Bayesian measures of model complexity and fit. J R Stat Soc, Ser B. 2002;64:583–639.
- Stephens M. Bayesian methods for mixtures of normal distributions [Ph.D. thesis]. Oxford: Magdalen College; 1997.
- Celeux G, Forbes F, Robert CP, et al. Deviance information criteria for missing data models. Bayesian Anal. 2006;1:651–674.
- Spiegelhalter DJ, Best NG, Carlin BP, et al. The deviance information criterion: 12 years on. J R Stat Soc: Ser B: Stat Method. 2014;76:485–493.
- Barndorff-Nielsen OE. Normal inverse Gaussian distributions and stochastic volatility modelling. Scand J Stat. 1997;24:1–13.
- Zeller CB, Cabral CRB, Lachos VH, et al. Finite mixture of regression models for censored data based on scale mixtures of normal distributions. Adv Data Anal Classif. 2019;13:89–116.
- Lele SR, Nadeem K, Schmuland B. Estimability and likelihood inference for generalized linear mixed models using data cloning. J Am Stat Assoc. 2010;105:1617–1625.
- Sólymos P. dclone: data cloning in R. R Journal. 2010;2:29–37.
- Massuia MB, Garay AM, Cabral CR, et al. Bayesian analysis of censored linear regression models with scale mixtures of skew-normal distributions. Stat Interface. 2017;10:425–439.
- Brooks SP. Discussion on the paper by spiegelhalter, best, carlin, and van der Linde. J R Stat Soc, Ser B. 2002;64:616–618.
- Garay AM, Lachos VH, Bolfarine H. Bayesian estimation and case influence diagnostics for the zero-inflated negative binomial regression model. J Appl Stat. 2015;42:1148–1165.
- Gelman A, Carlin JB, Stern HS, et al. Bayesian data analysis. 3rd ed.. Boca Raton: CRC Press; 2014.
- Barnett VD. Simultaneous pairwise linear structural relationships. Biometrics. 1969;25:129–142.
- Gelman A, et al. Prior distributions for variance parameters in hierarchical models (comment on article by browne and draper). Bayesian Anal. 2006;1:515–534.