Methoden vergelijken
Bekijk de geselecteerde methoden naast elkaar; rijen die verschillen zijn gemarkeerd.
| Metropolis-Hastings met meetfout× | Gibbs-sampling met meetfout× | |
|---|---|---|
| Vakgebied | Bayesiaanse statistiek | Bayesiaanse statistiek |
| Familie | Bayesian methods | Bayesian methods |
| Jaar van ontstaan≠ | 1953 (base algorithm); 1990s (measurement-error application) | 1990–1993 |
| Grondlegger≠ | Metropolis et al. (1953); measurement-error extension developed in the 1990s Bayesian literature | Gelfand & Smith (Gibbs sampler); Richardson & Gilks (measurement error extension) |
| Type≠ | MCMC sampling algorithm | Bayesian MCMC sampling algorithm |
| Oorspronkelijke bron≠ | Carroll, R. J., Ruppert, D., Stefanski, L. A., & Crainiceanu, C. M. (2006). Measurement Error in Nonlinear Models: A Modern Perspective (2nd ed.). Chapman and Hall/CRC. ISBN: 978-1584886334 | Gelfand, A. E. & Smith, A. F. M. (1990). Sampling-based approaches to calculating marginal densities. Journal of the American Statistical Association, 85(410), 398–409. DOI ↗ |
| Aliassen | MH with measurement error, Metropolis-Hastings errors-in-variables, MCMC errors-in-variables, Bayesian errors-in-variables MCMC | Gibbs sampler with errors-in-variables, MCMC measurement error model, Bayesian errors-in-variables Gibbs, Gibbs EIV sampling |
| Verwant≠ | 4 | 5 |
| Samenvatting≠ | Metropolis-Hastings with measurement error is a Bayesian MCMC approach that jointly estimates model parameters and the true (unobserved) covariate values when predictors or outcomes are recorded with noise. By treating the latent true values as unknown parameters, it propagates measurement uncertainty fully into posterior inference rather than ignoring it or correcting for it post hoc. | Gibbs sampling with measurement error is a Bayesian MCMC method that jointly estimates unknown true covariate values and model parameters when the observed data are corrupted by measurement error. By treating the latent true values as additional unknowns, it samples all quantities iteratively from their full conditional distributions, propagating measurement uncertainty into every downstream inference. |
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