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| Bayesianowska ANCOVA× | Regresja liniowa bayesowska× | |
|---|---|---|
| Dziedzina≠ | Statystyka | Statystyka bayesowska |
| Rodzina≠ | Hypothesis test | Bayesian methods |
| Rok powstania≠ | 2012 (formalized; Bayesian general linear models since 1960s) | 2013 (modern reference); foundations 18th–19th century |
| Twórca≠ | Building on Jeffreys (1961) and developed formally for regression/ANCOVA by Rouder & Morey (2012) | Thomas Bayes / Pierre-Simon Laplace (foundations); modern workflow codified by Gelman et al. |
| Typ≠ | Bayesian parametric covariate-adjusted group comparison | Bayesian linear model |
| Źródło pierwotne≠ | Rouder, J. N., & Morey, R. D. (2012). Default Bayes factors for model selection in regression. Multivariate Behavioral Research, 47(6), 877–903. DOI ↗ | Gelman, A., Carlin, J. B., Stern, H. S., Dunson, D. B., Vehtari, A. & Rubin, D. B. (2013). Bayesian Data Analysis (3rd ed.). CRC Press. ISBN: 978-1439840955 |
| Inne nazwy≠ | Bayesian ANCOVA, Bayesian analysis of covariance, B-ANCOVA, Bayesian covariate-adjusted group comparison | bayesian linear model, probabilistic linear regression, Bayesçi Doğrusal Regresyon |
| Pokrewne≠ | 5 | 4 |
| Podsumowanie≠ | Bayesian Analysis of Covariance (Bayesian ANCOVA) extends classical ANCOVA by placing prior distributions on group effects and covariate slopes, then updating them with observed data to obtain posterior distributions and Bayes factors. It quantifies evidence for group differences on a continuous outcome after statistically adjusting for one or more continuous covariates, without relying on p-value thresholds. | Bayesian linear regression is a probabilistic extension of the ordinary linear model, introduced through Bayes' rule and formalised in its modern computational workflow by Gelman et al. (2013). Rather than returning a single point estimate for each coefficient, it combines a user-specified prior distribution with the likelihood of the observed data to produce a full posterior distribution over all parameters, from which credible intervals and posterior predictive distributions are derived. |
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