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| Sempelan Liar untuk Inferens Regresi× | Bootstrap Bayesian (Rubin)× | Regresi Kuasa Dua Terkecil Biasa (OLS)× | |
|---|---|---|---|
| Bidang≠ | Statistik | Statistik | Ekonometrik |
| Keluarga | Regression model | Regression model | Regression model |
| Tahun asal≠ | 1986 | 1981 | 2019 |
| Pengasas≠ | Wu (1986); refined by Davidson & Flachaire (2008) | Rubin (1981); large-sample theory by Lo (1987) | Wooldridge (textbook treatment); classical least squares |
| Jenis≠ | Resampling-based regression inference | Resampling / posterior simulation | Linear regression |
| Sumber perintis≠ | Wu, C. F. J. (1986). Jackknife, Bootstrap and Other Resampling Methods in Regression Analysis. Annals of Statistics, 14(4), 1261-1295. DOI ↗ | Rubin, D. B. (1981). The Bayesian Bootstrap. The Annals of Statistics, 9(1), 130-134. DOI ↗ | Wooldridge, J. M. (2019). Introductory Econometrics: A Modern Approach (7th ed.). Cengage Learning. ISBN: 978-1337558860 |
| Alias≠ | wild bootstrap, wild cluster bootstrap, Wu-Liu resampling, Wild Bootstrap | Bayesian Bootstrap (Rubin), Rubin bootstrap, Dirichlet-weighted bootstrap | ordinary least squares, classical linear regression, linear regression, en küçük kareler regresyonu |
| Berkaitan | 5 | 5 | 5 |
| Ringkasan≠ | The wild bootstrap is a resampling method for regression models with heteroscedastic errors, introduced by Wu (1986) and refined by Davidson and Flachaire (2008). It builds a bootstrap distribution by rescaling each fitted residual with a random sign, so that standard errors and confidence intervals stay valid when the error variance is not constant or the data are clustered. | The Bayesian Bootstrap, introduced by Donald B. Rubin in 1981, is a resampling method that produces a Bayesian counterpart to the frequentist bootstrap by assigning each observation a random weight drawn from a Dirichlet distribution. It yields a full posterior distribution for a statistic and allows prior information to be incorporated. | Ordinary Least Squares is the classical linear regression method that explains a continuous outcome as a linear combination of predictors. It estimates the coefficients by minimising the sum of squared residuals, and under the Gauss-Markov assumptions these estimates are the best linear unbiased estimator (BLUE). |
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