Linganisha mbinu
Pitia mbinu ulizochagua bega kwa bega; safu zinazotofautiana zinaangaziwa.
| Usawazishaji Imara wa Ridge× | Regressioni ya Elastic Net× | |
|---|---|---|
| Nyanja | Takwimu | Takwimu |
| Familia | Regression model | Regression model |
| Mwaka wa asili≠ | 1991 | 2005 |
| Mwanzilishi≠ | Silvapulle (1991); building on Tikhonov (1963) and Huber (1964) | Hui Zou and Trevor Hastie |
| Aina≠ | Regularized robust linear regression | Penalized linear regression |
| Chanzo asilia≠ | Silvapulle, M. J. (1991). Robust ridge regression based on an M-estimator. Australian Journal of Statistics, 33(3), 319–333. link ↗ | Zou, H., & Hastie, T. (2005). Regularization and variable selection via the elastic net. Journal of the Royal Statistical Society: Series B (Statistical Methodology), 67(2), 301-320. DOI ↗ |
| Majina mbadala | ridge M-estimation, robust regularized regression, M-estimator ridge, outlier-resistant ridge regression | elastic net, EN regression, L1+L2 regularized regression, combined lasso-ridge regression |
| Zinazohusiana≠ | 5 | 6 |
| Muhtasari≠ | Robust Ridge regression combines M-estimation with L2 (ridge) regularization to produce coefficient estimates that are simultaneously resistant to outliers and stable under multicollinearity. It minimizes a robust loss function (such as Huber's) penalized by the squared norm of the coefficient vector, downweighting influential observations while shrinking correlated predictors toward zero. | Elastic net regression combines the L1 (lasso) and L2 (ridge) penalties into a single regularized regression framework. Controlled by a mixing parameter alpha and a shrinkage strength lambda, it can simultaneously select variables and handle correlated predictors — overcoming key limitations of pure lasso and pure ridge applied alone. |
| ScholarGateSeti ya data ↗ |
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