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| Τοπική Παλινδρόμηση LOESS / LOWESS× | Παλινδρόμηση και Εξομαλυντικές Σπλίνες× | |
|---|---|---|
| Πεδίο | Μηχανική Μάθηση | Μηχανική Μάθηση |
| Οικογένεια | Machine learning | Machine learning |
| Έτος προέλευσης≠ | 1979 | 1996 |
| Δημιουργός≠ | William S. Cleveland | Spline regression literature; P-splines by Eilers & Marx |
| Τύπος≠ | Local nonparametric regression smoother | Piecewise-polynomial nonparametric regression |
| Θεμελιώδης πηγή≠ | Cleveland, W. S. (1979). Robust locally weighted regression and smoothing scatterplots. Journal of the American Statistical Association, 74(368), 829–836. DOI ↗ | Eilers, P. H. C., & Marx, B. D. (1996). Flexible smoothing with B-splines and penalties. Statistical Science, 11(2), 89–121. DOI ↗ |
| Εναλλακτικές ονομασίες≠ | LOWESS, local regression, locally weighted scatterplot smoothing, yerel regresyon | splines, cubic splines, natural splines, smoothing splines |
| Συναφείς≠ | 3 | 4 |
| Σύνοψη≠ | LOESS (locally estimated scatterplot smoothing), introduced by William Cleveland in 1979 and extended with Susan Devlin in 1988, fits a smooth curve through data by performing a separate weighted polynomial regression in the neighbourhood of each point. Nearby observations count more than distant ones, so the method follows local structure without assuming any global functional form, making it a popular exploratory smoother for scatterplots. | Regression splines model a nonlinear relationship by fitting piecewise polynomials that join smoothly at a set of points called knots. Cubic and natural splines are the most common, and smoothing splines add a roughness penalty that automatically balances fit against smoothness. Splines are the standard flexible building block for univariate nonlinear regression and the basis of generalized additive models. |
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