مقایسهٔ روشها
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| تحلیل طیف منفرد× | تحلیل مؤلفههای اصلی کرنل (Kernel PCA)× | تجزیه مقادیر منفرد× | |
|---|---|---|---|
| حوزه≠ | سریهای زمانی | یادگیری ماشین | روشهای عددی |
| خانواده≠ | Process / pipeline | Latent structure | Machine learning |
| سال پیدایش≠ | 1986 | 1998 | 1965 |
| پدیدآور≠ | David Broomhead | Schölkopf, B.; Smola, A. J.; Müller, K.-R. | Gene Golub |
| نوع≠ | Dimension reduction and trend extraction | Nonlinear dimensionality reduction via kernel trick | Linear algebra decomposition |
| منبع بنیادین≠ | Broomhead, D. S., & King, G. P. (1986). Extracting qualitative dynamics from experimental data. Physica D: Nonlinear Phenomena, 20(2–3), 217–236. DOI ↗ | Schölkopf, B., Smola, A. J., & Müller, K.-R. (1998). Nonlinear component analysis as a kernel eigenvalue problem. Neural Computation, 10(5), 1299–1319. DOI ↗ | Golub, G. H., & Kahan, W. (1970). Calculating the singular values and pseudo-inverse of a matrix. Journal of the SIAM Series B: Numerical Analysis, 2(2), 205–224. DOI ↗ |
| نامهای دیگر≠ | SSA, SVD-based decomposition | KPCA, kernel PCA, nonlinear PCA via kernel trick, kernel eigenvalue decomposition | SVD, thin SVD, reduced SVD |
| مرتبط≠ | 3 | 5 | 0 |
| خلاصه≠ | Singular Spectrum Analysis (SSA) is a nonparametric method for time-series decomposition and forecasting based on singular value decomposition (SVD) of a time-lagged embedding matrix. Introduced by Broomhead and King (1986) and developed further by Vautard, Yiou, and Ghil (1992), SSA decomposes time series into trend, oscillatory, and noise components without assuming any underlying model. It is particularly effective for short, noisy non-stationary signals where parametric approaches fail. | Kernel Principal Component Analysis (Kernel PCA) is a nonlinear dimensionality-reduction method introduced by Bernhard Schölkopf, Alexander Smola, and Klaus-Robert Müller in 1997–1998. It extends classical linear PCA to curved, non-linear data manifolds by implicitly mapping input data into a high-dimensional feature space via a kernel function, then performing standard PCA in that space — all without ever computing the mapping explicitly. | Singular Value Decomposition (SVD) is a fundamental matrix factorization technique that decomposes any m × n matrix A into the product A = U Σ V^T, where U and V are orthogonal matrices and Σ is a diagonal matrix of singular values. Developed by Gene Golub and others in the 1960s–1970s, SVD is the most robust method for analyzing matrix structure and solving linear systems. |
| ScholarGateمجموعهداده ↗ |
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