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| Hierarchical Clustering× | K-Means klastreerimine× | Spektraalklasterdamine× | |
|---|---|---|---|
| Valdkond | Masinõpe | Masinõpe | Masinõpe |
| Perekond | Machine learning | Machine learning | Machine learning |
| Tekkeaasta≠ | 1963 | 1967 | 2002 |
| Looja≠ | Ward, J. H. | MacQueen, J. | Ng, A. Y.; Jordan, M. I.; Weiss, Y. |
| Tüüp≠ | Unsupervised clustering (agglomerative) | Partitional clustering (centroid-based) | Graph-based clustering (spectral method) |
| Algallikas≠ | Ward, J. H. (1963). Hierarchical Grouping to Optimize an Objective Function. Journal of the American Statistical Association, 58(301), 236–244. DOI ↗ | MacQueen, J. (1967). Some Methods for Classification and Analysis of Multivariate Observations. Proceedings of the 5th Berkeley Symposium on Mathematical Statistics and Probability, 1, 281–297. link ↗ | Ng, A. Y., Jordan, M. I., & Weiss, Y. (2002). On Spectral Clustering: Analysis and an Algorithm. Advances in Neural Information Processing Systems, 14, 849–856. link ↗ |
| Rööpnimetused≠ | Hiyerarşik Kümeleme, hiyerarşik kümeleme, agglomerative clustering, hierarchical agglomerative clustering | K-Ortalamalar Kümeleme, k-ortalamalar kümeleme, k-means, centroid clustering | NJW spectral clustering, graph Laplacian clustering, normalized spectral clustering, spectral graph clustering |
| Seotud≠ | 4 | 3 | 5 |
| Kokkuvõte≠ | Hierarchical clustering is an unsupervised method that groups observations into nested clusters and draws the result as a dendrogram, so the number of clusters need not be fixed in advance. Its agglomerative form rests on the objective-function grouping criterion introduced by Joe Ward in 1963. | K-Means Clustering is a centroid-based partitional clustering algorithm, traced to J. MacQueen in 1967, that splits data into k clusters by assigning each observation to its nearest cluster centre. It is widely used for marketing segmentation, customer grouping, and exploratory analysis. | Spectral Clustering is a graph-based unsupervised learning algorithm, formalized by Ng, Jordan, and Weiss in 2002, that maps data points into a low-dimensional eigenspace derived from the similarity graph's Laplacian before applying k-means. This spectral embedding makes it possible to recover clusters of arbitrary shape — rings, crescents, interleaved spirals — that Euclidean distance-based methods consistently fail to separate. |
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