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| 自己組織化マップ(Kohonen Map)× | K平均法クラスタリング× | Locally Linear Embedding (LLE)(局所線形埋め込み)× | |
|---|---|---|---|
| 分野 | 機械学習 | 機械学習 | 機械学習 |
| 系統 | Machine learning | Machine learning | Machine learning |
| 提唱年≠ | 1982 | 1967 | 2000 |
| 提唱者≠ | Teuvo Kohonen | MacQueen, J. | Sam Roweis & Lawrence Saul |
| 種類≠ | Unsupervised neural network for topology-preserving mapping | Partitional clustering (centroid-based) | Nonlinear manifold dimensionality reduction |
| 原典≠ | Kohonen, T. (1982). Self-organized formation of topologically correct feature maps. Biological Cybernetics, 43(1), 59–69. 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 ↗ | Roweis, S. T., & Saul, L. K. (2000). Nonlinear dimensionality reduction by locally linear embedding. Science, 290(5500), 2323–2326. DOI ↗ |
| 別名 | SOM, Kohonen map, Kohonen network, öz-örgütlemeli harita | K-Ortalamalar Kümeleme, k-ortalamalar kümeleme, k-means, centroid clustering | LLE, manifold learning, nonlinear dimensionality reduction, yerel doğrusal gömme |
| 関連 | 3 | 3 | 3 |
| 概要≠ | A self-organizing map is an unsupervised neural network, introduced by Teuvo Kohonen in 1982, that projects high-dimensional data onto a low-dimensional (usually two-dimensional) grid of prototype vectors while preserving the data's topology — nearby inputs map to nearby grid cells. It is used for visualization, clustering, and exploratory analysis, turning complex data into an ordered, interpretable map. | 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. | Locally linear embedding, introduced by Sam Roweis and Lawrence Saul in 2000, is a manifold-learning method for nonlinear dimensionality reduction. It assumes that although data may curve through a high-dimensional space, each point and its neighbours lie approximately on a flat patch. LLE captures each point as a weighted combination of its neighbours and then finds a low-dimensional layout that preserves those same local relationships, unrolling curved structure into a faithful low-dimensional map. |
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