Сравнение методов
Просматривайте выбранные методы рядом; строки с различиями подсвечены.
| Взвешенная стохастическая блочная модель× | Взвешенный анализ мо-дулярности× | |
|---|---|---|
| Область | Сетевой анализ | Сетевой анализ |
| Семейство | Machine learning | Machine learning |
| Год появления≠ | 2014 | 2004 |
| Автор метода≠ | Aicher, C.; Jacobs, A. Z.; Clauset, A. | Newman, M. E. J. |
| Тип≠ | Generative probabilistic model | Community structure optimization on weighted graphs |
| Основополагающий источник≠ | Aicher, C., Jacobs, A. Z., & Clauset, A. (2014). Learning latent block structure in weighted networks. Journal of Complex Networks, 3(2), 221–248. DOI ↗ | Newman, M. E. J. (2004). Analysis of weighted networks. Physical Review E, 70(5), 056131. DOI ↗ |
| Другие названия | W-SBM, weighted SBM, weighted block model, weighted community detection via SBM | weighted modularity, weighted Q optimization, weighted network community detection, strength-based modularity |
| Связанные≠ | 6 | 5 |
| Сводка≠ | The Weighted Stochastic Block Model (W-SBM) extends the classical stochastic block model to networks whose edges carry numerical weights. By positing that edge weights between node pairs arise from distributions that depend on the block memberships of those nodes, it simultaneously infers a partition of nodes into communities and a set of block-to-block weight parameters — recovering structure invisible to unweighted methods. | Weighted modularity analysis extends the classical Newman-Girvan modularity measure to networks where edges carry numeric strengths (frequencies, intensities, costs). By replacing binary adjacency with tie weights, it finds community partitions that reflect how densely interconnected subgroups are relative to what is expected under a weighted null model, yielding more nuanced groupings than unweighted approaches on data where edge strength varies meaningfully. |
| ScholarGateНабор данных ↗ |
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