Weighted Graph Cuts without Eigenvectors A Multilevel Approach
The University of Texas at Austin · Microsoft (United States)
Abstract
A variety of clustering algorithms have recently been proposed to handle data that is not linearly separable; spectral clustering and kernel k-means are two of the main methods. In this paper, we discuss an equivalence between the objective functions used in these seemingly different methods--in particular, a general weighted kernel k-means objective is mathematically equivalent to a weighted graph clustering objective. We exploit this equivalence to develop a fast, high-quality multilevel algorithm that directly optimizes various weighted graph clustering objectives, such as the popular ratio cut, normalized cut, and ratio association criteria. This eliminates the need for any eigenvector computation for…
Citation impact
- FWCI
- 30.28
- Percentile
- 100%
- References
- 33
Authors
3Topics & keywords
- Cluster analysis
- Correlation clustering
- Spectral clustering
- Rand index
- Computer science
- Pattern recognition (psychology)
- Kernel (algebra)
- Hierarchical clustering