English

Notes on Elementary Spectral Graph Theory. Applications to Graph Clustering Using Normalized Cuts

Computer Vision and Pattern Recognition 2013-11-12 v1

Abstract

These are notes on the method of normalized graph cuts and its applications to graph clustering. I provide a fairly thorough treatment of this deeply original method due to Shi and Malik, including complete proofs. I include the necessary background on graphs and graph Laplacians. I then explain in detail how the eigenvectors of the graph Laplacian can be used to draw a graph. This is an attractive application of graph Laplacians. The main thrust of this paper is the method of normalized cuts. I give a detailed account for K = 2 clusters, and also for K > 2 clusters, based on the work of Yu and Shi. Three points that do not appear to have been clearly articulated before are elaborated: 1. The solutions of the main optimization problem should be viewed as tuples in the K-fold cartesian product of projective space RP^{N-1}. 2. When K > 2, the solutions of the relaxed problem should be viewed as elements of the Grassmannian G(K,N). 3. Two possible Riemannian distances are available to compare the closeness of solutions: (a) The distance on (RP^{N-1})^K. (b) The distance on the Grassmannian. I also clarify what should be the necessary and sufficient conditions for a matrix to represent a partition of the vertices of a graph to be clustered.

Keywords

Cite

@article{arxiv.1311.2492,
  title  = {Notes on Elementary Spectral Graph Theory. Applications to Graph Clustering Using Normalized Cuts},
  author = {Jean Gallier},
  journal= {arXiv preprint arXiv:1311.2492},
  year   = {2013}
}

Comments

76 pages

R2 v1 2026-06-22T02:05:03.794Z