DocumentCode
2084030
Title
Graph Partitioning by Spectral Rounding: Applications in Image Segmentation and Clustering
Author
Tolliver, David A. ; Miller, Gary L.
Author_Institution
Carnegie Mellon University, PA
Volume
1
fYear
2006
fDate
17-22 June 2006
Firstpage
1053
Lastpage
1060
Abstract
We introduce a family of spectral partitioning methods. Edge separators of a graph are produced by iteratively reweighting the edges until the graph disconnects into the prescribed number of components. At each iteration a small number of eigenvectors with small eigenvalue are computed and used to determine the reweighting. In this way spectral rounding directly produces discrete solutions where as current spectral algorithms must map the continuous eigenvectors to discrete solutions by employing a heuristic geometric separator (e.g. k-means). We show that spectral rounding compares favorably to current spectral approximations on the Normalized Cut criterion (NCut). Results are given for natural image segmentation, medical image segmentation, and clustering. A practical version is shown to converge.
Keywords
Application software; Clustering algorithms; Computer science; Eigenvalues and eigenfunctions; Image segmentation; Iterative algorithms; Particle separators; Partitioning algorithms; Pattern recognition; Robots;
fLanguage
English
Publisher
ieee
Conference_Titel
Computer Vision and Pattern Recognition, 2006 IEEE Computer Society Conference on
ISSN
1063-6919
Print_ISBN
0-7695-2597-0
Type
conf
DOI
10.1109/CVPR.2006.129
Filename
1640867
Link To Document