Classification by Cheeger Constant Regularization

This paper develops a classification algorithm in the framework of spectral graph theory where the underlying manifold of a high dimensional data set is described by a graph. The classification on the data is performed on the graph. The classifier optimizes an objective functional that combines prior information with the Cheeger constant. We interpret this approach as a regularized version of the Cheeger constant based classifier that we introduced recently. Our derivation shows that Cheeger regularization removes noise like a Laplacian based classifier but preserves better sharp boundaries needed for class separation. Experimental results show good performance of our proposed approach for classification applications.

[1]  José M. F. Moura,et al.  Automatic Detection of Regional Heart Rejection in USPIO-Enhanced MRI , 2008, IEEE Transactions on Medical Imaging.

[2]  L. Rosasco,et al.  Manifold Regularization , 2007 .

[3]  Fan Chung,et al.  Spectral Graph Theory , 1996 .

[4]  Mikhail Belkin,et al.  Semi-Supervised Learning on Riemannian Manifolds , 2004, Machine Learning.

[5]  S T Roweis,et al.  Nonlinear dimensionality reduction by locally linear embedding. , 2000, Science.

[6]  Leo Grady,et al.  Isoperimetric graph partitioning for image segmentation , 2006, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[7]  Hsun-Hsien Chang,et al.  Immune Cells Detection of the In Vivo Rejecting Heart in USPIO-Enhanced Magnetic Resonance Imaging , 2006, 2006 International Conference of the IEEE Engineering in Medicine and Biology Society.