论文信息 - Multiscale Manifold Learning

Multiscale Manifold Learning

Many high-dimensional data sets that lie on a low-dimensional manifold exhibit nontrivial regularities at multiple scales. Most work in manifold learning ignores this multiscale structure. In this paper, we propose approaches to explore the deep structure of manifolds. The proposed approaches are based on the diffusion wavelets framework, data driven, and able to directly process directional neighborhood relationships without ad-hoc symmetrization. The proposed multiscale algorithms are evaluated using both synthetic and real-world data sets, and shown to outperform previous manifold learning methods.

Chang Wang | Sridhar Mahadevan | S. Mahadevan | Chang Wang

[1] V. N. Bogaevski,et al. Matrix Perturbation Theory , 1991 .

[2] M. Turk,et al. Eigenfaces for Recognition , 1991, Journal of Cognitive Neuroscience.

[3] S. Mallat. A wavelet tour of signal processing , 1998 .

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

[5] Xiaofei He,et al. Locality Preserving Projections , 2003, NIPS.

[6] Mikhail Belkin,et al. Laplacian Eigenmaps for Dimensionality Reduction and Data Representation , 2003, Neural Computation.

[7] R. Coifman,et al. Diffusion Wavelets , 2004 .

[8] F. Chung. Laplacians and the Cheeger Inequality for Directed Graphs , 2005 .

[9] Gunnar Rätsch,et al. Graph Based Semi-supervised Learning with Sharper Edges , 2006, ECML.

[10] Geoffrey E. Hinton,et al. Reducing the Dimensionality of Data with Neural Networks , 2006, Science.

[11] Yee Whye Teh,et al. A Fast Learning Algorithm for Deep Belief Nets , 2006, Neural Computation.

[12] Arthur D. Szlam,et al. Diffusion wavelet packets , 2006 .

[13] Rajat Raina,et al. Efficient sparse coding algorithms , 2006, NIPS.

[14] Yoshua. Bengio,et al. Learning Deep Architectures for AI , 2007, Found. Trends Mach. Learn..

[15] Stphane Mallat,et al. A Wavelet Tour of Signal Processing, Third Edition: The Sparse Way , 2008 .

[16] U. Feige,et al. Spectral Graph Theory , 2015 .