|
|
|
| Multi-manifold Learning Based on Boundary Detection |
| ZOU Peng, LI Fanzhang, YIN Hongwei, ZHANG Li, ZHANG Zhao |
| School of Computer Science and Technology, Soochow University, Suzhou 215006 |
|
|
|
|
Abstract In manifold learning algorithms, the data are assumed to be aligned on a single manifold. The application of algorithms is limited due to the general distribution of practical datasets on multiple manifolds. In this paper, multi-manifold learning based on boundary detection(MBD) is proposed. By the proposed method, data of distribution on several manifolds are efficiently learned through boundary detection and intra and inter manifolds geodesic distances can be kept faithfully. Firstly the boundary of data manifolds is detected and then the dimensionality of the manifolds is reduced separately. Finally, low dimensional coordinates are relocated into a global coordinate system. The effectiveness of the proposed multi-manifold learning algorithm is demonstrated through experiments on both synthetic and real datasets.
|
|
Received: 15 May 2016
|
| Fund:Supported by National Natural Science Foundation of China (No.61033013,60775045), Soochow Scholar Program of Soochow University (No.14317360) |
About author:: ZOU PengCorresponding author, born in 1993, master student. His research interests include Lie group machine lear-ning and manifold learning.
LI Fanzhang, born in 1964, Ph.D., professor. His research interests include Lie group machine learning and dynamic fuzzy logic.
YIN Hongwei, born in 1990. Ph.D. candidate. His research interests include spectral machine learning.
ZHANG Li, born in 1975, Ph.D., professor. Her research interests include pattern recognition, machine learning and data mining.
ZHANG Zhao, born in 1984, Ph.D., associate professor. His research interests include pattern recognition, machine learning, data mining and computer vision. |
|
|
|
[1] TENENBAUM J B, DE SILVA V, LANGFORD J C. A Global Geometric Framework for Nonlinear Dimensionality Reduction. Science, 2000, 290(5500): 2319-2323.
[2] ROBINSON S L, BENNETT R J. A Typology of Deviant Workplace Behaviors: A Multidimensional Scaling Study. The Academy of Management Journal, 1995, 38(2): 555-572.
[3] ROWEIS S T, SAUL L K. Nonlinear Dimensionality Reduction by Locally Linear Embedding. Science, 2000, 290(5500): 2323-2326.
[4] BELKIN M, NIYOGI P. Laplacian Eigenmaps and Spectral Techniques for Embedding and Clustering // DIETTERICH T G, BECKER S, GHAHRAMANI Z, eds. Advances in Neural Information Processing Systems. Cambridge, USA: MIT Press, 2001: 585-591.
[5] DONOHO D L, GRIMES C. Hessian Eigenmaps: Locally Linear Embedding Techniques for High-Dimensional Data. Proceedings of the National Academy of Sciences of the United States of America, 2003, 100(10): 5591-5596.
[6] ZHANG Z Y, ZHA H Y. Principal Manifolds and Nonlinear Dimensionality Reduction via Tangent Space Alignment. SIAM Journal of Scientific Computing, 2004, 26(1): 313-338.
[7] LI P, WANG M, CHENG J, et al. Spectral Hashing with Semantically Consistent Graph for Image Indexing. IEEE Trans on Multimedia, 2013, 15(1): 141-152.
[8] WANG X, SLAVAKIS K, LERMAN G. Multi-manifold Modeling in Non-euclidean Spaces[C/OL]. [2016-04-07]. http://jmlr.org/proceedings/papers/v38/wang156.pdf.
[9] YANG M H. Extended ISOMAP for Pattern Classification // Proc of the 18th National Conference on Artificial Intelligence. Menlo Park, USA: AAAI Press, 2002: 224-229.
[10] LIAO D P, QIAN Y T, ZHOU J, et al. A Manifold Alignment Approach for Hyperspectral Image Visualization with Natural Color. IEEE Trans on Geoscience and Remote Sensing, 2016, 54(6): 3151-3162.
[11] LIN T, LIU Y, WANG B, et al. Nonlinear Dimensionality Reduction by Local Orthogonality Preserving Alignment. Journal of Computer Science and Technology, 2016, 31(3): 512-524.
[12] 陈省身,陈维桓.微分几何讲义.北京:北京大学出版社, 1999.
(CHEN X S, CHEN W H. Lectures on Differential Geometry. Beijing, China: Peking University Press, 1999.)
[13] LIU Y, LIU Y, CHAN K C C. Dimensionality Reduction for He-terogeneous Dataset in Rushes Editing. Pattern Recognition, 2009, 42(2): 229-242.
[14] LIU Y, LIU Y, CHAN K C C. Nonlinear Dimensionality Reduction with Hybrid Distance for Trajectory Representation of Dynamic Texture. Signal Processing, 2010, 90(8): 2375-2395.
[15] WANG L, SUTER D. Visual Learning and Recognition of Sequential Data Manifolds with Applications to Human Movement Analysis. Computer Vision and Image Understanding, 2008, 110(2): 153-172.
[16] WU Y M, CHAN K L. An Extended ISOMAP Algorithm for Lear-ning Multi-class Manifold // Proc of the International Conference on Machine Learning and Cybernetics. New York, USA: IEEE, 2004, VI: 3429-3433.
[17] YANG L. K-Edge Connected Neighborhood Graph for Geodesic Distance Estimation and Nonlinear Data Projection // Proc of the 17th International Conference on Pattern Recognition. Washington, USA: IEEE, 2004, I: 196-199.
[18] YANG L. Building k Edge-Disjoint Spanning Trees of Minimum Total Length for Isometric Data Embedding. IEEE Trans on Pattern Analysis and Machine Intelligence, 2005, 27(10): 1680-1683.
[19] YANG L. Building k-Edge-Connected Neighborhood Graph for Distance-Based Data Projection. Pattern Recognition Letters, 2005, 26(13): 2015-2021.
[20] YANG L. Building k-Connected Neighborhood Graphs for Isometric Data Embedding. IEEE Trans on Pattern Analysis and Machine Intelligence, 2006, 28(5): 827-831.
[21] MENG D Y, LEUNG Y, FUNG T, et al. Nonlinear Dimensionality Reduction of Data Lying on the Multicluster Manifold. IEEE Trans on Systems, Man, and Cybernetics(Cybernetics), 2008, 38(4): 1111-1122.
[22] ZHU F, YE N, YU W, et al. Boundary Detection and Sample Reduction for One-Class Support Vector Machines. Neurocomputing, 2014, 123: 166-173.
[23] THOUNAOJAM D M, KHELCHANDRA T, SINGH K M, et al. A Genetic Algorithm and Fuzzy Logic Approach for Video Shot Boundary Detection. Computational Intelligence and Neuroscience, 2016. DOI: 10.1155/2016/8469428.
[24] CHEN L C, BARRON J T, PAPANDREOU G, et al. Semantic Image Segmentation with Task-Specific Edge Detection Using CNNs and a Discriminatively Trained Domain Transform[J/OL]. [2016-04-07]. arxiv.org/pdf/1511.03328v1.pdf.
[25] QIU B Z, CAO X F. Clustering Boundary Detection for High Dimensional Space Based on Space Inversion and Hopkins Statistics. Knowledge-Based Systems, 2016, 98: 216-225.
[26] FAN M Y, QIAO H, ZHANG B, et al. Isometric Multi-manifold Learning for Feature Extraction // Proc of the 12th IEEE International Conference on Data Mining. Washington, USA: IEEE, 2012: 241-250
[27] 陈维桓.微分流形初步.北京:高等教育出版社, 2001.
(CHEN W H. An Introduction to Differentiable Manifold. Beijing,China: Higher Education Press, 2001.)
[28] WANG Y, CHEN C K, GU Y, et al. Mirror Image-Based Robust Minimum Squared Error Algorithm for Face Recognition // Proc of the Chinese Intelligent Systems Conference. Berlin, Germany: Springer, 2015, II: 105-112.
[29] CHUNG A G, SHAFIEE M J, WONG A. Random Feature Maps via a Layered Random Projection(LaRP) Framework for Object Classification[J/OL]. [2016-04-07].arxiv.org/pdf/1602.01818.pdf.
[30] BISWAS B K, ALAM M S, CHOWDHURY S. Efficient Face Re-cognition Using Local Derivative Pattern and Shifted Phase-Encoded Fringe-Adjusted Joint Transform Correlation. Proc of SPIE, 2016, 9845. DOI: 10.1117/12.2222499.
[31] LU M, ZHAO X J, ZHANG L, et al. Semi-supervised Concept Factorization for Document Clustering. Information Sciences: An International Journal, 2016, 331(C): 86-98. |
|
|
|
2016, Vol. 29 
