TY - GEN
T1 - Data clustering by laplacian regularized l1 -graph
AU - Yang, Yingzhen
AU - Wang, Zhangyang
AU - Yang, Jianchao
AU - Wang, Jiangping
AU - Chang, Shiyu
AU - Huang, Thomas S.
N1 - Publisher Copyright:
Copyright © 2014, Association for the Advancement of Artificial Intelligence (www.aaai.org). All rights reserved.
PY - 2014
Y1 - 2014
N2 - £l -Graph has been proven to be effective in data clustering, which partitions the data space by using the sparse representation of the data as the similarity measure. However, the sparse representation is performed for each datum separately without taking into account the geometric structure of the data. Motivated by il-Graph and manifold leaning, we propose Laplacian Regularized -Graph (LRf1-Graph) for data clustering. The sparse representations of LR^1-Graph are regularized by the geometric information of the data so that they vary smoothly along the geodesies of the data manifold by the graph Laplacian according to the manifold assumption. Moreover, we propose an iterative regularization scheme, where the sparse representation obtained from the previous iteration is used to build the graph Laplacian for the current iteration of regularization. The experimental results on real data sets demonstrate the superiority of our algorithm compared to £l-Graph and other competing clustering methods.
AB - £l -Graph has been proven to be effective in data clustering, which partitions the data space by using the sparse representation of the data as the similarity measure. However, the sparse representation is performed for each datum separately without taking into account the geometric structure of the data. Motivated by il-Graph and manifold leaning, we propose Laplacian Regularized -Graph (LRf1-Graph) for data clustering. The sparse representations of LR^1-Graph are regularized by the geometric information of the data so that they vary smoothly along the geodesies of the data manifold by the graph Laplacian according to the manifold assumption. Moreover, we propose an iterative regularization scheme, where the sparse representation obtained from the previous iteration is used to build the graph Laplacian for the current iteration of regularization. The experimental results on real data sets demonstrate the superiority of our algorithm compared to £l-Graph and other competing clustering methods.
UR - http://www.scopus.com/inward/record.url?scp=84908204128&partnerID=8YFLogxK
UR - http://www.scopus.com/inward/citedby.url?scp=84908204128&partnerID=8YFLogxK
M3 - Conference contribution
AN - SCOPUS:84908204128
T3 - Proceedings of the National Conference on Artificial Intelligence
SP - 3148
EP - 3149
BT - Proceedings of the National Conference on Artificial Intelligence
PB - AI Access Foundation
T2 - 28th AAAI Conference on Artificial Intelligence, AAAI 2014, 26th Innovative Applications of Artificial Intelligence Conference, IAAI 2014 and the 5th Symposium on Educational Advances in Artificial Intelligence, EAAI 2014
Y2 - 27 July 2014 through 31 July 2014
ER -