Tony F-c Chan
Affiliations: | Mathematics | University of California, Los Angeles, Los Angeles, CA |
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"Tony Chan"Children
Sign in to add trainee| Hao-Min Zhou | grad student | 2000 | UCLA |
| Jamylle L. Carter | grad student | 2001 | UCLA |
| David A. Huckaby | grad student | 2002 | UCLA |
| Berta Y. Sandberg | grad student | 2002 | UCLA |
| Mark C. Moelich | grad student | 2004 | UCLA |
| Andy M. Yip | grad student | 2005 | UCLA |
| Nang K. Sze | grad student | 2006 | UCLA |
| Tin M. Lee | grad student | 2008 | UCLA |
| Lok M. Lui | grad student | 2008 | UCLA |
| Kang-Yu Ni | grad student | 2008 | UCLA |
| Mingqiang Zhu | grad student | 2008 | UCLA |
| John E. Esser | grad student | 2010 | UCLA |
| Rongjie Lai | grad student | 2010 | UCLA |
| Tsz W. Wong | grad student | 2011 | UCLA |
| Eric M. Radke | grad student | 2015 | UCLA |
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Publications
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| Liu H, Yao Z, Leung S, et al. (2017) A Level Set Based Variational Principal Flow Method for Nonparametric Dimension Reduction on Riemannian Manifolds Siam Journal On Scientific Computing. 39: A1616-A1646 |
| Wei K, Cai J, Chan TF, et al. (2016) Guarantees of Riemannian Optimization for Low Rank Matrix Recovery Siam Journal On Matrix Analysis and Applications. 37: 1198-1222 |
| Sai-Kit Yeung, Tai-Pang Wu, Chi-Keung Tang, et al. (2015) Normal Estimation of a Transparent Object Using a Video. Ieee Transactions On Pattern Analysis and Machine Intelligence. 37: 890-7 |
| Chan R, Chan TF, Yip A. (2015) Numericalmethods and applications in total variation image restoration Handbook of Mathematical Methods in Imaging: Volume 1, Second Edition. 1501-1537 |
| Bresson X, Tai XC, Chan TF, et al. (2014) Multi-class transductive learning based on ℓ1 Relaxations of Cheeger Cut and Mumford-Shah-Potts Model Journal of Mathematical Imaging and Vision. 49: 191-201 |
| Zhu W, Tai X, Chan TF. (2013) Augmented Lagrangian method for a mean curvature based image denoising model Inverse Problems and Imaging. 7: 1409-1432 |
| Zhang R, Bresson X, Chan TF, et al. (2013) Four color theorem and convex relaxation for image segmentation with any number of regions Inverse Problems and Imaging. 7: 1099-1113 |
| Lai R, Tai XC, Chan TF. (2013) A ridge and corner preserving model for surface restoration Siam Journal On Scientific Computing. 35: A675-A695 |
| Zhu W, Tai X, Chan T. (2013) Image Segmentation Using Euler’s Elastica as the Regularization Journal of Scientific Computing. 57: 414-438 |
| Wang Y, Shi J, Yin X, et al. (2012) Brain surface conformal parameterization with the Ricci flow. Ieee Transactions On Medical Imaging. 31: 251-64 |