PhD – University of Alberta, Canada

Office: | Y6510 Academic 1 |
---|---|

Phone: | +852 3442-5942 |

Fax: | +852 3442-0250 |

Email: | xzhuang7@cityu.edu.hk |

Web: | Personal Homepage |

- Applied and Computational Harmonic Analysis
- Sparse Approximation and Directional Multiscale Representation Systems
- Compressed Sensing
- Image/Signal Processing
- Machine Learning and Pattern Recognition

Dr Xiaosheng Zhuang received his bachelor's degree and master's degree in mathematics from Sun Yat-Sen (Zhongshan) University, China, in 2003 and 2005, respectively. He received his PhD in applied mathematics from University of Alberta, Canada, in 2010. He was a Postdoctoral Fellow at Universität Osnabrück in 2011 and Technische Universität Berlin in 2012. His research interest includes directional multiscale representation systems, image/signal processing, and compressed sensing.

- Han, B. and
**Zhuang, X.**(2013) Algorithms for matrix extension and orthogonal wavelet filter banks over algebraic number fields.*Mathematics of Computation.*82 (281): 459-490. - King, E. J., Kutyniok, G., and
**Zhuang, X.**(2012) Analysis of inpainting via clustered sparsity and microlocal analysis,*Journal of Mathematical Imaging and Vision,*DOI: 10.1007/s10851-013-0422-y. - Specktor, S. and
**Zhuang, X.**(2012) Asymptotic Bernstein type inequalities and estimation of wavelet coefficients.*Methods and Applications of Analysis.*19 (3): 289-312. - Kutyniok, G., Shaharm, M., and
**Zhuang, X.**(2012) ShearLab: A rational design of a digital parabolic scaling algorithm.*SIAM Journal on Imaging Sciences.*5 (4):1291-1332. - Mo, Q. and
**Zhuang, X.**(2012) Matrix splitting with symmetry and dyadic framelet filter banks over algebraic number fields,*Linear Algebra and its Applications.*437(10): 2650-2679. **Zhuang, X.**(2012) Matrix extension with symmetry and construction of biorthogonal multiwavelets with any integer dilation.*Applied and Computational Harmonic Analysis.*33(2): 159-181.- Chui, C. K., Han, B. and
**Zhuang, X.**(2012) A dual-chain approach for bottom-up construction of wavelet filters with any dilation.*Applied Computational Harmonic Analysis.*33(2): 204-225. - Han, B. and
**Zhuang, X.**(2011) Algorithms for matrix extension and orthogonal wavelet filter banks over algebraic number fields.*Mathematics of Computation.*Accepted on Sep. 11, 2011, 31 pages. - Han, B. and
**Zhuang, X.**(2010) Matrix extension with symmetry and its applications to symmetric orthonormal multiwavelets.*SIAM Journal on Mathematical Analysis.*42(5): 2297-2317. - Han, B. and
**Zhuang, X.**(2009) Analysis and construction of Multivariate interpolating refinable function vectors.*Acta Applicandae Mathematicae.*107:143-171. - Han, B., Kwon, S. G. and
**Zhuang, X.**(2009) Generalized interpolating refinable function vectors.*Journal of Computational and Applied Mathematics.*227:254-270. **Zhuang X.**and Dai, D. Q. (2007) Improved discriminate analysis for high dimensional data and its application to face recognition.*Pattern Recognition.*40: 1570-1578.**Zhuang X.**, Dai, D. Q. and Yuen, P. C. (2005) Face recognition by inverse Fisher discriminant features.*Lecture notes in Computer Science.*3832:92-98.**Zhuang X.**and Dai, D. Q. (2005) Inverse Fisher discriminate criteria for small sample size problem and its application to face recognition.*Pattern Recognition.*38: 2129-2194.