[1] | Z.Zhang and N.Saito, Ring-like structures of frequency domains of wavelets, Appl. Comput. Harmon. Anal., accepted, 2009. |
[2] | Z.Zhang, A New Method of Constructions of Non-tensor Product Wavelets, Acta Appl.Math., published online, 2009 |
[3] | N. Saito and Z. Zhang, On an Efficient Sparse Representation of Objects of General Shape via continuous extension and wavelet approximation, Int. J. Wavelets, Multiresolut. Inf. Process., accepted, 2009. |
[4] | Z. Zhang, Convergence of Periodic Wavelet Frame Series and Gibbs Phenomenon. Rocky Mountain J. Math., 39:4, 2009 |
[5] | Z. Zhang, Local Analysis, Cardinality, and Split Trick of Quasi-biorthogonal Frame Wavelets, Acta Math. Sin., accepted, 2009. |
[6] | Z. Zhang and N. Saito, Constructions of Periodic Wavelet Frames Using Extension Principles, Appl. Comput. Harmon. Anal., 27:1, 2009. |
[7] | Z. Zhang, Supports of Fourier Transforms of Scaling Functions, Appl. Comput. Harmon. Anal., 22:2, 2007. Remark. ScienceDirect indicated that this paper ranked first in the top 25 hottest articles of Appl. Comput. Harmon. Anal. in Jan.-Mar. 2007 |
[8] | Z. Zhang, Measures, Densities and Diameters of Frequency Bands of Scaling Functions and Wavelets. J. Approx. Theory, 148:2, 2007. |
[9] | Z. Zhang, Continuity of Fourier Transforms of Band-limited Wavelets, J. Comput. Anal. Appl., 9:4, 2007. |
[10] | Z. Zhang, A Pair of Quasi-biorthogonal Frame Wavelets, Acta. Math. Sin. (A), 51:1, 2008. |
[11] | Z. Zhang and N. Saito, An Approximation Formula in Hilbert Space, in Recent Advances in Computational Sciences, P. Jorgensen, X. Shen, C-W Shu, and N. Yan, ed., World Scientific, 218-228, Aug. 2008. |
[12] | Z. Zhang and N. Saito, High Dimensional Data Compression via PHLCT, in Wavelets XII, D. Van De Ville, V. K. Goyal, and M. Papadakis, eds., Proc. SPIE 6701, 2007. |
[13] | Z. Zhang, Convergence of Weyl-Heisenberg Frame Series, Indian J. Pure Appl. Math, 39:2, 2008. |
[14] | Z. Zhang, Pointwise Convergence and Uniform Convergence of Wavelet Frame Series, Acta. Math. Sin., (Engl. Ser.), 22:3, 2006. |
[15] | Z. Zhang, A Characterization of Generalized Frame MRAs Deriving Orthonormal Wavelets, Acta. Math. Sin. (Engl. Ser.), 22:4, 2006. |
[16] | Z. Zhang, Periodic Wavelet Frames, Adv. Comput. Math. 22:2, 2005. |
[17] | Z. Zhang, L. Mu, and P. Zhang, Construction of p-band Frame Wavelet Consisting of the Fewest Functions, Indian J. Pure Appl. Math. 36:5, 2005. |
[18] | Z. Zhang, Characterization of Compact Support of Fourier Transform for Orthonormal Wavelet, Acta. Math. Sin. (Engl. Ser.) 21:4, 2005. |
[19] | L. Mu, Z. Zhang, and P. Zhang, On the Higher-dimensional Wavelet Frames, Appl. Comput. Harmon. Anal, 16:1, 2004. Remark. ScienceDirect indicated that this paper ranked second in the top 26 hottest articles of Appl. Comput. Harmon. Anal. in Jan.-Aug. 2004 |
[20] | Z. Zhang, L. Mu, and P. Zhang, An Improvement of Papadakis' Theorem, Progr. Natur. Sci., 14:5, 2004. |
[21] | Z. Zhang, Generalized Dyadic Wavelet and Signal Processing, Math. Econ, 21:2, 2004. |
[22] | L. Mu, Z. Zhang, and P. Zhang, An Extension of Papadakis' Theorem, Mu'tah J., 19:3, 2004. |
[23] | Z. Zhang, Wavelet Analysis in Sobolev Space of Periodic Distributions, Approx. Theory Appl., 18:3, 2002. |
[24] | Z. Zhang, On a New Kind of Inversion Formula for the Wavelet Transform, J. Math. Study, 35:3, 2002. |
[25] | Z. Zhang, Parseval-type Equality of Dyadic Wavelet and its Extension, Guangxi Sci., 9:1, 2002. |
[26] | Z. Zhang, A Reconstruction Formula Based on a New Kind of Half-discrete Wavelet Transform, Math. Econ, 18:1, 2001. |
[27] | Z. Zhang, Generalization of Meyer Wavelet, Guangxi Sci., 7:4, 2000. |
[28] | Z. Zhang, Generalized Periodic Wavelet and Half-discrete Wavelet Transform, Distinguished B.S.Thesis Award of Shandong Province, 2002. |