This paper presents an algebraic approach to construct M-band orthogonal wavelet bases. A system of constraint equations is obtained for M-band orthonormal filters, and then a solution based on SVD (Singular Value Decomposition) is developed to enable us to produce innumerable wavelet bases of given length. Also the property of 2 vanishing moments is integrated into our wavelet construction process, which provides another way to compute 2-regular M-band filter banks.EI
Wavelet transforms provide a new technique for time-scale analysis of non-stationary signals. Wavele...
This paper describes a simple procedure, based on spectral factor-ization, for the design of a pair ...
A complete algorithm to design 4-band orthogonal wavelets with beautiful structure from 2-band ortho...
This paper presents an algebraic approach to construct M-band orthonormal wavelet bases with perfect...
Journal PaperThis paper constructs K-regular M-band orthonormal wavelet bases. K-regularity of the w...
While bandlimited wavelets and associated IIR filters have shown serious potential in areas of patte...
International audienceRecently, there has been a growing interest for wavelet frames corresponding t...
A two stage algorithm is presented in this paper to design optimal M-band orthonormal wavelets of co...
AbstractThis article introduces families of nonadaptive directional wavelets. Unlike curvelets and c...
This paper presents a matrix factorization method for implementing orthonormal M-band wavelet revers...
International audienceWe propose a 2D generalization to the M-band case of the dualtree structure (i...
Several forms of parametric expressions for orthogonal multifilter banks are presented. The explicit...
In this paper, a matrix factorization method is presented for reversible integer M-band wavelet tran...
In this paper, a matrix factorization method is presented for reversible integer M-band wavelet tran...
10.1117/12.408624Proceedings of SPIE - The International Society for Optical Engineering4119384-394P...
Wavelet transforms provide a new technique for time-scale analysis of non-stationary signals. Wavele...
This paper describes a simple procedure, based on spectral factor-ization, for the design of a pair ...
A complete algorithm to design 4-band orthogonal wavelets with beautiful structure from 2-band ortho...
This paper presents an algebraic approach to construct M-band orthonormal wavelet bases with perfect...
Journal PaperThis paper constructs K-regular M-band orthonormal wavelet bases. K-regularity of the w...
While bandlimited wavelets and associated IIR filters have shown serious potential in areas of patte...
International audienceRecently, there has been a growing interest for wavelet frames corresponding t...
A two stage algorithm is presented in this paper to design optimal M-band orthonormal wavelets of co...
AbstractThis article introduces families of nonadaptive directional wavelets. Unlike curvelets and c...
This paper presents a matrix factorization method for implementing orthonormal M-band wavelet revers...
International audienceWe propose a 2D generalization to the M-band case of the dualtree structure (i...
Several forms of parametric expressions for orthogonal multifilter banks are presented. The explicit...
In this paper, a matrix factorization method is presented for reversible integer M-band wavelet tran...
In this paper, a matrix factorization method is presented for reversible integer M-band wavelet tran...
10.1117/12.408624Proceedings of SPIE - The International Society for Optical Engineering4119384-394P...
Wavelet transforms provide a new technique for time-scale analysis of non-stationary signals. Wavele...
This paper describes a simple procedure, based on spectral factor-ization, for the design of a pair ...
A complete algorithm to design 4-band orthogonal wavelets with beautiful structure from 2-band ortho...