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The Lifting Scheme Based on the Second Generation Wavelets 被引量:1
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作者 FENG Hui GUO Lanying XIAO Jinsheng 《Wuhan University Journal of Natural Sciences》 CAS 2006年第3期503-506,共4页
The lifting scheme is a custom design construclion of Biorthogonal wavelets, a fast and efficient method to realize wavelet transform,which provides a wider range of application and efficiently reduces the computing t... The lifting scheme is a custom design construclion of Biorthogonal wavelets, a fast and efficient method to realize wavelet transform,which provides a wider range of application and efficiently reduces the computing time with its particular frame. This paper aims at introducing the second generation wavelets, begins with traditional Mallat algorithms, illustrates the lifting scheme and brings out the detail steps in the construction of Biorthogonal wavelets. Because of isolating the degrees of freedom remaining the biorthogonality relations, we can fully control over the lifting operators to design the wavelet for a particular application, such as increasing the number of the vanishing moments. 展开更多
关键词 lifting scheme the second generation wavelets vanishing moments
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Construction of nonseparable orthonormal compactly supported wavelet bases for L^2(R^d)
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作者 YANG Shou-zhi LIN Jun-hong 《Applied Mathematics(A Journal of Chinese Universities)》 SCIE CSCD 2012年第2期205-224,共20页
Suppose M and N are two r×r and s×s dilation matrices,respectively.LetΓM andΓN represent the complete sets of representatives of distinct cosets of the quotient groups M-T Zr/Zr and N-T Zs/Zs,respectively.... Suppose M and N are two r×r and s×s dilation matrices,respectively.LetΓM andΓN represent the complete sets of representatives of distinct cosets of the quotient groups M-T Zr/Zr and N-T Zs/Zs,respectively.Two methods for constructing nonseparable Ω-filter banks from M-filter banks and N-filter banks are presented,where Ω is a(r+s) ×(r+s) dilation matrix such that one of its complete sets of representatives of distinct cosets of the quotient groups Ω-T Zr+s/Zr+s areΓΩ={[γT h,ζ T q] T:γh∈ΓM,ζq∈ΓN}.Specially,Ω can be [MΘ0N],whereΘis a r×s integer matrix with M-1Θbeing also an integer matrix.Moreover,if the constructed filter bank satisfies Lawton's condition,which can be easy to verify,then it generates an orthonormal nonseparable Ω-wavelet basis for L2(Rr+s).Properties,including Lawton's condition,vanishing moments and regularity of the new Ω-filter banks or new Ω-wavelet basis are discussed then.Finally,a class of nonseparable Ω-wavelet basis for L2(Rr+1) are constructed and three other examples are given to illustrate the results.In particular,when M=N=2,all results obtained in this paper appeared in[1]. 展开更多
关键词 filter bank nonseparable orthonormal wavelet basis Lawton's condition vanishing moment regularity.
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Asymptotic Behavior of Gibbs Functions for M-Band Wavelet Expansions 被引量:3
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作者 Daren Huang Zeyin Zhang, Center for Mathematical Sciences, Zhejiang University, Hangzhou 310027, P. R. China 《Acta Mathematica Sinica,English Series》 SCIE CSCD 1999年第2期165-172,共8页
In this paper the asymptotic behavior of Gibbs function for a class of M-band wavelet expansions is given. In particular, the Daubechies’ wavelets are included in this class.
关键词 Gibbs phenomenon Wavelet expansion FILTER Scaling function vanishing moment
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The molecular characterization of weighted Hardy spaces 被引量:3
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作者 李兴民 彭立中 《Science China Mathematics》 SCIE 2001年第2期201-211,共11页
The molecular characterization of the weighted atomic Hardy space Hw p,q,s is given. As an application, the boundedness of Hilbert transform on the weighted Hardy space is proved.
关键词 Hw p q s space higher vanishing moment MOLECULE Muckenhoupt weight
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Double Hilbert transform on D(R2) 被引量:1
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作者 Xiaona CUI Rui WANG Dunyan YAN 《Frontiers of Mathematics in China》 SCIE CSCD 2013年第4期783-799,共17页
We introduce a space DHH =D(R2) H2H1D(R2), where D(R2) is the testing function space whose functions are infinitely differentiable and have bounded support, and H2H1D(R2) is the space the double Hilbert tra... We introduce a space DHH =D(R2) H2H1D(R2), where D(R2) is the testing function space whose functions are infinitely differentiable and have bounded support, and H2H1D(R2) is the space the double Hilbert transform acting on the testing function space. We prove that the double Hilbert transform is a homeomorphism from DHH onto itself. 展开更多
关键词 Double Hilbert transform vanishing moments HOMEOMORPHISM
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Design of smooth orthogonal wavelets with beautiful structure from 2-band to 4-band 被引量:1
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作者 PENG Lizhong CHU Xiaoyong 《Science in China(Series F)》 2006年第1期128-136,共9页
A complete algorithm to design 4-band orthogonal wavelets with beautiful structure from 2-band orthogonal wavelets is presented. For more smoothness, the conception of transfer vanishing moment is introduced by transp... A complete algorithm to design 4-band orthogonal wavelets with beautiful structure from 2-band orthogonal wavelets is presented. For more smoothness, the conception of transfer vanishing moment is introduced by transplanting the requirements of vanishing moment from the 4-band wavelets to the 2-band ones. Consequently, the design of 4-band orthogonal wavelets with P vanishing moments and beautiful structure from 2-band ones with P transfer vanishing moments is completed. 展开更多
关键词 transfer vanishing moment 4-band wavelet system beautiful structure.
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Multivariate quasi-tight framelets with high balancing orders derived from any compactly supported refinable vector functions
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作者 Bin Han Ran Lu 《Science China Mathematics》 SCIE CSCD 2022年第1期81-110,共30页
Generalizing wavelets by adding desired redundancy and flexibility,framelets(i.e.,wavelet frames)are of interest and importance in many applications such as image processing and numerical algorithms.Several key proper... Generalizing wavelets by adding desired redundancy and flexibility,framelets(i.e.,wavelet frames)are of interest and importance in many applications such as image processing and numerical algorithms.Several key properties of framelets are high vanishing moments for sparse multiscale representation,fast framelet transforms for numerical efficiency,and redundancy for robustness.However,it is a challenging problem to study and construct multivariate nonseparable framelets,mainly due to their intrinsic connections to factorization and syzygy modules of multivariate polynomial matrices.Moreover,all the known multivariate tight framelets derived from spline refinable scalar functions have only one vanishing moment,and framelets derived from refinable vector functions are barely studied yet in the literature.In this paper,we circumvent the above difficulties through the approach of quasi-tight framelets,which behave almost identically to tight framelets.Employing the popular oblique extension principle(OEP),from an arbitrary compactly supported M-refinable vector functionφwith multiplicity greater than one,we prove that we can always derive fromφa compactly supported multivariate quasi-tight framelet such that:(i)all the framelet generators have the highest possible order of vanishing moments;(ii)its associated fast framelet transform has the highest balancing order and is compact.For a refinable scalar functionφ(i.e.,its multiplicity is one),the above item(ii)often cannot be achieved intrinsically but we show that we can always construct a compactly supported OEP-based multivariate quasi-tight framelet derived fromφsatisfying item(i).We point out that constructing OEP-based quasi-tight framelets is closely related to the generalized spectral factorization of Hermitian trigonometric polynomial matrices.Our proof is critically built on a newly developed result on the normal form of a matrix-valued filter,which is of interest and importance in itself for greatly facilitating the study of refinable vector functions and multiwavelets/multiframelets.This paper provides a comprehensive investigation on OEP-based multivariate quasi-tight multiframelets and their associated framelet transforms with high balancing orders.This deepens our theoretical understanding of multivariate quasi-tight multiframelets and their associated fast multiframelet transforms. 展开更多
关键词 quasi-tight multiframelet oblique extension principle refinable vector function vanishing moment balancing order compact framelet transform normal form of filters generalized matrix factorization
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Conjugate Symmetric Complex Tight Wavelet Frames with Two Generators
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作者 Yanmei Xue Ning Bi Yuan Zhang 《Numerical Mathematics(Theory,Methods and Applications)》 SCIE 2013年第2期353-363,共11页
Two algorithms for constructing a class of compactly supported conjugate symmetric complex tight wavelet framesψ={ψ1,ψ2}are derived.Firstly,a necessary and sufficient condition for constructing the conjugate symmet... Two algorithms for constructing a class of compactly supported conjugate symmetric complex tight wavelet framesψ={ψ1,ψ2}are derived.Firstly,a necessary and sufficient condition for constructing the conjugate symmetric complex tight wavelet frames is established.Secondly,based on a given conjugate symmetric low pass filter,a description of a family of complex wavelet frame solutions is provided when the low pass filter is of even length.When one wavelet is conjugate symmetric and the other is conjugate antisymmetric,the two wavelet filters can be obtained by matching the roots of associated polynomials.Finally,two examples are given to illustrate how to use our method to construct conjugate symmetric complex tight wavelet frames which have some vanishing moments. 展开更多
关键词 Complex tight wavelet frame conjugate symmetry vanishing moments
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