General Solutions of Matrix Extension Associated with Multiple Channel Biorthogonal Wavelet Filters

This paper is concerned with seeking the general solutions of matrix equation M（ξ）M＊ （ξ） = Is for the construction of multiple channel biorthogonal wavelets, provided that some special solution of its is known.

Biorthogonal multiple wavelets generated by vector refinement equation

Biorthogonal multiple wavelets are generated from refinable function vectors by using the multiresolution analysis. In this paper we provide a general method for the construction of compactly supported biorthogonal multiple wavelets by refinable function vectors which are the solutions of vector refinement equations of the form $$\varphi (x) = \sum\limits_{\alpha \in \mathbb{Z}^s } {a(\alpha )\varphi (Mx - \alpha ), x \in \mathbb{R}^s } ,$$ where the vector of functions ? = (? 1, …, ? r)T is in $(L_2 (\mathbb{R}^s ))^r ,a = :(a(\alpha ))_{\alpha \in \mathbb{Z}^s } $ is a finitely supported sequence of r × r matrices called the refinement mask, and M is an s × s integer matrix such that lim n→∞ M ?n = 0. Our characterizations are in the general setting and the main results of this paper are the real extensions of some known results.

Riesz multiwavelet bases generated by vector refinement equation

In this paper, we investigate compactly supported Riesz multiwavelet sequences and Riesz multiwavelet bases for L 2(? s ). Suppose ψ = (ψ1,..., ψ r ) T and $ \tilde \psi = (\tilde \psi ^1 ,...,\tilde \psi ^r )^T $ are two compactly supported vectors of functions in the Sobolev space (H μ(? s )) r for some μ > 0. We provide a characterization for the sequences {ψ jk l : l = 1,...,r, j ε ?, k ε ? s } and $ \tilde \psi _{jk}^\ell :\ell = 1,...,r,j \in \mathbb{Z},k \in \mathbb{Z}^s $ to form two Riesz sequences for L 2(? s ), where ψ jk l = m j/2ψ l (M j ·?k) and $ \tilde \psi _{jk}^\ell = m^{{j \mathord{\left/ {\vphantom {j 2}} \right. \kern-0em} 2}} \tilde \psi ^\ell (M^j \cdot - k) $ , M is an s × s integer matrix such that lim n→∞ M ?n = 0 and m = |detM|. Furthermore, let ? = (?1,...,? r ) T and $ \tilde \phi = (\tilde \phi ^1 ,...,\tilde \phi ^r )^T $ be a pair of compactly supported biorthogonal refinable vectors of functions associated with the refinement masks a, $ \tilde a $ and M, where a and $ \tilde a $ are finitely supported sequences of r × r matrices. We obtain a general principle for characterizing vectors of functions ψν = (ψν1,...,ψνr ) T and $ \tilde \psi ^\nu = (\tilde \psi ^{\nu 1} ,...,\tilde \psi ^{\nu r} )^T $ , ν = 1,..., m ? 1 such that two sequences {ψ jk νl : ν = 1,..., m ? 1, l = 1,...,r, j ε ?, k ε ? s } and { $ \tilde \psi _{jk}^\nu $ : ν=1,...,m?1,?=1,...,r, j ∈ ?, k ∈ ? s } form two Riesz multiwavelet bases for L 2(? s ). The bracket product [f, g] of two vectors of functions f, g in (L 2(? s )) r is an indispensable tool for our characterization.

Orthogonal Matrix-Valued Wavelet Packets

In this paper, we introduce matrix-valued multiresolution analysis and matrix- valued wavelet packets. A procedure for the construction of the orthogonal matrix-valued wavelet packets is presented. The properties of the matrix-valued wavelet packets are investigated. In particular, a new orthonormal basis of L2(R, Cs×s) is obtained from the matrix-valued wavelet packets.

Matrix Approach in Wavelet Analysis

In this paper, we give a survey of matrix approach in wavelet theory , and describe some related results which were obtained by ourselves.

高维多重双正交小波包

本文给出对应于高维多重尺度函数的双正交多小波包的定义及其构造方法.讨论了高维不可分双正交多小波包的双正交性.

向量值正交小波包

引进对应于2尺度向量值尺度函数的多分辨分析和向量值小波的概念.给出向量值小波包的定义及其构造算法,研究了向量值正交小波包的正交性,并讨论了空间L2(R,CN)的正交分解.

多元双正交小波包的构造及性质

给出具任意整数矩阵伸缩的多元不可分双正交小波包的定义及其构造算法。运用代数学理论,积分变换与算子理论,讨论了多元不可分双正交小波包的性质。得到L2(Rn)的小波包基的直和分解。

α尺度的二维四向小波问题

以双向小波理论为基础,通过使用张量积的方法构造尺度为α的二维四向小波,并给出了二维小波的多分辨分析及二维小波的正交条件和双正交条件,得到了二维四向小波包及其相关性质.

多重向量值双正交小波的存在性及构造

研究多重向量值双正交小波的存在性及构造问题.在给定一对多重向量值双正交尺度函数的情形下,运用向量细分格和矩阵理论,证明与之对应的一对多重向量值双正交小波的存在性.给出一类紧支撑多重向量值双正交小波的构造算法.

一类向量值正交小波的构造算法

引进向量值多分辨分析与向量值正交小波的概念。运用矩阵理论与仿酉向量滤波器理论,给出了向量值正交小波存在的充要条件。提供了一类紧支撑向量值正交小波的构造算法。

3尺度紧支撑双正交多小波及小波包的构造和算法

研究了3尺度紧支撑双正交多小波及小波包的构造与算法,给出了双正交多小波的多分辨分析理论.若r重尺度函数的支撑区间较大,则可将其转化成3r重短支撑的情形,再利用矩阵理论,对两尺度符号进行矩阵化,通过对矩阵进行正交扩充,得到关于两尺度符号的方程组,求解方程组便得到双正交3尺度多小波的两尺度矩阵序列.该方法适用于任意紧支撑双正交3尺度多小波的构造.利用多分辨分析和矩阵理论,通过将2r维向量函数分组截断为两个r维向量,构造3尺度r重双正交小波包,得出其系数矩阵应满足的方程组,并给出相应的分解关系.研究了3尺度r重双正交小波包的双正交性质,这为构造空间L2(R)的小波基奠定了基础.

一类多尺度矩阵小波函数的存在性及构建算法

讨论多尺度矩阵小波函数的存在性.运用向量细分格式和矩阵理论,证明一对给定的多尺度双正交矩阵尺度函数决定对应的多尺度双正交矩阵小波函数的存在性.给出一类紧支撑双正交矩阵小波的构建算法.

一类紧支撑正交双向矩阵值小波的构造

文章引入了双向矩阵值多尺度分辨分析和正交矩阵值小波,得到了双向矩阵值小波存在性的充要条件,给出了双向矩阵值小波的构造算法。

与多通道正交小波滤波器相关的矩阵扩充的通解(英文)

本文研究了一类与多通道正交小波滤波器相关的矩阵方程。运用多相位分解的方法,获得了这类矩阵方程的通解。借助于该结果,可以从一组多通道正交小波能够产生许多组多通道正交小波。

矩阵值双正交小波包基

研究矩阵值小波包的性质.给出一类矩阵值双正交小波包的定义及构造.运用时频分析方法与算子理论刻划了矩阵值双正交小波包的特性,得到了矩阵值小波包的双正交公式.进而,得到矩阵值函数空间L2(R,Cr×r)新的Riesz基.

2维3尺度双正交小波滤波器的显示构造

研究由2维双正交尺度函数构造相应的双正交小波滤波器的矩阵扩充问题,运用矩阵多相分解方法与时频分析方法,给出由插值尺度函数构造2维3尺度双正交滤波器的显示公式;讨论了2维3尺度小波包的性质,得到3个双正交公式.

一类伸缩因子为4的d维矩阵值小波

小波变换在图像处理中是一项强有力的工具。根据信号多分量的特性,在构造向量值小波和矩阵值小波的应用过程中具有灵活性。文章在L2(Rd,Cn×n)空间中引入对应于4尺度矩阵值尺度函数的矩阵值多分辨分析和矩阵值正交小波的概念,给出了d维矩阵值正交小波存在的充要条件,提供了一类紧支撑d维矩阵值正交小波的构造算法。

多尺度多重向量值双正交小波的构建算法与性质

研究多尺度多重向量值双正交小波的构建算法与性质.运用向量细分格式、矩阵理论和多重向量值多分辨分析,证明了与一对给定的多尺度多重向量值双正交尺度函数对应的多尺度多重向量值双正交小波函数的存在性.提出了紧支撑多尺度多重向量值双正交小波的构造算法.讨论了多尺度多重向量值小波包的性质,得到了多重向量值小波包的双正交公式与向量值小波包基.

矩阵伸缩的高维向量值小波包

本文给出了对应于任意整数矩阵伸缩的高维向量值正交小波包的定义及其构造方法．并讨论了这种向量值正交小波包的性质,得到向量值函数空间L2(Rs,Cr)的新的正交小波基．