一类带限的插值小波

Ｓｈａｎｎｏｎ尺度函数具有带限性质，正交性质、取样性质，但它不在Ｌ（Ｒ）中，本文引入小波，它的尺度函数不仅具有上述性质而且在Ｌ（Ｒ）中，甚至更多。     

M-带双正交矩阵值小波包

1预备文[1]研究了矩阵值小波,并介绍了离散矩阵值小波变换的应用,表明了研究矩阵值小波的重要性。文[2][3]研究了M-带小波包,文[4]研究了向量值正交小波包。本文在此基础上构造了M-带双正交矩阵值小波包,并研究了它的性质。     

广义基插值的正交多尺度函数和多小波

给出一类具有广义插值的正交多尺度函数的构造方法, 并给出对应多小波的显示构造公式. 证明了该文构造的多小波拥有与多尺度函数相同的广义基插值性.从而建立了多小波子空间上的采样定理. 最后基于该文提供的算法构造出若干具有广义基插值的正交多尺度函数和多小波.     

L2(Rs)中插值小波包的分裂技巧和精细分解

对具有任意伸缩矩阵A的插值加细函数，给出对应于L^2(R^s)中的小波包的一个构造方法．采样空间被直接分解来取代对加细函数的符号分解．按照这个方法构造的插值小波包能对基插值空间提供较为精细的分解，因而对自适应的插值给出较好的局部化．     

一种有实用价值的小波包的构造

小波分析是八十年代发展起来的新数学分支,小波基和小波包的构造不但在理论上,而且在应用中具有实际意义上,本文构造了一个具有较快衰减性,较好光滑性及对称性且能实现数值计算的正交小波包。     

任意矩阵伸缩的正交小波包

1 引言 Coifman和Meyer引入L~2(R)中正交小波包,可以用张量积形式构造L~2(R~2)上的二维正交小波包;Chui和Li研究单变量非正交小波包和对偶小波包;Shen给出矩阵伸缩为2I时L~2(R~s)上非张量积小波包的构造算法;程正兴给出矩阵小波包的构     

一类二元半正交小波包的构造

本文给出伸缩矩阵行列式为2的一类二元半正交小波包的构造算法.该小波包是以频域给出的,随着用于小波包分裂的滤波器选取的不同会得到L2(R2)中形态各异的Riesz基,这样使得L2(R2)中小波基的选择更灵活.     

紧支撑样条小波插值及其应用

基于紧支撑样条小波函数插值与定积分的思想,给出了由紧支撑样条小波插值函数构造数值积分公式的方法．并将该方法应用于二次、三次、四次和五次紧支撑样条小波函数,得到了相应的数值积分公式．最后,通过数值例子验证,发现该方法得到的数值积分公式是准确的,且具有较高精度．     

一类二维不可分非正交小波包

Zuowei Shen构造了L^2（R^s)空间的二进制小泡包,与伸缩矩阵M＝（1 1 1 －1）相关的小波适用于二维图像处理中的梅花状子取样,本文给出了一种构造非正交M－小滤包的方法。     

多元正交小波包

本文利用Ｓｔｏｃｋｌｅｒ在引文（２）中所提供的多元小波矩阵描述的工具，将Ｃｈｕｉ在引文（１）中关于一元正交小波包的结果推广到多元正交小波包。     

样条型矩阵有理插值

The matrix valued rational interpolation is very useful in the partial realization problem and model reduction for all the linear system theory. Lagrange basic functions have been used in matrix valued rational interpolation. In this paper, according to the property of cardinal spline interpolation, we constructed a kind of spline type matrix valued rational interpolation, which based on cardinal spline. This spline type interpolation can avoid instability of high order polynomial interpolation and we obtained a useful formula.     

On cardinal wavelets with compact support and their duals

Some people try to construct an orthonormal wavelet such that the corresponding scaling function φ(t) has the cardinal property,i.e. ϕ(n)= σn0, since such wavelets have many good applications. Unfortunately it is impossible to do so, except for a trivial case^[1]. In this work, a family of non-orthogonal cardinal wavelets with compact support is constructed and their duals are investigated. This work is supported by the project of new stars of Beijing     

Interpolating Cubic Spline Wavelet Packet on Arbitrary Partitions

In many applications, the splines on an arbitrary partition are very useful. In this paper, a spline wavelet structure is created in the way that it provides a multiresolution approximation of the spline subspaces with arbitrary partition in the space of continuous functions on a finite interval. Based on the wavelet basis and the wavelet packet in this structure, a multi-level interpolation method is developed for decomposing a function into wavelet series and reconstructing it from its wavelet representation.     

基样条插值的极限性质

本文证明了当m→∞时‖s^(k)mf-f^(k)‖p→0（1＜p＜∞,k=0,1,2）的充要条件是f∈Bπ,p,其中Bπ,p＝Bπ∩Lp(R),Bπ表示指数π型的整函数在R上限制为有界函数所构成的集合,而Smf是在整数点对f 插值的唯一确定的m-1次基样条,进而得一了函数类Bπ,p的三个等价的特征刻划。     

正交小波包的构造

本文给出尺度因子ａ＝４时正交小波包的构造,推广了［２,４］引入的正交小波包,并给出相应的分解与再构造算法．本文引入的正交小波包具有保持信号ｆ∈Ｌ^２的线性相位,也讨论了尺度因子ａ＝ｋ（ｋ∈Ｚ,ｋ≥２）正交小波的构造     

Sturm–Liouville Problems with Coupled Boundary Conditions and Lagrange Interpolation Series

This paper is concerned with the application of the Kramer sampling theorem to Sturm–Liouville problems with coupled boundary conditions. The analysis is restricted to the case when the spectrum of the boundary value problem is simple. In all such cases, it is shown that Kramer analytic kernels can be defined and that each kernel has an associated analytic interpolation function to give the Lagrange interpolation series.     

非有限带函数由Hermite型多元样本定理的重构

In this paper, we prove that under some restricted conditions, the non-bandiimited functions can be reconstructed by the multidimensional sampling theorem of Hermite type in the space of Lp（R^n）, 1 〈 p 〈 ∞.