复Hilbert空间中的K-框架和K-Riesz基

复Hilbert空间中的K-框架是框架的一种推广,是Gǎvruta在研究算子K的原子分解系统时引入的.本文首先在Hilbert空间H中引入K-Riesz基的概念,给出H中K-Riesz基界为A和B的K-Riesz基的两个等价刻画及K-框架界为A和B的K-框架的一个特征.众所周知,H中无冗框架与Riesz基是等价的,但是无冗K-框架与K-Riesz基是不等价的.接着研究H中无冗K-框架与K-Riesz基之间的关系.最后,考虑H中K-框架或K-Riesz基的扰动的稳定性.当K为H中的恒等算子时,这些结果与框架或Riesz基的相应结果是一致的.     

Hilbert 空间上框架扰动的新结果

该文给出Hilbert空间中框架扰动的新结果,也讨论Riesz 基, 近- Riesz 基和Riesz 框架的扰动问题. 所得结果包含一些已知扰动结果.     

由积分-微分方程的解构成的Riesz基

本文考虑了由积分-微分方程的初值解和边值解构成L~2[0,π]空间中Riesz基的问题.得到了由初值解构成Riesz基的充要条件,并通过在重特征值的根子空间中选取合适的函数,得到了由边值问题的广义特征函数构成Riesz基的充分条件.     

具有内阻尼和边界反馈控制的一类Euler-Bernoulli梁方程的Riesz基性质

考虑一类具有内阻尼和边界反馈控制的一维Euler-Bernoulli梁方程.中导出系统特征值和特征函数的渐近表达式,并且通过Riesz基生成定理的优点,证明该系统是一个Riesz系统,即该系统存在一列广义特征函数构成能量状态空间的一组Riesz基.从而,系统的谱决定增长条件成立,进而证明系统的指数稳定性.     

闭环系统Riesz基生成的条件

研究一般Hilbert空间X上的闭环系统广义本征元的Riesz基生成问题,采用基扰动的方法,给出了闭环系统广义本征元生成Riesz基的充分条件,并用实例说明了结论的应用.     

四元数Hilbert空间中Riesz基的刻画*

四元数Hilbert空间在应用物理科学特别是量子物理中占有重要地位.本文讨论四元数Hilbert空间的框架理论, 在四元数Hilbert空间中引入了Riesz基的概念, 在此基础上刻画了Riesz基,给出了它们的一些等价条件; 特别地, 得到了四元数Hilbert空间中的一个序列是Riesz基的充要条件是它是一个具有双正交序列的完备Bessel序列,且它的双正交序列也是一个完备Bessel序列; 并进一步证明了双正交序列中一个序列的完备性可以从特征刻画中去除.文中举例说明了双正交性、完备性和Bessel性质之间的关系.     

Hilbert空间中的g-Besselian框架和拟g-Riesz基

在Hilbert空间中,g-框架作为框架的推广,具有许多类似于框架的性质,但并非所有的结论都类似.比如Besselian框架等价于拟Riesz基,但g-Besselian框架与拟g-Riesz基不等价.该文刻画了g-Besselian框架与拟g-Riesz基在一定条件下的等价关系;得到g-Besselian框架与拟g-Riesz基的对偶性结论;并在Hilbert空间中讨论g-Besselian框架与拟g-Riesz基的稳定性.     

利用提升格式构造稳定的对偶小波

近年来 ,产生了一种称为“提升格式”的新的小波构造方法 [7,8,9] ,它从一个较简单的多尺度分析 (MRA)出发 ,利用尺度函数相同的多尺度分析之间的相互关系 ,逐步地得到所需性质的多尺度分析 .本文仅考虑双正交滤波的提升格式 .当选定一初始双正交滤波后 ,利用提升格式构造的双正交滤波仍是双正交的 ,而这双正交滤波能否生成双正交小波 Riesz基即稳定的对偶小波 ?更进一步 ,如何从一些较为简单的不能生成双正交小波 Riesz基的双正交滤波出发 ,利用提升格式构造出具有 Riesz基性质的双正交滤波 ?这在目前有关提升格式的文章中没作回答 .本…     

Banach空间中的X_d框架与Reisz基

本文引入并研究了Banach空间中的X_d框架,X_d Bessel列,紧X_d框架,独立X_d框架和X_d Riesz基等概念,给出了X_d框架和独立X_d框架的算子等价刻画,Banach空间X中存在X_d框架或X_d Riesz基的充要条件以及X_d框架的对偶框架存在的充要条件,讨论了Banach空间的基和X_d框架,X_d Riesz基之间的关系．     

Banach空间上的N—框架与M—Riesz基

本文首先在Banach空间引入了N－框架与M－Riesz基。给出N－框架的充要条件和N－框架与M－Riesz基的关系,其中M,N为Orilicz函数,再讨论它们的稳定性。     

Weighted Norm Inequalities for Commutators of BMO Functions and Singular Integral Operators with Non-Smooth Kernels

The aim of this paper is to establish a sufficient condition for certain weighted norm inequalities for singular integral operators with non-smooth kernels and for the commutators of these singular integrals with BMO functions. Our condition is applicable to various singular integral operators, such as the second derivatives of Green operators associated with Dirichlet and Neumann problems on convex domains, the spectral multipliers of non-negative self-adjoint operators with Gaussian upper bounds, and the Riesz transforms associated with magnetic Schrödinger operators.     

Approximation of continuous periodic functions of many variables by spherical Riesz means

We find in succession exact upper bounds for the magnitudes of the least upper bounds of the deviations of spherical Riesz means on classes of continuous periodic functions of many variables and, in a number of cases, we prove the asymptotic exactness of these estimates.Translated from Matematicheskie Zametki, Vol. 15, No. 5, pp. 821–832, May, 1974.The author thanks S. B. Stechkin for suggesting the topic of this paper.     

基于Riesz-表示算子非协调稳定化有限元法

Following the framework of the finite element methods based on Riesz-representing operators developed by Duan Huoyuan in 1997,through discrete Riesz representing-operators on some virtual(non-) conforming finite-dimensional subspaces,a stabilization formulation is presented for the Stokes problem by employing nonconforming elements.This formulation is uniformly coercive and not subject to the Babu ka-Brezzi condition,and the resulted linear algebraic system is positive definite with the spectral condition number O(h-2). Quasi-optimal error bounds are obtained,which is consistent with the interpolation properties of the finite elements used.     

Uniformly bounded families of Riesz bases of exponentials, sines, and cosines

We construct a wide class of families of exponentials, sines, and cosines generating Riesz bases of the corresponding Hilbert spaces with uniformly bounded upper bounds and uniformly positive lower bounds.     

Growth estimates for sine-type-functions and applications to Riesz bases of exponentials

We present explicit estimates for the growth of sine-type-functions as well as for the derivatives at theirzero sets, thus obtaining explicit constants in a result of Levin. The estimates are then used to derive explicitlower bounds for exponential Riesz bases, as they arise in Avdonin's Theorem on 1/4 in the mean or in alower bounds of exponential Riesz bases is desirable.     

Fusion-Riesz frame in Hilbert space

Fusion-Riesz frame (Riesz frame of subspace) whose all subsets are fusion frame sequences with the same bounds is a special fusion frame. It is also considered a generalization of Riesz frame since it shares some important properties of Riesz frame. In this paper, we show a part of these properties of fusion-Riesz frame and the new results about the stabilities of fusion-Riesz frames under operator perturbation (simple named operator perturbation of fusion-Riesz frames). Moreover, we also compare the operator perturbation of fusion-Riesz frame with that of fusion frame, fusion-Riesz basis (also called Riesz decomposition or Riesz fusion basis) and exact fusion frame.     

Evaluations of Parameters for the Optimization of S.S.O.R. and A.D.I. Preconditioning

The main goal of this paper is to give two ways to estimate the needed parameters in order to obtain the condition number of S.S.O.R. preconditioned matrices, namely, the algebraic matricial formulation of convexity Riesz theorem and the tridiagonal Fourier analysis. The improvement with respect to Axelsson's approach is explicitly given. Estimations of the condition number in the case of A.D.I. preconditioning is also considered.     

On second-order periodic elliptic operators in divergence form

We consider second-order, strongly elliptic, operators with complex coefficients in divergence form on . We assume that the coefficients are all periodic with a common period. If the coefficients are continuous we derive Gaussian bounds, with the correct small and large time asymptotic behaviour, on the heat kernel and all its H?lder derivatives. Moreover, we show that the first-order Riesz transforms are bounded on the -spaces with . Secondly if the coefficients are H?lder continuous we prove that the first-order derivatives of the kernel satisfy good Gaussian bounds. Then we establish that the second-order derivatives exist and satisfy good bounds if, and only if, the coefficients are divergence-free or if, and only if, the second-order Riesz transforms are bounded. Finally if the third-order derivatives exist with good bounds then the coefficients must be constant. Received in final form: 28 February 2000 / Published online: 17 May 2001     

Mixed,componentwise condition numbers and small sample statistical condition estimation of Sylvester equations

We present a componentwise perturbation analysis for the continuous‐time Sylvester equations. Componentwise, mixed condition numbers and new perturbation bounds are derived for the matrix equations. The small sample statistical method can also be applied for the condition estimation. These condition numbers and perturbation bounds are tested on numerical examples and compared with the normwise condition number. The numerical examples illustrate that the mixed condition number gives sharper bounds than the normwise one. Copyright © 2011 John Wiley & Sons, Ltd.     

On Riesz Means of Eigenvalues

In this article we prove the equivalence of certain inequalities for Riesz means of eigenvalues of the Dirichlet Laplacian with a classical inequality of Kac. Connections are made via integral transforms including those of Laplace, Legendre, Weyl, and Mellin, and the Riemann–Liouville fractional transform. We also prove new universal eigenvalue inequalities and monotonicity principles for Dirichlet Laplacians as well as certain Schrödinger operators. At the heart of these inequalities are calculations of commutators of operators, sum rules, and monotonic properties of Riesz means. In the course of developing these inequalities we prove new bounds for the partition function and the spectral zeta function (cf. Corollaries 3.5–3.7) and conjecture about additional bounds.