双连续n次积分C余弦函数的逼近定理

基于双连续半群概念,引入一致双连续半群序列概念,借助Laplace变换和Trotter-Kato定理,考察双连续n次积分C余弦函数与C-预解式之间的关系,得到逼近定理的稳定性条件,进而得出双连续n次积分C余弦函数逼近定理.从而对Banach空间强连续半群逼近定理和双连续半群逼近定理进行了推广,为相应抽象的Cauchy问题提供了解决方案.     

对于局部有界函数的积分型Szász-Bézier算子的逼近估计

引入一种积分型的Szász-Bézier算子,并研究其逼近性质,得到了此类算子对局部有界函数的逼近阶估计公式.     

连续区间上积分值的MQ拟插值算子

在某些插值问题中,插值点处的函数值是未知的,而连续区间上的积分值是已知的.如何利用连续区间上积分值信息来解决函数重构是一个重要的问题.首先,文章利用连续区间上积分值的线性组合得到结点处函数值和一阶导数值的的四阶逼近.然后,构造了一类基于连续区间上积分值的MQ拟插值算子,它称之为积分值型MQ拟插值算子.最后,给出了该MQ拟插值算子的整体误差,它具有相应的四阶逼近阶.数值实验表明,该方法是有效可行的.     

拟分布余弦函数

设X是Banach空间;本文研究了X上定义的拟分布余弦函数2G(φ)G(ψ)=G(φ*ψ)+G(φ(◎)ψ),()ε,ψ∈D;在D上引入了一种新的运算"()"并研究了拟分布余弦函数、积分余弦算子函数和二阶抽象Cauchy问题之间的关系.     

指数有界的C余弦算子函数

本文引入了指数有界的Ｃ余弦算子函数的生成元，讨论了生成元的基本性质，建立了相应的生成定理、逼近定理及扰动定理．最后给出了指数有界的Ｃ余弦算子函数与指数有界的Ｃ半群的基本联系．     

对于局部有界函数的积分型Szász-Bézier算子的逼近估计

引入一种积分型的 Szász- Bézier算子 ,并研究其逼近性质 ,得到了此类算子对局部有界函数的逼近阶估计公式     

分布余弦函数

本给出分布余弦函数的定义，其中包括生成元为多值算子情形，并讨论退化性型分布余弦函数与退化型二阶Cauchy问题、退化型积分余弦函数的关系，最后说明了非退化分布余弦函数的生成元亦生成正则余弦函数。     

拟分布余弦函数

设X是Banach空间;本文研究了X上定义的拟分布余弦函数:2G（φ）G（Ψ）=G（φ＊Ψ）+G（φ（?）Ψ）,（?）φ,Ψ∈D;在D上引入了一种新的运算“（?）”并研究了拟分布余弦函数、积分余弦算子函数和二阶抽象Cauchy问题之间的关系.     

Feller算子对BVP类函数的逼近阶

该运用概率工具研究函数逼近问题,建立了Feller算子对在(一∞,+∞)的每一有限子区间上具p次有界变差函数逼近的速度估计,并且讨论了函数左、右导数存在时的逼近速度,得到两个量化定理,原则上可以包含众多正算子对BV与BVp类函数逼近的相应结果．由于p>1时p次有界变差函数不能表为两个单增函数之差,推演方法不能沿用L-S积分及分部积分法,该文运用了处理离散情形的累次Abel变换从而得出结果．     

α次积分余弦函数

该文研究了α次积分余弦函数的一些基本问题．目的是证明α次积分余弦函数的一些基本性质、生成定理、与α次积分半群的关系等．获得的结果改进和统一了由Arendt和Kellermann、Li和Shaw、Zheng等给出的相应结论．     

m次积分半群逼近及在抽象Cauchy问题中的应用

研究了指数有界的m次积分半群的离散逼近问题,利用可积的离散参数半群,获得了相关离散逼近结果.另外,给出了该逼近理论在非齐次抽象Cauchy问题中的应用.     

Upper tail probabilities of integrated Brownian motions

We obtain new upper tail probabilities of m-times integrated Brownian motions under the uniform norm and the Lp norm. For the uniform norm, Talagrand’s approach is used, while for the Lp norm, Zolotare’s approach together with suitable metric entropy and the associated small ball probabilities are used. This proposed method leads to an interesting and concrete connection between small ball probabilities and upper tail probabilities(large ball probabilities) for general Gaussian random variables in Banach spaces. As applications,explicit bounds are given for the largest eigenvalue of the covariance operator, and appropriate limiting behaviors of the Laplace transforms of m-times integrated Brownian motions are presented as well.     

A new kernel function for SPH with applications to free surface flows

Smoothed particle hydrodynamics (SPH) is a popular meshfree Lagrangian particle method, which uses a kernel function for numerical approximations. The kernel function is closely related to the computational accuracy and stability of the SPH method. In this paper, a new kernel function is proposed, which consists of two cosine functions and is referred to as double cosine kernel function. The newly proposed double cosine kernel function is sufficiently smooth, and is associated with an adjustable support domain. It also has smaller second order momentum, and therefore it can have better accuracy in terms of kernel approximation. SPH method with this double cosine kernel function is applied to simulate a dam-break flow and water entry of a horizontal circular cylinder. The obtained SPH results agree very well with the experimental results. The double cosine kernel function is also comparatively studied with two frequently used SPH kernel functions, Gaussian and cubic spline kernel functions.     

Approximation of semigroups and cosine functions in spaces of periodic functions

In this article we furnish a representation of the solutions of some classes of first-order and second-order evolution problems as limit of iterates of classical sequences of approximating operators. The method is based on Trotter's theorem on the approximation of semigroups which is applied here also for the approximation of groups and cosine functions. We apply this method in spaces of continuous periodic functions and using some classical sequences of trigonometric polynomials.     

Approximation theorems for the propagators of higher order abstract Cauchy problems

In this paper, we present two quite general approximation theorems for the propagators of higher order (in time) abstract Cauchy problems, which extend largely the classical Trotter-Kato type approximation theorems for strongly continuous operator semigroups and cosine operator functions. Then, we apply the approximation theorems to deal with the second order dynamical boundary value problems.

     

Mean Ergodicity and Mean Stability of Regularized Solution Families

We prove general theorems on mean ergodicity and mean stability of regularized solution families with respect to fairly general summability methods. They can be applied to integrated solution families, integrated semigroups and cosine functions. In particular, through applications with modified Cesàro, Abel, Gauss, and Gamma like summability methods we deduce particular results on mean ergodicity and mean stability of polynomially bounded C₀-semigroups and cosine operator functions.     

On trigonometric wavelets

Wavelets in terms of sine and cosine functions are constructed for decomposing 2π-periodic square-integrable functions into different octaves and for yielding local information within each octave. Results on a simple mapping into the approximate sample space, order of approximation of this mapping, and pyramid algorithms for decomposition and reconstruction are also discussed.     

On approximation and representation of K-regularized resolvent families

We study the problem of approximation and representation for a family of strongly continuous operators defined in a Banach space. It allows us to extend, and in some cases to improve results from the theory ofC ₀-semigroups of operators to, among others, the theories of cosine families, n-times integrated semigroups, resolvent families and k-generalized solutions by means of an unified method.The author was supported by FONDECYT grants 1980812; 1970722 and DICYT (USACH).