一类新型Szasz-Kantorovich-Bezier算子在Orlicz空间内的逼近

研究了一类新型Szasz-Kantorovich-Bezier算子在Orlicz空间内的逼近问题.在连续函数空间和L_p空间内研究算子逼近方法的基础上,利用函数逼近论中的常用方法和技巧以及K泛函、Ditzian-Totik模、Holder不等式、Cauchy不等式、凸函数的Jensen不等式等工具得到了该算子在Orlicz空间内的逼近正定理、逆定理和等价定理.由于Orlicz空间包含连续函数空间和L_p空间,其拓扑结构也比L_p空间复杂得多,所以本文的结果具有一定的拓展意义.     

On approximation by operator semigroups of a general type

Summary For operator semigroups of class (C₀) on a Banach space X it is well known that the saturation class can be characterized as the relative completion with respect to X of the domain of the infinitesimal generator. This remains true for strongly measurable semigroups {T(t),t>0} having a closed infinitesimal operator A₀, but it becomes false if A₀ is non-closed. We prove that a characterization is given by A₀T(t)f =0(1), t0 + for a fairly general class of semigroups, including certain particular semigroups which belong to Oharu's class (C(₁)), or are of growth order less than one.The second named author was supported by a DFG grant (Go 261/4-1) which is gratefully acknowledged.     

A new type of approximation for fuzzy intervals

This paper suggests a new method to approximate a fuzzy interval u by a sequence of differentiable fuzzy intervals. This new approximation method involves the construction of differentiable fuzzy intervals using the sup-min convolution of fuzzy sets. Numerical examples and an algorithm for computational implementation of the method proposed are also given.     

A geometric approach to the cascade approximation operator for wavelets

This paper is devoted to an approximation problem for operators in Hilbert space, that appears when one tries to study geometrically thecascade algorithm in wavelet theory. Let be a Hilbert space, and let be a representation ofL ( ) on . LetR be a positive operator inL ( ) such thatR(1) =1, where1 denotes the constant function 1. We study operatorsM on (bounded, but noncontractive) such that

Finite-dimensional approximation of the inverse frame operator

A frame in a Hilbert space allows every element in to be written as a linear combination of the frame elements, with coefficients called frame coefficients. Calculations of those coefficients and many other situations where frames occur, requires knowledge of the inverse frame operator. But usually it is hard to invert the frame operator if the underlying Hilbert space is infinite dimensional. In the present paper we introduce a method for approximation of the inverse frame operator using finite subsets of the frame. In particular this allows to approximate the frame coefficients (even inl ²) using finite-dimensional linear algebra. We show that the general method simplifies in the important cases of Weil-Heisenberg frames and wavelet frames.     

Difference approximation of the coulomb collision operator

Translated from Aktual'nye Voprosy Prikladnoi Matematiki, pp. 80–87, 1989.     

Lipschitz continuity of the best approximation operator in vector-valued Chebyshev approximation

When G is a finite dimensional Haar subspace of C(X,R^k), the vector-valued continuous functions (including complex-valued functions when k is 2) from a finite set X to Euclidean k-dimensional space, it is well-known that at any function f in C(X,R^k) the best approximation operator satisfies the strong unicity condition of order 2 and a Lipschitz (Hőlder) condition of order . This note shows that in fact the best approximation operator satisfies the usual Lipschitz condition of order 1.     

Numerical approximation to the fractional derivative operator

In this paper we consider the numerical approximation of \(A^{\alpha }\) by contour integral. We are mainly interested to the case of \(A\) representing the discretization of the first derivative by means of a backward differentiation formula, and \( 0\!<\!\alpha \!<\!1\) . The computation of the contour integral yields a rational approximation to \(A^{\alpha }\) which can be used to define \(k\) -step formulas for the numerical integration of Fractional Differential Equations.     

Bernstein算子的点态同时逼近

借助光滑模ω_φ~2(f,t)(φ是一般步权函数),研究了Bernstein算子的点态同时逼近问题,给出了Bernstein算子同时逼近的等价定理,建立了其导数与光滑函数间的关系,对以前已有的结果予以补充和完善.     

一种神经网络算子及其逼近阶估计

讨论了一种神经网络算子f_n(x)=sum from -n~2 to n~2 (f(k/n))/(n~α)b(n~(1-α)(x-k/n)),对f(x)的逼近误差|f_n(x)-f(x)|的上界在f(x)为连续和N阶连续可导两种情形下分别给出了该网络算子逼近的Jackson型估计.     

The strong derivative of the best approximation operator

ABSTRACT

This article is devoted to the derivation of sampling series associated with eigenvalue problems. No examples of sampling theorems associated with odd order problems are known except when the order is one. Here we give necessary and sufficient conditions for the boundary conditions to be self adjoint. Then sampling series associated with odd order self adjoint and non self adjoint problems are given. The sampling representations associated with non self adjoint odd order problems are derived provided that the boundary condition are regular.     

Operator Hilbert spaces without the operator approximation property

We use a technique of Szankowski to construct operator Hilbert spaces that do not have the operator approximation property, including an example in a noncommutative space for .

     

On approximation of a certain differential operator

This paper consider the approximation problem of the image of an analytic function under the action of a higher-order differential operator with polynomial coefficients. The obtained formula generalizes the corresponding formulas of numerical differentiation. Translated from Sovremennaya Matematika i Ee Prilozheniya (Contemporary Mathematics and Its Applications), Vol. 54, Suzdal Conference–2006, Part 2, 2008.     

Data-sparse approximation to the operator-valued functions of elliptic operator

In previous papers the arithmetic of hierarchical matrices has been described, which allows us to compute the inverse, for instance, of finite element stiffness matrices discretising an elliptic operator The required computing time is up to logarithmic factors linear in the dimension of the matrix. In particular, this technique can be used for the computation of the discrete analogue of a resolvent

In the present paper, we consider various operator functions, the operator exponential negative fractional powers , the cosine operator function and, finally, the solution operator of the Lyapunov equation. Using the Dunford-Cauchy representation, we get integrals which can be discretised by a quadrature formula which involves the resolvents mentioned above. We give error estimates which are partly exponentially, partly polynomially decreasing.