Orlicz空间中Gauss-Weierstrass算子逼近

本文首先介绍Orlicz空间L*M的基本概念,然后讨论Gauss-Weierstrass算子在Orlicz空间的逼近性质,最后利用K-泛函和光滑模给出逼近的正逆定理,并证明相关结果的等价性.     

Bernstein-Sikkema-Bézier算子的点态逼近

讨论了Bernstein-Sikkema-Bézier算子点态逼近的等价定理,首先利用插项的的方法证明了正定理,然后应用讨论算子逼近的常规方法给出了其逼近的逆定理.     

Orlicz空间中Kantorovi算子逼近等价定理

以带权函数的连续模为工具 ,讨论了 Kantorovic算子在 Orlicz空间中逼近的正、逆定理 ,进而得到其等价刻划 .     

Meyer-Knig-Zeller算子加权逼近的收敛阶

利用加权Ditzin-Totik光滑模ω2φλ(f;t)w,借助Peetre K-泛函研究了Meyer-Konig-Zeller算子,给出其特征刻画.     

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.     

一类推广的Bernstein-Kantorovich算子的点态逼近

讨论Bernstein-Kantorovich算子的一种推广形式的逼近性质,运用插项的方法证明了逼近正定理,并证明了逆定理,得到了逼近等价定理.完善了算子在逼近性质方面的结果.     

Orlicz空间中Kantorovi(c)算子逼近等价定理

以带权函数的连续模为工具,讨论了Ｋａｎｔｏｒｏｖｉｃ算子在Ｏｒｌｉｃｚ空间中逼近的正、逆定理,进而得到其等价刻划。     

Meyer-K(o)nig-Zeller 算子加权逼近的收敛阶

利用加权Ditzin-Totik 光滑模ω2φλ(f;t)w,借助Peetre K-泛函研究了Meyer-K(o)nig-Zeller算子,给出其特征刻画.     

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.     

Orlicz空间内的Müntz有理逼近

本文利用函数的延拓,Steklov变换,Cauchy-Schwarz不等式,Hardy-Littlewood极大函数等工具讨论Müntz有理函数在Orlicz空间内的逼近问题,给出收敛速度的估计.由于Orlicz空间比连续函数空间和Lp空间"大",它是Lp空间的实质性的扩充,其拓扑结构也比Lp空间复杂的多,因此本文中所得的结果具有一定的拓展意义.     

On approximation in Weighted Orlicz spaces

An inverse theorem of the trigonometric approximation theory in Weighted Orlicz spaces is proved and the constructive characterization of the generalized Lipschitz classes defined in these spaces is obtained.     

On approximation by polynomials in Orlicz spaces

In this paper, we prove Jackson theorem of derivative type in Orlicz spaces, and the results of this paper are generalization of the results of A.-R.K. Ramazanov in [2].     

Composition operators on Orlicz spaces

In this paper we characterize the composition operators on Orlicz spaces and study some of their properties.Research supported by NBHM DDF No. 40/11/95 (R&D-II)/1429     

Multiplication operators between Orlicz spaces

The invertible, compact and Fredholm multiplication operators on Orlicz spaces are characterized in this paper.     

Trigonometric approximation in reflexive Orlicz spaces

The Lipschitz classes Lip(α, M) , 0 α≤ 1 are defined for Orlicz space generated by the Young function M, and the degree of approximation by matrix transforms of f ∈ Lip (α, M) is estimated by n-α .     

On approximation by polynomials and rational functions in Orlicz spaces

Для пространств Орли ча получен аналог изв естного неравенства С. Б. Стечк ина об оценке наименьших по линомиальных уклоне ний через модуль гладкости про извольного порядка. Например, если?∈L* _Φ (I), то \(R_n (f,I)_\Phi \leqq E(f,I)_\Phi \leqq C(\Phi ,r)\omega _r \left( {\tfrac{1}{n},f,I} \right)_\Phi \) при всех натуральныхr иn≧r (теорема I). Доказана неулучшаем ость этой теоремы, ее а налог для случая приближения т ригонометрическими полиномами и тригоно метрическими рацион альными функциями. Установлена связьΔ ₂-условия на функциюΦ(u) со свойствами аппрокси мации соответствующ их классов функций (теор ема 3).     

The uniform approximation property in Orlicz spaces

It is proved that for every reflexive Orlicz spaceX there is a functionn(k,ε) so that wheneverE is ak-dimensional subspace ofX there exists an operatorT: X→X such thatT _1E=identity, ‖T‖≦1+ε and dimTX≦n(k,ε). Some general facts concerning the uniform approximation property are also presented. Research of the first named author was partially supported by NSF Grant MPS 74-07509-A01.     

On the convergence properties of sampling Durrmeyer-type operators in Orlicz spaces

Here, we provide a unifying treatment of the convergence of a general form of sampling-type operators, given by the so-called sampling Durrmeyer-type series. The main result consists of the study of a modular convergence theorem in the general setting of Orlicz spaces $L^{\phi }(\mathbb{R})$. From the latter theorem, the convergence in $L^p(\mathbb{R})$, in $L^{\alpha }{\log }^{\beta }L$, and in the exponential spaces can be obtained as particular cases. For the completeness of the theory, we provide a pointwise and uniform convergence theorem on $\mathbb{R}$, in case of bounded continuous and bounded uniformly continuous functions; in this context, we also furnish a quantitative estimate for the order of approximation, using the modulus of continuity of the function to be approximated. Finally, applications and examples with graphical representations are given for several sampling series with special kernels.     

Simultaneous approximation for Bézier variant of Szász-Mirakyan-Durrmeyer operators

We study the rate of convergence in simultaneous approximation for the Bézier variant of Szász-Mirakyan-Durrmeyer operators by using the decomposition technique of functions of bounded variation.