共查询到19条相似文献,搜索用时 62 毫秒
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借助于D itzian-T otik光滑模研究了Bernstein算子的同时逼近问题,给出了Bernstein算子同时逼近的正定理和等价定理. 相似文献
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研究一般Banach空间X中同时逼近问题的适定性.对严格凸的KadecBanach空间X中的相对有界弱紧闭子集G,建立了关于最佳同时逼近问题适定Bair纲结果.进一步,当X是一致凸空间时,证明了E(G)中使其最佳同时逼近问题不适定的序列在E(G)中是一个σ-多孔集.另外,还研究了关于最佳同时逼近元具有分歧域的集合G的几乎性. 相似文献
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基于q-微积分的概念引入一类修正的Stancu型q-Baskakov-Durrmeyerr算子,并且借助连续模研究该算子的一些局部逼近性质,得到了算子的局部逼近定理.同时讨论的算子的加权逼近. 相似文献
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有理同时Chebyshev逼近的一致强唯一性 总被引:2,自引:0,他引:2
本文研究了广义有理同时 Chebyshev 逼近的一致强唯一性.首先,我们举例说明经典的 Chebyshev 逼近的结果不能直接推广到同时 Chebyshev 逼近情形,其次给出了使 inf_(F∈Γ)γ(F)>0的充分条件.其中γ(F)是 F 的广义有理同时 Chebyshev 逼近的强唯一常数.最后,我们研究了所给条件的必要性. 相似文献
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Lagrange插值在—重积分Wiener空间下的同时逼近平均误差 总被引:1,自引:1,他引:0
在加权L_p范数逼近意义下,确定了基于扩充的第二类Chebyshev结点组的Lagrange插值多项式列,在一重积分Wiener空间下同时逼近平均误差的渐近阶.结果显示,在L_p范数逼近意义下,Lagrange插值多项式列逼近函数及其导数的平均误差都弱等价于相应的最佳逼近多项式列的平均误差.同时,在信息基复杂性的意义下,若可允许信息泛函为标准信息,则上述插值算子列逼近函数及其导数的平均误差均弱等价于相应的最小非自适应信息半径. 相似文献
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Bernstein-Durrmeyer算子的加权同时逼近等价定理 总被引:1,自引:0,他引:1
本文借助修正的Voronovskaja定理,用更一般的光滑模函数来刻划加权同时逼近阶,建立了加权同时逼近等价定理,统一了非最优逼近阶及饱和阶的特征刻划. 相似文献
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插值多项式在一重积分Wiener空间下的同时逼近平均误差 总被引:4,自引:0,他引:4
本文在加权Lp范数逼近意义下确定了基于第一类Chebyshev 结点组的Lagrange 插值多项式列在一重积分Wiener 空间下同时逼近平均误差的渐近阶. 结果显示在Lp范数逼近意义下Lagrange 插值多项式列的平均误差弱等价于相应的最佳逼近多项式列的平均误差. 同时, 当2≤p≤4 时,Lagrange 插值多项式列导数逼近的平均误差弱等价于相应的导数最佳逼近多项式列的平均误差. 作为对比, 本文也确定了相应的Hermite-Fejér 插值多项式列在一重积分Wiener空间下逼近的平均误差的渐近阶. 相似文献
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本文建立了拟模Abelian群上双参数算子族逼近的外推定理,所得的结果包含了DeVoreR.等人对正规逼近族之最佳逼近所建立的外推定理,且所需的条件更弱.同时从本文的结果立即可以建立起算子逼近的外推定理. 相似文献
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Summary We obtain preservation inequalities for Lipschitz constants of higher order in simultaneous approximation processes by Bernstein type operators. From such inequalities we derive the preservation of the corresponding Lipschitz spaces. 相似文献
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Hongbiao Jiang 《分析论及其应用》2008,24(2):120-128
Recently some classical operator quasi-interpolants were introduced to obtain much faster convergence.We consider left Gamma quasi-interpolants and give a pointwise simultaneous approximation equivalence theorem with ω2r(4)λ(f,f)∞ by means of unified the classical modulus and Ditzian-Totick modulus. 相似文献
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Olivier Demanze 《Journal of Mathematical Analysis and Applications》2008,338(1):662-674
The point source of this work is Seleznev's theorem which asserts the existence of a power series which satisfies universal approximation properties in C∗. The paper deals with a strengthened version of this result. We establish a double approximation theorem on formal power series using a weighted backward shift operator. Moreover we give strong conditions that guarantee the existence of common universal series of an uncountable family of weighted backward shift with respect to the simultaneous approximation. Finally we obtain results on admissible growth of universal formal power series. We especially prove that you cannot control the defect of analyticity of such a series even if there exist universal series in the well-known intersection of formal Gevrey classes. 相似文献
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Bernstein型算子同时逼近误差 总被引:1,自引:0,他引:1
丁春梅 《数学物理学报(A辑)》2010,30(1):142-153
该文证明了C[0,1]空间中的函数及其导数可以用Bernstein算子的线性组合同时逼近,得到逼近的正定理与逆定理.同时,也证明了Bernstein算子导数与函数光滑性之间的一个等价关系.该文所获结果沟通了Bernstein算子同时逼近的整体结果与经典的点态结果之间的关系. 相似文献
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本文首先指出文献[1]中的一个错误,举例说明弱拟凸集的最佳逼近未必具有广义强唯一性,进而讨论两类共同逼近的强唯一性,在空间是一致凸、逼近集是共同太阳集的条件下,证明了最佳共同逼近具有广义强唯一性 相似文献
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LI Chong 《中国科学A辑(英文版)》2001,44(12):1558-1570
The well posedness of best simultaneous approximation problems is considered. We establish the generic results on the well
posedness of the best simultaneous approximation problems for any closed weakly compact nonempty subset in a strictly convex
Kadec Banach space. Further, we prove that the set of all points inE(G) such that the best simultaneous approximation problems are not well posed is a u- porous set inE(G) whenX is a uniformly convex Banach space. In addition, we also investigate the generic property of the ambiguous loci of the best
simultaneous approximation. 相似文献
18.
Michael Ratliff 《Journal of Number Theory》1978,10(1):99-126
The theorem of the title on simultaneous rational approximation to algebraic numbers is carried over to simultaneous approximation by rational functions to algebraic functions. More generally, Schmidt's Subspace Theorem is proved in the context of functions. 相似文献
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We develop a theory of best simultaneous approximation for closed convex sets in a conditionally complete lattice Banach space
X with a strong unit. We study best simultaneous approximation in X by elements of closed convex sets, and give necessary and sufficient conditions for the uniqueness of best simultaneous approximation.
We give a characterization of simultaneous pseudo-Chebyshev and quasi-Chebyshev closed convex sets in X. Also, we present various characterizations of best simultaneous approximation of elements by closed convex sets in terms
of the extremal points of the closed unit ball B
X* of X*. 相似文献