向量函数在加权空间中的逼近

IF 1.1 Q1 MATHEMATICS Constructive Mathematical Analysis Pub Date : 2021-02-22 DOI:10.33205/CMA.825986

G. Păltineanu, I. Bucur

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摘要

本文给出了广义向量函数加权空间的对偶理论。我们提到了J. B. Prolla在[6]中提到的在特殊情况下向量函数加权空间的对偶的一个表征$V \子集C^{+} (X)$。同时，我们在向量函数加权空间的凸锥的这种新设置中推广了de Branges引理(定理4.2)。利用这个定理，我们得到了向量函数加权空间的各种近似结果:定理4.2-4.6和推论4.3。我们还提到，本文的一个简短版本，在特殊情况下$V \子集C^{+} (X)$，在[3]，第2章，分段2.5中给出。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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APROXIMATION IN WEIGHTED SPACES OF VECTOR FUNCTIONS

In this paper, we present the duality theory for general weighted space of vector functions. We mention that a characterization of the dual of a weighted space of vector functions in the particular case $V \subset C^{+} (X)$ is mentioned by J. B. Prolla in [6]. Also, we extend de Branges lemma in this new setting for convex cones of a weighted spaces of vector functions (Theorem 4.2). Using this theorem, we find various approximations results for weighted spaces of vector functions: Theorems 4.2-4.6 as well as Corollary 4.3. We mention also that a brief version of this paper, in the particular case $V \subset C^{+} (X)$, is presented in [3], Chapter 2, subparagraph 2.5.

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