A note on approximation of continuous functions on normed spaces

arXiv: Functional Analysis Pub Date : 2020-04-01 DOI:10.15330/cmp.12.1.107-110

M. A. Mytrofanov, A. Ravsky

引用次数: 1

Abstract

Let $X$ be a real separable normed space $X$ admitting a separating polynomial. We prove that each continuous function from a subset $A$ of $X$ to a real Banach space can be uniformly approximated by restrictions to $A$ of functions which are analytic on open subsets of $X$. Also we prove that each continuous function to a complex Banach space from a complex separable normed space admitting a separating $*$-polynomial can be uniformly approximated by $*$-analytic functions.

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赋范空间上连续函数的逼近问题

设X$是一个实可分离赋范空间X$，允许一个分离多项式。证明了从$X$的子集$ a $到实巴拿赫空间的每一个连续函数都可以由$X$的开子集上解析函数的$ a $的限制一致逼近。同时证明了从具有分离的$*$-多项式的复可分赋范空间到复巴拿赫空间的每一个连续函数都可以用$*$-解析函数一致逼近。

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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arXiv: Functional Analysis

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