关于稠密集确定的函数

IF 0.1 Q4 MATHEMATICS Real Analysis Exchange Pub Date : 2021-11-01 DOI:10.14321/REALANALEXCH.46.2.0423

Nicholas P. M. Kayban, Xianfu Wang

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引用次数: 0

摘要

我们证明了上的几个下半连续函数的基本类ℝn是密集可采的。具体地说，我们证明了凸函数和连续函数的和、凸函数和下半连续函数的差、K增加函数（其中K是非空内部的锥）和K增加函数的差都是由它们在ℝn.因此，每种类型的这种函数的集合都是稠密可恢复集合。通常，两个稠密可恢复函数集的和和和差被证明是不稠密可恢复的。

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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ON FUNCTIONS DETERMINED BY DENSE SETS

We show that a few basic classes of lower semicontinuous functions on ℝn are densely recoverable. Specifically, we show that the sum of a convex and a continuous function, the difference of two convex and lower semicontinuous functions, a K-increasing function (where K is a cone of nonempty interior), and differences of K-increasing functions are all functions uniquely determined by their values on a dense set in ℝn. Thus, sets of such functions of each type are densely recoverable sets. In general, the sum and difference of two densely recoverable sets of functions is shown to not be densely recoverable.

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