三变量独立连续函数的可数坐标依赖性

V. Mykhaylyuk
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引用次数: 0

摘要

20世纪中期,许多数学家深入研究了连续映射对一定数量坐标的依赖关系。它已成为研究连续映射性质的一种方便的工具。这一方向上最一般的结果在文献[5]中得到,得到了连续函数依赖于一定数量坐标积的充要条件。从[8]开始,独立连续映射对一定数量坐标的依赖成为切尔诺夫茨大学的研究课题。对于二元函数,最一般的结果见于[10]。文献[7]研究了三个或三个以上变量的单独连续函数对一定数量坐标的依赖关系,其中仅在所有因素均可度量的情况下才建立了充分必要条件,这为进一步的研究留下了很大的空间。我们得到了函数的可数多坐标依赖于三个空间积的充要条件,每个空间积都是紧肯普斯基空间族的积。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
DEPENDENCE ON COUNTABLE MANY OF COORDINATES OF SEPARATELY CONTINUOUS FUNCTIONS OF THREE VARIABLES
The dependence of continuous mappings on a certain number of coordinates was intensively studied in the works of many mathematicians in the middle of the 20th century. It has become a convenient tool in the study of properties of continuous mappings. The most general results in this direction were obtained in [5], where the necessary and sufficient conditions for the dependence of continuous functions on products from a certain number of coordinates were obtained. Starting with [8] the dependence of separately continuous mappings on a certain number of coordinates became the subject of research at the Chernivtsi University. For functions of two variables the most general results were obtained in [10]. The dependence on a certain number of coordinates of separately continuous functions of three or more variables was studied in [7], where the necessary and sufficient conditions were established only in the case of metrizability of all factors, which leaves a lot of room for further research. We obtain necessary and sufficient conditions of dependence on countable many of coordinates of functions on the product of three spaces each of which is the product of a family of compact Kempisty spaces.
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