On approximation of the separately and jointly continuous functions

H.A. Voloshyn; V.K. Maslyuchenko; O.V. Maslyuchenko

Authors

H.A. Voloshyn Yuriy Fedkovych Chernivtsi National University, 2 Kotsjubynskyi str., 58012, Chernivtsi, Ukraine
V.K. Maslyuchenko Yuriy Fedkovych Chernivtsi National University, 2 Kotsjubynskyi str., 58012, Chernivtsi, Ukraine
O.V. Maslyuchenko Yuriy Fedkovych Chernivtsi National University, 2 Kotsjubynskyi str., 58012, Chernivtsi, Ukraine https://orcid.org/0000-0002-1493-9399

Keywords:

separately and jointly continuous functions, approximation of separately and jointly continuous functions

Published online: 2010-12-30

Abstract

We investigate the following problem: which dense subspaces $L$ of the Banach space $C(Y)$ of continuous functions on a compact $Y$ and topological spaces $X$ have such property, that for every separately or jointly continuous functions $f: X\times Y \rightarrow \mathbb{R}$ there exists a sequence of separately or jointly continuous functions $f_{n}: X\times Y \rightarrow \mathbb{R}$ such, that $f_n^x=f_n(x, \cdot) \in L$ for arbitrary $n\in \mathbb{N}$ , $x\in X$ and $f_n^x\rightrightarrows f^x$ on $Y$ for every $x\in X$ ? In particular, it was shown, if the space $C(Y)$ has a basis that every jointly continuous function $f: X\times Y \rightarrow \mathbb{R}$ has jointly continuous approximations $f_n$ such type.

On approximation of the separately and jointly continuous functions

Authors

Keywords:

Abstract

Most read articles by the same author(s)

Make a Submission

Language

browse

Information