On uniform deviation from the space of continuous function

Authors

  • V. K. Maslyuchenko Yuriy Fedkovych Chernivtsi National University
  • V. S. Mel’nyk Yuriy Fedkovych Chernivtsi National University

Abstract

It's proven that for the normal space $X$ and any function $f\!:X\!\rightarrow\!\mathbb{R}$ the uniform distance $d(f,C(X))$ of function $f$ from the space $C(X)$ of all continuous functions $g\!:X\!\rightarrow \!\mathbb{R}$ is equal to the half of the uniform norm $\|\omega_{f}\|$ of the function's $f$ oscillation $\omega_{f}$ and it is reached on some function $g$ from $C(X)$

Published

2014-06-24

How to Cite

Maslyuchenko, V. K., & Mel’nyk, V. S. (2014). On uniform deviation from the space of continuous function. Transactions of Institute of Mathematics, the NAS of Ukraine, 11(3), 173–181. Retrieved from https://trim.imath.kiev.ua/index.php/trim/article/view/74