# Topological properties of spaces of Baire functions

**Authors:** Saak Gabriyelyan

arXiv: 1904.13227 · 2019-05-01

## TL;DR

This paper investigates the topological properties of spaces of Baire-$oldsymbol{	extalpha}$ functions, extending known results for Baire one functions to higher classes and more general target groups, revealing their Fréchet–Urysohn and $k$-space characteristics.

## Contribution

It generalizes the topological analysis of Baire function spaces to higher classes and non-precompact groups, establishing new properties like $oldsymbol{	extkappa}$-Fréchet–Urysohn and conditions for $k$-spaces.

## Key findings

- $B_oldsymbol{	extalpha}(X,G)$ is a $oldsymbol{	extkappa}$-Fréchet–Urysohn space.
- $B_oldsymbol{	extalpha}(X,G)$ is a $k$-space iff $X$ is countable.
- Spaces are Ascoli spaces due to their $oldsymbol{	extkappa}$-Fréchet–Urysohn property.

## Abstract

A fundamental result proved by Bourgain, Fremlin and Talagrand states that the space $B_1(M)$ of Baire one functions over a Polish space $M$ is an angelic space. Stegall extended this result by showing that the class $B_1(M,E)$ of Baire one functions valued in a normed space $E$ is angelic. These results motivate our study of various topological properties in the classes $B_\alpha(X,G)$ of Baire-$\alpha$ functions, where $\alpha$ is a nonzero countable ordinal, $G$ is a metrizable non-precompact abelian group and $X$ is a $G$-Tychonoff first countable space. In particular, we show that (1) $B_\alpha(X,G)$ is a $\kappa$-Fr\'{e}chet--Urysohn space and hence it is an Ascoli space, and (2) $B_\alpha(X,G)$ is a $k$-space iff $X$ is countable.

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Source: https://tomesphere.com/paper/1904.13227