English

Functions of Baire class one

Classical Analysis and ODEs 2007-05-23 v1 Functional Analysis

Abstract

Let KK be a compact metric space. A real-valued function on KK is said to be of Baire class one (Baire-1) if it is the pointwise limit of a sequence of continuous functions. In this paper, we study two well known ordinal indices of Baire-1 functions, the oscillation index β\beta and the convergence index γ\gamma. It is shown that these two indices are fully compatible in the following sense : a Baire-1 function ff satisfies β(f)ωξ1ωξ2\beta(f) \leq \omega^{\xi_1} \cdot \omega^{\xi_2} for some countable ordinals ξ1\xi_1 and ξ2\xi_2 if and only if there exists a sequence of Baire-1 functions (fn)(f_n) converging to ff pointwise such that supnβ(fn)ωξ1\sup_n\beta(f_n) \leq \omega^{\xi_1} and γ((fn))ωξ2\gamma((f_n)) \leq \omega^{\xi_2}. We also obtain an extension result for Baire-1 functions analogous to the Tietze Extension Theorem. Finally, it is shown that if β(f)ωξ1\beta(f) \leq \omega^{\xi_1} and β(g)ωξ2,\beta(g) \leq \omega^{\xi_2}, then β(fg)ωξ,\beta(fg) \leq \omega^{\xi}, where \xi=\max\{\xi_1+\xi_2, \xi_2+\xi_1}\}. These results do not assume the boundedness of the functions involved.

Keywords

Cite

@article{arxiv.math/0005013,
  title  = {Functions of Baire class one},
  author = {Denny H. Leung and Wee-Kee Tang},
  journal= {arXiv preprint arXiv:math/0005013},
  year   = {2007}
}