English

The Ascoli property for function spaces

General Topology 2016-06-06 v1 Functional Analysis

Abstract

The paper deals with Ascoli spaces Cp(X)C_p(X) and Ck(X)C_k(X) over Tychonoff spaces XX. The class of Ascoli spaces XX, i.e. spaces XX for which any compact subset KK of Ck(X)C_k(X) is evenly continuous, essentially includes the class of kRk_{\mathbb R}-spaces. First we prove that if Cp(X)C_p(X) is Ascoli, then it is κ\kappa-Fr\'echet-Urysohn. If XX is cosmic, then Cp(X)C_p(X) is Ascoli iff it is κ\kappa-Fr'echet-Urysohn. This leads to the following extension of a result of Morishita: If for a \v{C}ech-complete space XX the space Cp(X)C_p(X) is Ascoli, then XX is scattered. If XX is scattered and stratifiable, then Cp(X)C_p(X) is an Ascoli space. Consequently: (a) If XX is a complete metrizable space, then Cp(X)C_p(X) is Ascoli iff XX is scattered. (b) If XX is a \v{C}ech-complete Lindel\"of space, then Cp(X)C_p(X) is Ascoli iff XX is scattered iff Cp(X)C_p(X) is Fr\'echet-Urysohn. Moreover, we prove that for a paracompact space XX of point-countable type the following conditions are equivalent: (i) XX is locally compact. (ii) Ck(X)C_k(X) is a kRk_{\mathbb R}-space. (iii) Ck(X)C_k(X) is an Ascoli space. The Asoli spaces Ck(X,[0,1])C_k(X,[0,1]) are also studied.

Keywords

Cite

@article{arxiv.1606.01013,
  title  = {The Ascoli property for function spaces},
  author = {Saak Gabriyelyan and Jan Grebík and Jerzy Kakol and Lyubomyr Zdomskyy},
  journal= {arXiv preprint arXiv:1606.01013},
  year   = {2016}
}

Comments

15 pages. Comments are welcome

R2 v1 2026-06-22T14:16:41.901Z