English

$\kappa$-spaces

General Topology 2025-07-16 v1

Abstract

We say that a Tychonoff space XX is a κ\kappa-space if it is homeomorphic to a closed subspace of Cp(Y)C_p(Y) for some locally compact space YY. The class of κ\kappa-spaces is strictly between the class of Dieudonn\'{e} complete spaces and the class of μ\mu-spaces. We show that the class of κ\kappa-spaces has nice stability properties, that allows us to define the κ\kappa-completion κX\kappa X of XX as the smallest κ\kappa-space in the Stone--\v{C}ech compactification βX\beta X of XX containing XX. For a point zβXz\in\beta X, we show that (1) if zυXz\in\upsilon X, then the Dirac measure δz\delta_z at zz is bounded on each compact subset of Cp(X)C_p(X), (2) zκXz\in \kappa X iff δz\delta_z is continuous on each compact subset of Cp(X)C_p(X) iff δz\delta_z is continuous on each compact subset of Cpb(X)C_p^b(X), (3) zυXz\in\upsilon X iff δz\delta_z is bounded on each compact subset of Cpb(X)C_p^b(X). It is proved that κX\kappa X is the largest subspace YY of βX\beta X containing XX for which Cp(Y)C_p(Y) and Cp(X)C_p(X) have the same compact subsets, this result essentially generalizes a known result of R.~Haydon.

Keywords

Cite

@article{arxiv.2507.11220,
  title  = {$\kappa$-spaces},
  author = {Saak Gabriyelyan and Evgenii Reznichenko},
  journal= {arXiv preprint arXiv:2507.11220},
  year   = {2025}
}
R2 v1 2026-07-01T04:02:09.436Z