# Selectors for dense subsets of function spaces

**Authors:** Lev Bukovsk\'y, Alexander V. Osipov

arXiv: 1905.10287 · 2019-07-02

## TL;DR

This paper investigates selection principles related to dense subsets in spaces of bounded upper semicontinuous and continuous functions, establishing equivalences with properties of the underlying space.

## Contribution

It provides new characterizations of selection principles in function spaces using topological properties of the base space.

## Key findings

- Equivalent conditions for selection principles in USC^*_p(X)
- Results extend to C^*_p(X) spaces
- Similar principles hold for S_{fin} variants

## Abstract

Let $USC^*_p(X)$ be the topological space of real upper semicontinuous bounded functions defined on $X$ with the subspace topology of the product topology on ${}^X\mathbb{R}$. $\tilde\Phi^{\uparrow},\tilde\Psi^{\uparrow}$ are the sets of all upper sequentially dense, upper dense or pointwise dense subsets of $USC^*_p(X)$, respectively. We prove several equivalent assertions to the assertion $USC^*_p(X)$ satisfies the selection principles $S_1(\tilde\Phi^{\uparrow},\tilde\Psi^{\uparrow})$, including a condition on the topological space $X$. We prove similar results for the topological space $C^*_p(X)$ of continuous bounded functions. Similar results hold true for the selection principles $S_{fin}(\tilde\Phi^{\uparrow},\tilde\Psi^{\uparrow})$.

## Full text

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## References

24 references — full list in the complete paper: https://tomesphere.com/paper/1905.10287/full.md

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Source: https://tomesphere.com/paper/1905.10287