# Compactness properties defined by open-point games

**Authors:** Alejandro Dorantes-Aldama, Dmitri Shakhmatov

arXiv: 1906.02857 · 2019-06-10

## TL;DR

This paper introduces a new class of compactness properties in topological spaces based on open-point games, analyzing how winning strategies relate to classical compactness concepts.

## Contribution

It defines and investigates new compactness properties derived from open-point game strategies, providing examples and distinctions between these properties.

## Key findings

- Characterizes compactness via open-point game strategies.
- Establishes relationships between game strategies and classical compactness.
- Provides examples distinguishing different compactness properties.

## Abstract

Let S be a topological property of sequences (such as, for example, "to contain a convergent subsequence" or "to have an accumulation point"). We introduce the following open-point game OP(X,S) on a topological space X. In the n'th move, Player A chooses a non-empty open subet U_n of X, and Player B responds by selecting a point x_n in U_n. Player B wins the game if the sequence (x_n) satisfies property S in X; otherwise, Player A wins. The (non-)existence of regular or stationary winning strategies in OP(X,S) for both players defines new compactness properties of the underlying space X. We thoroughly investigate these properties and construct examples distinguishing half of them, for an arbitrary property S sandwiched between sequential compactness and countable compactness.

## Full text

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## Figures

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## References

12 references — full list in the complete paper: https://tomesphere.com/paper/1906.02857/full.md

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Source: https://tomesphere.com/paper/1906.02857