Self-maps under the compact-open topology

Richard Lupton, Max F. Pitz

Published 2015-09-16Version 1

This paper investigates the space $C_k(\omega^*,\omega^*)$, the space of continuous self-maps on the Stone-\v{C}ech remainder of the integers, $\omega^*$, equipped with the compact-open topology. Our main results are that (1) $C_k(\omega^*,\omega^*)$ is Baire, (2) Stone-\v{C}ech extensions of injective maps on $\omega$ form a dense set of weak $P$-points in $C_k(\omega^*,\omega^*)$, (3) it is independent of ZFC whether $C_k(\omega^*,\omega^*)$ contains $P$-points, and that (4) $C_k(\omega^*,\omega^*)$ is not an $F$-space, but contains, as $\omega^*$, no non-trivial convergent sequences.