English

On maps preserving connectedness and /or compactness

General Topology 2018-01-22 v1

Abstract

We call a function f:XYf: X\to Y PP-preserving if, for every subspace AXA \subset X with property PP, its image f(A)f(A) also has property PP. Of course, all continuous maps are both compactness- and connectedness-preserving and the natural question about when the converse of this holds, i.e. under what conditions is such a map continuous, has a long history. Our main result is that any non-trivial product function, i.e. one having at least two non-constant factors, that has connected domain, T1T_1 range, and is connectedness-preserving must actually be continuous. The analogous statement badly fails if we replace in it the occurrences of "connected" by "compact". We also present, however, several interesting results and examples concerning maps that are compactness-preserving and/or continuum-preserving.

Keywords

Cite

@article{arxiv.1801.06212,
  title  = {On maps preserving connectedness and /or compactness},
  author = {I. Juhász and J. van Mill},
  journal= {arXiv preprint arXiv:1801.06212},
  year   = {2018}
}

Comments

8 pages

R2 v1 2026-06-22T23:49:17.124Z