English

Locally closed sets and submaximal spaces

General Topology 2022-05-17 v1

Abstract

A topological space XX is called submaximal if every dense subset of XX is open. In this paper, we show that if βX\beta X, the Stone-\v{C}ech compactification of XX, is a submaximal space, then XX is a compact space and hence βX=X\beta X=X. We also prove that if υX\upsilon X, the Hewitt realcompactification of XX, is submaximal and first countable and XX is without isolated point, then XX is realcompact and hence υX=X\upsilon X=X. We observe that every submaximal Hausdorff space is pseudo-finite. It turns out that if υX\upsilon X is a submaximal space, then XX is a pseudo-finite μ\mu-compact space. An example is given which shows that XX may be submaximal but υX\upsilon X may not be submaximal. Given a topological space (X,T)(X,{\mathcal T}), the collection of all locally closed subsets of XX forms a base for a topology on XX which is denotes by Tl{\mathcal T_l}. We study some topological properties between (X,T)(X,{\mathcal T}) and (X,Tl)(X,{\mathcal T_l}), such as we show that a) (X,Tl)(X,{\mathcal T_l}) is discrete if and only if (X,T)(X,{\mathcal T}) is a TDT_D-space; b) (X,T)(X,{\mathcal T}) is a locally indiscrete space if and only if T=Tl{\mathcal T}={\mathcal T_l}; c) (X,T)(X,{\mathcal T}) is indiscrete space if and only if (X,Tl)(X,{\mathcal T_l}) is connected. We see that, in locally indiscrete spaces, the concepts of T0T_0, TDT_D, T12T_\frac{1}{2}, T1T_1, submaximal and discrete coincide. Finally, we prove that every clopen subspace of an lc-compact space is lc-compact.

Keywords

Cite

@article{arxiv.2205.07191,
  title  = {Locally closed sets and submaximal spaces},
  author = {Rostam Mohamadian},
  journal= {arXiv preprint arXiv:2205.07191},
  year   = {2022}
}
R2 v1 2026-06-24T11:17:35.759Z