Maximal (sequentially) compact topologies
نویسندگان
چکیده
We revisit the known problem whether each compact topology is contained in a maximal compact topology and collect some partial answers to this question. For instance we show that each compact topology is contained in a compact topology in which convergent sequences have unique limits. We also answer a question of D.E. Cameron by showing that each sequentially compact topology is contained in a maximal sequentially compact topology. We finally observe that each sober compact T1-topology is contained in a maximal compact topology and that each sober compact T1-topology which is locally compact or sequential is the infimum of a family of maximal compact topologies.
منابع مشابه
The Construction of Finer Compact Topologies (extended Abstract of Talk Presented at the Dagstuhl Seminar 04351) Hans-peter A. Künzi (joint Work with Dominic Van Der Zypen)
Definition 1 (compare [2,5,8]) A topological space is called a KC-space provided that each compact set is closed. A topological space is called a U S-space provided that each convergent sequence has a unique limit. Remark 1 Each Hausdorff space (= T 2-space) is a KC-space, each KC-space is a U S-space and each U S-space is a T 1-space (that is, singletons are closed); and no converse implicatio...
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