Article
Keywords:
first-countable; Fréchet-Urysohn; countably compact; closure-sensor; topological group; strong FU-sensor; pseudoopen mapping; side-base; $\omega $-Fréchet-Urysohn space
Summary:
Some strong versions of the Fréchet-Urysohn property are introduced and studied. We also strengthen the concept of countable tightness and generalize the notions of first-countability and countable base. A construction of a topological space is described which results, in particular, in a Tychonoff countable Fréchet-Urysohn space which is not first-countable at any point. It is shown that this space can be represented as the image of a countable metrizable space under a continuous pseudoopen mapping. On the other hand, if a topological group $G$ is an image of a separable metrizable space under a pseudoopen continuous mapping, then $G$ is metrizable (Theorem 5.6). Several other applications of the techniques developed below to the study of pseudoopen mappings and intersections of topologies are given (see Theorem 5.17).
References:
[2] Arhangel'skii A.V.:
Hurewicz spaces, analytic sets, and fan-tightness of function spaces. Dokl. Akad. Nauk SSSR 287:3 (1986), 525–528; English translation: Soviet Math. Dokl. 33:2 (1986), 396–399.
MR 0837289
[3] Arhangel'skii A.V., Bella A.:
Countable fan-tightness versus countable tightness. Comment. Math. Univ. Carolin. 37:3 (1996), 565–576.
MR 1426921
[4] Arhangel'skii A.V. Ponomarev V.I.:
Fundamentals of General Topology in Problems and Exercises. Izdat. “Nauka”, Moscow, 1974, 423 pp. (in Russian); English translation: ser. Mathematics and its Applications, D. Reidel Publishing Co., Dordrecht-Boston, Mass., 1984. xvi+415 pp.; Polish translation: Panstwowe Wydawnictwo Naukowe (PWN), Warsaw, 1986. 456 pp.
MR 0785749
[5] Arhangel'skii A.V. Tkachenko M.G.:
Topological Groups and Related Structures. Atlantis Press, Amsterdam-Paris, 2008.
MR 2433295
[6] Engelking R.:
General Topology. Sigma Series in Pure Mathematics, 6, Heldermann, Berlin, revised ed., 1989.
MR 1039321 |
Zbl 0684.54001