Proceedings of the American Mathematical Society

Author(s): Alexander Arhangel'skii
Journal: Proc. Amer. Math. Soc. 132 (2004), 2163-2170.
MSC (2000): Primary 54D20; Secondary 54F99
Posted: February 9, 2004
Retrieve article in: PDF

Abstract: This article is a continuation of a recent paper by the author and R. Z. Buzyakova. New results are obtained in the direction of the next natural question: how complex can a space be that is the union of two (of a finite family) ``nice" subspaces? Our approach is based on the notion of a

-space introduced by E. van Douwen and on a generalization of this notion, the notion of

-space. It is proved that if a space

is the union of a finite family of subparacompact subspaces, then

is an

-space. Under

, it follows that if a separable normal

-space

is the union of a finite number of subparacompact subspaces, then

is Lindelöf. It is also established that if a regular space

is the union of a finite family of subspaces with a point-countable base, then

is a

-space. Finally, a certain structure theorem for unions of finite families of spaces with a point-countable base is established, and numerous corollaries are derived from it. Also, many new open problems are formulated.

1.: A. V. Arhangel'skii, -spaces and covering properties. Submitted, 2002.
2.: A. V. Arhangel'skii and R. Z. Buzyakova, Addition theorems and -spaces. Comment. Math. Univ. Carolinae 43,4 (2002), 653-663.
3.: C. R. Borges and A. C. Wehrly, A study of -spaces. Topology Proc. 16 (1991), 7-15. MR 94a:54059
4.: D. K. Burke, A note on R. H. Bing's example G. In: Proc. V.P.I. Topology Conference, Lecture Notes in Math., vol. 375, Springer-Verlag, Berlin, 1974, pp. 47-52. MR 51:11426
5.: D. K. Burke, Covering properties. In: K. Kunen and J. Vaughan, Eds., Handbook of Set-theoretic Topology, Chapter 9, 347-422. North-Holland, Amsterdam, New York, Oxford, 1984. MR 86e:54030
6.: R. Z. Buzyakova, On -property of strong $\Sigma$ -spaces. Comment. Math. Universitatis Carolinae 43 (2002), 493-495. MR 2003j:54021
7.: J. Chaber, Metacompactness and the class MOBI. Fund. Math. 91 (1976), 211-217. MR 54:3646
8.: E. K. van Douwen and W. F. Pfeffer, Some properties of the Sorgenfrey line and related spaces. Pacific J. Math. 81:2 (1979), 371-377. MR 80h:54027
9.: E. K. van Douwen and H. H. Wicke, A real, weird topology on reals. Houston Journal of Mathematics 13:1 (1977), 141-152. MR 55:6390
10.: R. Engelking, General Topology. Polish Scientific Publishers, Warsaw, 1977. MR 58:18316b
11.: M. Ismail and A. Szymanski, On locally compact Hausdorff spaces with finite metrizability number. Topology Appl. 114:3 (2001), 285-293. MR 2002f:54003
12.: E. Michael and M. E. Rudin, Another note on Eberlein compacts. Pacific J. Math. 72 (1977), 497-499. MR 57:17584b
13.: A. J. Ostaszewski, Compact $\sigma$ -metric spaces are sequential. Proc. Amer. Math. Soc. 68 (1978), 339-343. MR 57:7532
14.: M. E. Rudin, Dowker spaces. In: K. Kunen and J. Vaughan, Eds., Handbook of Set-theoretic Topology, Chapter 17, 761-780. North-Holland, Amsterdam, New York, Oxford, 1984. MR 86c:54018
15.: H. H. Wicke and J. M. Worrell, Jr., Point-countability and compactness. Proc. Amer. Math. Soc. 55 (1976), 427-431. MR 53:4001

Retrieve articles in Proceedings of the American Mathematical Society with MSC (2000): 54D20, 54F99

			Journals Home Search Author Info Subscribe Tech Support Help
ISSN 1088-6826 (e) ISSN 0002-9939 (p)

Previous issue \| Table of contents \| Next issue Articles in press \| Recently posted articles \| Most recent issue \| All issues Previous Article \| Next Article


	Comments: webmaster@ams.org © Copyright 2009, American Mathematical Society Privacy Statement		Search the AMS