Two More Hereditarily Separable Non-Lindelöf Spaces

I. Juhász; K. Kunen; M. E. Rudin

doi:10.4153/CJM-1976-098-8

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Our method using CH is a blend of two earlier constructions (Hajnal-Juhász [2] and Ostaszewski [4]) of hereditarily separable (HS), regular, non-Lindelöf, first countable spaces. [4] produces a much better space than ours in § 1 ; it has all of our properties except that it is not realcompact (which is probably more interesting), and it is countably compact as well; however, the construction works only under ◇, which implies the continuum hypothesis (CH) but is not equivalent to it.

References

1. Hajnal, A. and I. Juhâsz, On hereditarily a-Lindelof and a-separable spaces, Ann. Univ. Sc. Budapest 11 (1968), 115–124.Google Scholar

2. On first countable non-Lindelôf S-spaces, preprint 57 (1973) of Math. Inst. Hungarian Acad. Sci.Google Scholar

3. Hodel, R., On a theorem of Arhangelskii concerningLindelôf p-spaces, Can. J. Math. 27 (1975), 450–468.Google Scholar

4. Ostaszewski, A., On countably compact, perfectly normal spaces, J. London Math. Soc. (to appear).Google Scholar

5. Pfeffer, W. F., On the regularity of Borel measures, Math. Colloq. U.C.T. 7 (1973), 125–142.Google Scholar

6. Rudin, M. E., A hereditarily separable Dowker space, Symposia Math. (March 1973), Published by Institute Nazionale di Alta Math., Rome.Google Scholar

7. Rudin, M. E., A normal space X such that XXI is not normal, Fund. Math. 78 (1971-72), 179–186.Google Scholar

8. Gillman, L. and Jerison, M., Rings of continuous functions (D. van Nostrand, Princeton, N.J. 1960), Corollary 8.18, p. 122.Google Scholar

Crossref Citations

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Harley, Peter W. and Stephenson, R. M. 1976. Symmetrizable and related spaces. Transactions of the American Mathematical Society, Vol. 219, Issue. 0, p. 89.

Ginsburg, John 1978. L-spaces in complete spaces of countable tightness using ♢. General Topology and its Applications, Vol. 9, Issue. 1, p. 9.

Weiss, W. 1980. A countably paracompact nonnormal space. Proceedings of the American Mathematical Society, Vol. 79, Issue. 3, p. 487.

Rudin, Mary Ellen 1980. Surveys in General Topology. p. 431.

Fleissner, William G. 1980. Surveys in General Topology. p. 163.

Pytkeev, E. G. 1980. Hereditarily plumed spaces. Mathematical Notes of the Academy of Sciences of the USSR, Vol. 28, Issue. 4, p. 761.

van Douwen, Eric K. and Kunen, Kenneth 1982. L-spaces and S-spaces in P(ω). Topology and its Applications, Vol. 14, Issue. 2, p. 143.

Gardner, R. J. 1982. Measure Theory Oberwolfach 1981. Vol. 945, Issue. , p. 42.

Gardner, R. J. and Pfeffer, W. F. 1984. Decomposability of Radon measures. Transactions of the American Mathematical Society, Vol. 283, Issue. 1, p. 283.

GARDNER, R.J. and PFEFFER, W.F. 1984. Handbook of Set-Theoretic Topology. p. 961.

NYIKOS, Peter 1984. Handbook of Set-Theoretic Topology. p. 633.

RUDIN, Mary Ellen 1984. Handbook of Set-Theoretic Topology. p. 761.

HODEL, R. 1984. Handbook of Set-Theoretic Topology. p. 1.

Monk, J. Donald 1984. Orders: Description and Roles - In Set Theory, Lattices, Ordered Groups, Topology, Theory of Models and Relations, Combinatorics, Effectiveness, Social Sciences, Proceedings of the Conference on Ordered Sets and their Application Château dc la Tourcttc; Ordres: Description et Rôles - En Théorie des Treillis, des Groupes Ordonnés; en Topologie, Théorie des Modèles et des Relations, Cornbinatoire, Effectivité, Sciences Sociales, Actes de la Conférence sur ies Ensembles Ordonnés et leur Applications Château de la Tourette. Vol. 99, Issue. , p. 9.

ROITMAN, Judy 1984. Handbook of Set-Theoretic Topology. p. 295.

Bešlagić, Amer and Rudin, Mary Ellen 1985. Set-theoretic constructions of nonshrinking open covers. Topology and its Applications, Vol. 20, Issue. 2, p. 167.

Just, Winfried 1985. Two consistency results concerning thin-tall Boolean algebras. Algebra Universalis, Vol. 20, Issue. 2, p. 135.

Charalambous, M. G. 1985. Spaces with noncoinciding dimensions. Proceedings of the American Mathematical Society, Vol. 94, Issue. 3, p. 507.

Bešlagić, Amer 1985. A Dowker product. Transactions of the American Mathematical Society, Vol. 292, Issue. 2, p. 519.

Daniels, Peg and Gruenhage, Gary 1985. A perfectly normal, locally compact, noncollectionwise normal space from ♢*. Proceedings of the American Mathematical Society, Vol. 95, Issue. 1, p. 115.

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