Properties of the class of measure separable compact spaces

Džamonja, Mirna; Kunen, Kenneth

Fundamenta Mathematicae, Tome 146 (1995), p. 261-277 / Harvested from The Polish Digital Mathematics Library

Résumé

We investigate properties of the class of compact spaces on which every regular Borel measure is separable. This class will be referred to as MS. We discuss some closure properties of MS, and show that some simply defined compact spaces, such as compact ordered spaces or compact scattered spaces, are in MS. Most of the basic theory for regular measures is true just in ZFC. On the other hand, the existence of a compact ordered scattered space which carries a non-separable (non-regular) Borel measure is equivalent to the existence of a real-valued measurable cardinal ≤ $c$ . We show that not being in MS is preserved by all forcing extensions which do not collapse $ω_{1}$ , while being in MS can be destroyed even by a ccc forcing.

Publié le : 1995-01-01

Zbl 1068.28502

EUDML-ID : urn:eudml:doc:212088

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     author = {Mirna D\v zamonja and Kenneth Kunen},
     title = {Properties of the class of measure separable compact spaces},
     journal = {Fundamenta Mathematicae},
     volume = {146},
     year = {1995},
     pages = {261-277},
     zbl = {1068.28502},
     language = {en},
     url = {http://dml.mathdoc.fr/item/bwmeta1.element.bwnjournal-article-fmv147i3p261bwm}
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Džamonja, Mirna; Kunen, Kenneth. Properties of the class of measure separable compact spaces. Fundamenta Mathematicae, Tome 146 (1995) pp. 261-277. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-fmv147i3p261bwm/

Bibliographie

[00000] [1] I. Bandlow, On the origin of new compact spaces in forcing models, Math. Nachr. 139 (1988), 185-191. | Zbl 0694.54006

[00001] [2] M. Džamonja and K. Kunen, Measures on compact HS spaces, Fund. Math. 143 (1993), 41-54. | Zbl 0805.28008

[00002] [3] D. Fremlin, Consequences of Martin's Axiom, Cambridge Univ. Press, 1984. | Zbl 0551.03033

[00003] [4] D. Fremlin, Real-valued measurable cardinals, in: Israel Math. Conf. Proceedings, Haim Judah (ed.), Vol. 6, 1993, 151-304. | Zbl 0839.03038

[00004] [5] R. J. Gardner and W. F. Pfeffer, Borel measures, in: Handbook of Set-Theoretic Topology, K. Kunen and J. E. Vaughan (ed.), North-Holland, 1984, 961-1044.

[00005] [6] M. Gitik and S. Shelah, Forcings with ideals and simple forcing notions, Israel J. Math. 68 (1989), 129-160. | Zbl 0686.03027

[00006] [7] M. Gitik and S. Shelah, More on simple forcing notions and forcings with ideals, Ann. Pure Appl. Logic 59 (1993), 219-238. | Zbl 0779.03019

[00007] [8] P. Halmos, Measure Theory, Van Nostrand, 1950.

[00008] [9] R. Haydon, On dual $L^{1}$ -spaces and injective bidual Banach spaces, Israel J. Math. 31 (1978), 142-152. | Zbl 0407.46018

[00009] [10] J. Henry, Prolongement des mesures de Radon, Ann. Inst. Fourier 19 (1969), 237-247. | Zbl 0165.16002

[00010] [11] K. Kunen, A compact L-space under CH, Topology Appl. 12 (1981), 283-287.

[00011] [12] K. Kunen and J. van Mill, Measures on Corson compact spaces, Fund. Math. this volume, 61-72. | Zbl 0834.54014

[00012] [13] D. Maharam, On homogeneous measure algebras, Proc. Nat. Acad. Sci. U.S.A. 28 (1942), 108-111. | Zbl 0063.03723

[00013] [14] H. P. Rosenthal, On injective Banach spaces and the spaces $L^{\infty} (μ)$ for finite measures μ, Acta Math. 124 (1970), 205-248. | Zbl 0207.42803