OPEN PROBLEMS IN TOPOLOGY

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32 Tall / Tall’s Questions [ch. 3ReferencesAbraham, U.[1983] Aronszajn trees on ℵ 2 and ℵ 3. Ann. Pure Appl. Logic, 24, 213–230.Alster, K. and P. Zenor.[1976] On the collectionwise normality of generalized manifolds. Top. Proc., 1,125–127.Balogh, Z.[19∞] On collectionwise normality of locally compact, normal spaces. Trans.Amer. Math. Soc. to appear.Bing, R. H.[1951] Metrization of topological spaces. Can. J. Math., 3, 175–186.Daniels, P.[1983] Normal, locally compact, boundedly metacompact spaces areparacompact: an application of Pixley-Roy spaces. Can. J. Math., 35,827–833.[1988] A first countable, weakly ω 1-CWH space, not weakly ω 2-CWH space. Q& A in Gen. Top., 6, 129–134.[19∞] Normal, k ′ -spaces are consistently collectionwise normal. preprint.Daniels, P. and G. Gruenhage.[1985] A perfectly normal, locally compact, non-collectionwise normal spaceunder ¦ ∗ . Proc.Amer.Math.Soc., 95, 115–118.Devlin, K. and S. Shelah.[1979] A note on the normal Moore space conjecture. Can. J. Math., 31,241–251.van Douwen, E. K.[1977] The Pixley-Roy topology on spaces of subsets. In Set-TheoreticTopology, G. M. Reed, editor, pages 111–134. Academic Press, NewYork.vanDouwen,E.K.,F.D.Tall,and W. A. R. Weiss.[1977] Non-metrizable hereditarily lindelöf spaces with point-countable basesfrom CH. Proc.Amer.Math.Soc., 64, 139–145.Dow, A.[19∞]An introduction to applications of elementary submodels in topology.Top. Proc. to appear.Dow,A.,F.D.Tall,and W. A. R. Weiss.[19∞a] New proofs of the consistency of the normal Moore space conjecture II.Top. Appl. to appear.[19∞b] New proofs of the consistency of the normal Moore space conjecture I.Top. Appl. to appear.Efimov, B.[1969] Solutions of some problems on dyadic bicompacta. Soviet Math.Doklady, 10, 776–779.
References 33Fleissner, W. G.[1974] Normal Moore spaces in the constructible universe. Proc. Amer. Math.Soc., 46, 294–298.[1982] If all normal Moore spaces are metrizable, then there is an inner modelwith a measurable cardinal. Trans. Amer. Math. Soc., 273, 365–373.[1983] Discrete sets of singular cardinality. Proc. Amer. Math. Soc., 88,743–745.[1984] The Normal Moore space conjecture and large cardinals. In Handbookof Set-Theoretic Topology, K. Kunen and J. E. Vaughan, editors,chapter 16, pages 733–760. North-Holland, Amsterdam.Fleissner, W. G. and S. Shelah.[19∞] Collectionwise Hausdorff: incompactness at singulars. Top. Appl. toappear.Hajnal, A. and I. Juhasz.[1976] On spaces in which every small subspace is metrizable. Bull. Polon.Acad. Sci. Sér. Math. Astronom. Phys., 24, 727–731.Jech, T. and K. Prikry.[1984] Cofinality of the partial ordering of functions from ω 1 into ω undereventual domination. Math. Proc. Cambridge Phil. Soc., 95, 25–32.Kurepa, D.[1967] Dendrity of spaces of ordered sets. Glas. Mat., 2(22), 145–162.Mitchell, W. J.[1972] Aronszajn trees and the independence of the transfer property. Ann.Math. Logic, 5, 21–46.Navy, C. L.[19∞] Para-Lindelöf versus paracompact. preprint.Nyikos,P.J.[1982] A provisional solution to the normal Moore space conjecture. Proc.Amer. Math. Soc., 78, 429–435.[1983] Set-theoretic topology of manifolds. In Proceedings of the Fifth PragueTopological Symposium, pages 513–526. Heldermann Verlag, Praha.Przymusinski, T.[1984] Products of normal spaces. In Handbook of Set-Theoretic Topology, K.Kunen and J. E. Vaughan, editors, chapter 18, pages 781–826.North-Holland, Amsterdam.Roitman, J.[1984] Basic S and L. In Handbook of Set-Theoretic Topology, K. Kunen andJ. E. Vaughan, editors, chapter 7, pages 295–326. North-Holland,Amsterdam.Rudin, M. E. E.[1952] Concerning a problem of Souslin’s. Duke Math. J., 19, 629–640.Rudin, M. E.[1983] Collectionwise normality in screenable spaces. Proc.Amer.Math.Soc.,87, 347–350.[19∞] Two non-metrizable manifolds. Houston J. Math. to appear.
Page 1: OPEN PROBLEMSIN TOPOLOGYEdited byJa
Page 4 and 5: viIntroductionThe editors would lik
Page 6 and 7: viiiContents10. Homeomorphisms . .
Page 8 and 9: xContentsSome Open Problems in Dens
Page 10 and 11: xiiContentsConclusion and Open Prob
Page 12 and 13: xivContents5. Borel Selectors and M
Page 14 and 15: Toronto ProblemsAlan Dow 1Juris Ste
Page 16 and 17: Question 1. Is there a ccc non-pseu
Page 18 and 19: ch. 1] Dow / Dow’s Questions 9Thi
Page 20 and 21: References 11[1990] The space of mi
Page 22 and 23: 1. The Toronto ProblemWhat has come
Page 24 and 25: §3] Autohomeomorphisms of the Čec
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Page 28 and 29: Open Problems in TopologyJ. van Mil
Page 30 and 31: 24 Tall / Tall’s Questions [ch. 3
Page 42 and 43: Open Problems in TopologyJ. van Mil
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Open Problems in TopologyJ. van Mil
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88 Gruenhage / Perfectly normal com
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100 Hart and van Mill / βω [ch. 7
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166 Reed / Moore Spaces [ch. 9? 298
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168 Reed / Moore Spaces [ch. 9? 302
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170 Reed / Moore Spaces [ch. 9Reed
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172 Reed / Moore Spaces [ch. 9An ex
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174 Reed / Moore Spaces [ch. 96. Th
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176 Reed / Moore Spaces [ch. 98. Re
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178 Reed / Moore Spaces [ch. 9van D
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180 Reed / Moore Spaces [ch. 9[1975
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186 Rudin / Some Conjectures [ch. 1
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198 Vaughan / Small Cardinals [ch.
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224 Bennett and Chaber / The Class
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234 Bennett and Lutzer / Perfect Or
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236 Bennett and Lutzer / Perfect Or
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IntroductionIt is the purpose of th
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§1] Origins 241Then there is a met
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§2] The point-countable base probl
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§2] The point-countable base probl
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§3] Postscript: a general structur
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References 249However, we do not kn
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254 Fitzpatrick and Zhou / Densely
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264 Kunen / Large Homogeneous Compa
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0. IntroductionThis note collects s
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§3] Continuous selections 2752.3.
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References 277metric satisfying bot
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282 Pol / Dimension Theory [ch. 18T
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284 Pol / Dimension Theory [ch. 18W
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286 Pol / Dimension Theory [ch. 18I
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288 Pol / Dimension Theory [ch. 181
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290 Pol / Dimension Theory [ch. 18G
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Part IIIContinua TheoryContents:Ele
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Most of the topics related to conti
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ch. 19] Cook, Ingram and Lelek / Co
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References 301questions related to
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306 Rogers / Tree-like curves [ch.
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316 Comfort / Topological Groups [c
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352 Lawson and Mislove / Domain The
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378 Kong et al / Binary Digital Ima
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390 Meyer and de Vink / Semantics [
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412 Dobrowolski and Mogilski / Inco
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434 Daverman / Finite-dimensional m
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460 Dydak and Segal / Shape Theory
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472 Carlsson / Algebraic Topology [
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0. IntroductionThis paper is an int
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§1] Reidemeister Moves, Special Mo
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§2] Knotted Strings? 493embedding
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§3] Detecting Knottedness 495(Thus
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§4] Knots and Four Colors 4974. Kn
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§5] The Potts Model 499 GK(G)Figu
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§6] States, Crystals and the Funda
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§7] Vacuum-Vacuum Expectation and
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§8] Spin-Networks and Abstract Ten
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§9] Colors Again 5119.1. Theorem (
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§9] Colors Again 513At an edge in
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§10] Formations 515Ì ÍFigure 9:
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§11] Mirror-Mirror 517−−−→
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References 519Burgoyne, P. N.[1963]
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References 521Kirby, R.[1978] A cal
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526 West / Infinite Dimensional Top
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Part VIITopology Arising from Analy
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By a space we mean a Tikhonov topol
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ch. 31] Arkhangel ′ ski / C p -th
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References 613ReferencesArkhangel
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References 615Sokolov, G. A.[1986]
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1. Topologically Equivalent Measure
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§2] Two-Point Sets 621Brouwer’s
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§4] Finite Shift Maximal Sequences
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§6] Dynamical Systems on S 1 × R
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References 6277. Borel Cross-Sectio
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References 629Navarro-Bermudez, F.
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636 Barge and Kennedy / Continua an
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In this note I want to pose some qu
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§2] The boundary of ‘chaos’ 64
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§4] Homeomorphisms of the plane 65
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References 653Boyland, P.[1987] Bra
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Index of general termsThe index is
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Index of general terms 657bordism,
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Index of general terms 659continuou
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Index of general terms 661free surf
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Index of general terms 663linear sp
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Index of general terms 665Pacman, 1
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Index of general terms 667sequentia
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Index of general terms 669paracompa
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Index of general terms 671unconditi
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674 Index of problem termscharacter
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676 Index of problem termshereditar
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678 Index of problem termssimple, 4
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680 Index of problem termscontracti
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682 Index of problem termsLC 1 comp
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684 Index of problem termsproduct w
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686 Index of problem termsPL standa
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688 Index of problem termsstrongly
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690 Index of problem termsU α-univ
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692 Index of problem termson uncoun
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