No CrossRef data available.
Article contents
Characterizing Continua by Disconnection Properties
Published online by Cambridge University Press: 20 November 2018
Abstract
Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.
We study Hausdorff continua in which every set of certain cardinality contains a subset which disconnects the space. We show that such continua are rim-finite. We give characterizations of this class among metric continua. As an application of our methods, we show that continua in which each countably infinite set disconnects are generalized graphs. This extends a result of Nadler for metric continua.
- Type
- Research Article
- Information
- Copyright
- Copyright © Canadian Mathematical Society 1998
References
[Be]
Bellamy, David P., Composants of Hausdorff indecomposable continua; a mapping approach. Pacific J. Math. (2) 47 (1973), 303–309.Google Scholar
[Bi]
Bing, R. H., The Kline sphere characterization problem. Bull. Amer.Math. Soc. 52 (1946), 644–653.Google Scholar
[Gl]
Gladdines, Helma, A connected metrizable space with disconnection number @0. Preprint.Google Scholar
[Gor]
Gordh, G. R. Jr., Monotone decompositions of irreducible Hausdorff continua Pacific J. Math. (3) 36 (1971), 647–658.Google Scholar
[GNST]
Grispolakis, J., Nikiel, J., Simone, J. N. and Tymchatyn, E. D., Separators in continuous images of ordered continua and hereditarily locally connected continua. Can. Math. Bull. (2) 36 (1993), 154–163.Google Scholar
[Ja]
Janiszewski, S., Sur les continus irréductibles entre deux points. J. l’´Ecole Polytechnique (2) 16 (1912), 76–170.Google Scholar
[Ma]
Martin, Joseph M., Homogeneous countable connected Hausdorff spaces. Proc. Amer. Math. Soc. 12 (1961), 308–314.Google Scholar
[Na1]
Nadler, Sam B. Jr., Continuum theory: An introduction. Marcel Dekker Inc., New York, 1992.Google Scholar
[Na2]
Nadler, Sam B. Jr., Continuum theory and graph theory: disconnection numbers. J. London Math. Soc. (2) 47 (1993), 167–181.Google Scholar
[Ni1]
Nikiel, J., Images of arcs—a nonseparable version of the Hahn-Mazurkiewicz theorem. Fund. Math. 129 (1988), 91–120.Google Scholar
[Ni2]
Nikiel, J., The Hahn-Mazurkiewicz theorem for hereditarily locally connected continua. Topology Appl. 32 (1989), 307–323.Google Scholar
[NTT]
Nikiel, J., Tuncali, H. M. and Tymchatyn, E. D., Continuous images of arcs and inverse limit methods. Mem. Amer. Math. Soc. 498 (1993).Google Scholar
[Pi]
Pierce, Robert, An example concerning disconnection numbers. In: Continuum theory and dynamical systems (Ed. T. West). Lecture Notes in Pure and Appl. Math. 149 (1993), 261–262.Google Scholar
[Sh]
Shimrat, M., Simply Disconnectible Sets. Proc. London Math. Soc. (3) 9 (1959), 177–188.Google Scholar
[Si]
Simone, Joseph N., Concerning hereditarily locally connected continua. Colloq. Math. (2) 39 (1978), 243–251.Google Scholar
[St]
Stone, A. H., Disconnectible spaces. Topology Conference (Ed. E. E. Grace), Arizona State Univ., 1967, 265–276.Google Scholar
[Tym]
Tymchatyn, E. D., Compactification of hereditarily locally connected spaces. Can. J.Math. (6) 29 (1977), 1223–1229.Google Scholar
[Wa]
Ward, A. J., The topological characterization of an open linear interval. Proc. London Math. Soc. (2) 41 (1936), 191–198.Google Scholar
[Wh]
Whyburn, G. T., Analytic topology. Amer. Math. Soc. Colloq. Publ. 28. Amer. Math. Soc., Providence, RI, 1942.Google Scholar
[Yan]
Yang, Chang-Cheng, Characterizing spaces by disconnection properties. Ph.D. thesis, University of Saskatchewan, 1997.Google Scholar
You have
Access