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Irreducible continua and generalization of hereditarily unicoherent continua by means of membranes

Published online by Cambridge University Press:  09 April 2009

R. F. Dickman ,
L. R. Rubin  and
P. M. Swingle
R. F. Dickman
Affiliation:
The University of Miami
L. R. Rubin
Affiliation:
The University of Miami
P. M. Swingle
Affiliation:
The University of Miami
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In [2] we defined an irreducible B(J)-cartesian membrane, and used this to obtain a characterization of an n-sphere by generalizing the definition of simple closed curve given by Theorem 1.2 below. There B(J) is a class A(n) of (n−1)-spheres, but here it is a class of mutually homeomorphic continua. In Theorem 1.1 we give a definition of hereditarily unicoherent continua and generalize this in Section 3 by means of B(J)-cartesian membranes. To do this we paraphrase by a translation some of Wilder's work in [7]. In his Unified Topology [8: p. 674] he gives a principle: “The connectedness of a domain is a special case of the bounding properties of its i-cycles”. We substitute the element J of B(J) for the i-cycle and for “bound” we substitute that “J membrane-bases an irreducible B(J)-cartesian membrane. The very nature of an i-cycle seems to limit the complexity of the point set studied, although the restriction to “nice” manifolds is due partly to the difficulty of the subject matter treated. There are similar difficulties here, but also advantages, in the very general set-theoretic approach by means of B(J)-membranes.

Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 5 , Issue 4 , November 1965 , pp. 416 - 426
Copyright
Copyright © Australian Mathematical Society 1965

References

[1]Davis, H. S., Stadtlander, D. P. and Swingle, P. M., Semigroups, continua and the set function Tn, Duke Math. J. 29 (1962), 265280.CrossRefGoogle Scholar
[2]Dickman, R. F., Rubin, L. R. and Swingle, P. M., Characterization of n-spheres by an excluded middle membrane principle, Michigan Math. J. 11 (1964), 5359.CrossRefGoogle Scholar
[3]Hocking, J. C. and Young, G. S., Topology (1961), Reading, Mass.Google Scholar
[4]Hunter, R. P., On the semigroup structure of continua, Trans. Amer. Math. Soc. 93 (1959), 356368.CrossRefGoogle Scholar
[5]Hunter, R. P., Note on semigroups, Fund. Math. 49 (1961), 233245.CrossRefGoogle Scholar
[6]Moore, R. L., Foundations of point set theory, Amer. Math. Soc. Colloquium Publication 13 (1962 revision).Google Scholar
[7]Wilder, R. L., Topology of manifolds, Amer. Math. Soc. Colloquium Publication 32 (1948).Google Scholar
[8]Wilder, R. L., Point sets in three and higher dimensions and their investigation by means of a unified analysis situs, Bull. Amer. Math. Soc. 38 (1932), 649692.CrossRefGoogle Scholar
[9]Whyburn, G. T., Analytic topology, Amer. Math. Soc. Colloquium Publication 28 (1942).CrossRefGoogle Scholar
[10]Swingle, P. M., Connected sets of Wada, Michigan Math. J. 8 (1961), 7795.CrossRefGoogle Scholar