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Cantor manifold

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An -dimensional compact space , , in which any partition between non-empty sets has dimension . An equivalent definition is: An -dimensional Cantor manifold is an -dimensional compact space such that for each representation of as the union of two non-empty closed proper subsets and , . One-dimensional metrizable Cantor manifolds are one-dimensional continua or Cantor curves (cf. Cantor curve).

The concept of a Cantor manifold was introduced by P.S. Urysohn (see [1]). An -dimensional closed ball, and therefore an -dimensional closed manifold, are Cantor manifolds; -dimensional Euclidean space cannot be partitioned by a set of dimension (for , this is Urysohn's theorem, for , Aleksandrov's theorem). An -dimensional Cantor manifold is the common boundary of two regions of -dimensional Euclidean space, one of which is bounded (Aleksandrov's theorem). The main fact in the theory of Cantor manifolds is that every -dimensional compact space contains an -dimensional Cantor manifold (Aleksandrov's theorem).

A maximal -dimensional Cantor manifold in an -dimensional compact space is called a dimensional component of . An -dimensional Cantor submanifold of a compact Hausdorff space is contained in a unique dimensional component of . The intersection of two distinct dimensional components of an -dimensional compact Hausdorff space has dimension . In particular, dimensional components of a one-dimensional compact Hausdorff space are components of it. The set of dimensional components of a finite-dimensional compact metric space is finite, countable or has the cardinality of the continuum. If is an arbitrary dimensional component of a perfectly-normal compact space and is the union of all remaining dimensional components, then (Aleksandrov's theorem). In a hereditarily-normal first-countable compact Hausdorff space, a dimensional component may be contained in the union of the remaining dimensional components.

The union of all dimensional components of an -dimensional compact space is called the interior dimensional kernel of the space. In view of the monotonicity of dimension, it is always true that and when is a perfectly-normal compact space. The set contains no -dimensional compact set. But even for Hausdorff compacta it is not known (1978) whether . With regard to hereditarily-normal compact spaces, the interior dimensional kernel and its complement can have all permissible dimensions; that is to say, assuming the validity of the continuum hypothesis, for any triple of integers , and with , and , there exists a hereditarily-normal compact space of dimension such that and .

If , then (as defined by Urysohn) is the inductive dimensional kernel, that is, the set of all for which . The inductive dimensional kernel of a compact metric set is always an set. It is not known whether the same holds for the interior dimensional kernel. For compact Hausdorff spaces however, neither the inductive dimensional kernel nor the interior dimensional kernel need be an set. At each point ,

if is compact metric (Menger's theorem). Therefore for an arbitrary compact metric space , is everywhere dense in . This does not carry over to arbitrary compact Hausdorff spaces. It remains an open question (1978) whether a point is contained in the inductive dimensional kernel along with some non-degenerate continuum.

A finite-dimensional continuum whose interior dimensional kernel is everywhere dense in is called a generalized Cantor manifold. The common boundary of two open subsets of -dimensional Euclidean space is an -dimensional generalized Cantor manifold. In a metrizable -dimensional generalized Cantor manifold there may be an everywhere-dense set of points for which . Neither products nor continuous mappings preserve the property of being a generalized Cantor manifold. The same is true concerning the property of being a Cantor manifold.

A compact space is called an infinite-dimensional Cantor manifold if there is no method of partitioning it by a weakly infinite-dimensional closed subset.

References

[1] P.S. Urysohn, "Works on topology and other areas of mathematics" , 1 , Moscow-Leningrad (1951) (In Russian)
[2] P [P.S. Aleksandrov] Alexandroff, "Untersuchungen über Gestalt und lage abqeschlossener Menge beliebiqer Dimension" Ann. of Math. , 30 (1929) pp. 101–187
[3] P.S. Aleksandrov, "On the dimension of normal spaces" Proc. Royal. Soc. London Ser. A , 189 (1947) pp. 11–39
[4] P.S. Aleksandrov, B.A. Pasynkov, "Introduction to dimension theory" , Moscow (1973) (In Russian)
[5] V.V. Fedorchuk, "On dimensional components of compact spaces" Soviet Math. Dokl. , 15 : 2 (1974) pp. 505–509 Dokl. Akad. Nauk SSSR , 215 : 2 (1974) pp. 289–292
[6] K. Menger, "Dimensiontheorie" , Teubner (1928)
[7] E.G. Sklyarenko, "Dimensionality properties of infinite-dimensional spaces" Izv. Akad. Nauk SSSR Ser. Mat. , 23 : 2 (1959) pp. 197–212 (In Russian)


Comments

The theorems attributed to Aleksandrov are not only due to him: The theorem on partitions of -dimensional Euclidean space is attributed to K. Menger [a5] and Urysohn [a1] and [a2].

The Cantor manifold theorem for compact metric spaces is due to W. Hurewicz and Menger [a3] and L.A. Tumarkin [a6]. Aleksandrov generalized it to arbitrary compact Hausdorff spaces in [3]. Finally, the theorem on intersections of dimensional components was proved by S. Mazurkiewicz in [a4] for compact metric spaces, Aleksandrov generalized it to perfectly-normal compact spaces.

It is not true that every infinite-dimensional compact space contains an infinite-dimensional Cantor manifold, as there are many compact metric weakly infinite-dimensional spaces, e.g. the one-point compactification of the topological sum of cubes of increasing dimension.

References

[a1] P.S. Urysohn, "Mémoire sur les multiplicités cantoriennes" Fund. Math. , 7 (1925) pp. 30–137
[a2] R. Engelking, "Dimension theory" , North-Holland & PWN (1978) pp. 19; 50
[a3] W. Hurewicz, K. Menger, "Dimension and Zusammenhangsstuffe" Math. Ann. , 100 (1928) pp. 618–633
[a4] S. Mazurkiewicz, "Ein Satz über dimensionelle Komponenten" Fund. Math. , 20 (1933) pp. 98–99
[a5] K. Menger, "Über die dimension von Punktmengen II" Monatsh. für Math. and Phys. , 34 (1926) pp. 137–161
[a6] L.A. Tumarkin, "Sur la structure dimensionelle des ensembles fermés" C.R. Acad. Paris , 186 (1928) pp. 420–422
How to Cite This Entry:
Cantor manifold. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Cantor_manifold&oldid=14407
This article was adapted from an original article by V.V. Fedorchuk (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article