Abstract
We show in detail that every compact countable subset of a metric space is homeomorphic to a countable ordinal number, which extends a result given by Mazurkiewicz and Sierpinski for finite-dimensional Euclidean spaces. In order to achieve this goal, we use Transfinite Induction to construct a specific homeomorphism. In addition, we prove that for all metric space, the cardinality of the set of all the equivalence classes, up to homeomorphisms, of compact countable subsets of this metric space is less than or equal to aleph-one. We also show that for all cardinal number smaller than or equal to aleph-one, there exists a metric space with cardinality equals the aforementioned cardinal number.
| Original language | English |
|---|---|
| Pages (from-to) | 1-11 |
| Number of pages | 11 |
| Journal | Australian Journal of Mathematical Analysis and Applications |
| Volume | 16 |
| Issue number | 2 |
| State | Published - 11 Nov 2019 |
Bibliographical note
Publisher Copyright:© 2019 Austral Internet Publishing.
Keywords
- Cantor-Bendixson's derivative
- Ordinal numbers
- Ordinal topology