Publication detail

The compactificability of certain spaces

Kovar, Martin Maria

Original Title

The compactificability of certain spaces

English Title

The compactificability of certain spaces

Type

journal article - other

Language

en

Original Abstract

We apply the theory of the mutual compactificability to some spaces, mostly derived from the real line. For example, any noncompact locally connected metrizable generalized continuum, the Tichonov cube without its zero point as well as the Cantor discontinuum without its zero point are of the same class of mutual compactificability as R.

English abstract

We apply the theory of the mutual compactificability to some spaces, mostly derived from the real line. For example, any noncompact locally connected metrizable generalized continuum, the Tichonov cube without its zero point as well as the Cantor discontinuum without its zero point are of the same class of mutual compactificability as R.

Keywords

classes of mutual compactificability, theta-regular spaces

RIV year

2006

Released

22.12.2006

Pages from

1

Pages to

17

Pages count

17

BibTex


@article{BUT43778,
  author="Martin {Kovár}",
  title="The compactificability of certain spaces",
  annote="We apply the theory of the mutual compactificability to some spaces, mostly derived from the real line. For example, any noncompact locally connected metrizable generalized continuum, the Tichonov cube without its zero point as well as the Cantor discontinuum
without its zero point  are of the same class of mutual compactificability as R.",
  chapter="43778",
  journal="International Journal of Mathematics and Mathematical Sciences",
  number="Article ID 67083",
  volume="2006",
  year="2006",
  month="december",
  pages="1--17",
  type="journal article - other"
}