Annales Academiæ Scientiarum Fennicæ
Mathematica
Volumen 39, 2014, 733-758
Universidad Complutense de Madrid, Instituto de
Matemática Interdisciplinar (IMI),
Departamento de Geometría y Topología
28040 Madrid, Spain; maigarri 'at' mat.ucm.es
Universidad Complutense de Madrid, Departamento de Geometría
y Topología
28040 Madrid, Spain; anamerogno 'at' gmail.com
Abstract. This paper is devoted to introduce and study two new properties of completeness in the setting of metric spaces. We will call them Bourbaki-completeness and cofinal Bourbaki-completeness. These notions came from new classes of generalized Cauchy sequences appearing when we try to characterize the so-called Bourbaki-boundedness in a similar way that Cauchy sequences characterize the totally boundedness. We also study the topological problem of metrizability by means of a Bourbaki-complete or a cofinally Bourbaki-complete metric. At this respect, we obtain results in the line to the classical Cech theorem about the complete metrizability of a metric space X in terms of its Stone-Cech compactification βX. Finally we give some relationships between these kinds of completeness and some properties related to paracompactness and uniform paracompactness in the framework of metrizable spaces.
2010 Mathematics Subject Classification: Primary 54E35, 54E50, 54E15, 54D35, 54D20.
Key words: Metric spaces, Bourbaki-completeness, cofinal Bourbaki-completeness, Bourbaki-bounded sets, totally-bounded sets, Stone-Cech compactification, uniform paracompactness.
Reference to this article: M.I. Garrido and A.S. Meroño: New types of completeness in metric spaces. Ann. Acad. Sci. Fenn. Math. 39 (2014), 733-758.
doi:10.5186/aasfm.2014.3934
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