Continuous isomorphisms onto separable groups

Continuous isomorphisms onto separable groups

A condensation is a one-to-one continuous function onto. We give sufficient conditions for a Tychonoff space to admit a condensation onto a separable dense subspace of the Tychonoff cube Ic and discuss the differences that arise when we deal with topological groups, where condensation is understood...

詳細記述

書誌詳細
第一著者: Luis Felipe Morales López
フォーマット: 論文
言語:English
出版事項: Universitat Politècnica de València 2012-10-01
シリーズ:Applied General Topology
主題:
Condensation
Continuous isomorphism
Separable groups
Subtopology
オンライン・アクセス:http://polipapers.upv.es/index.php/AGT/article/view/1625
その他の書誌記述
要約:A condensation is a one-to-one continuous function onto. We give sufficient conditions for a Tychonoff space to admit a condensation onto a separable dense subspace of the Tychonoff cube Ic and discuss the differences that arise when we deal with topological groups, where condensation is understood as a continuous isomorphism. We also show that every Abelian group G with |G| 2c admits a separable, precompact, Hausdorff group topology, where c = 2!.
ISSN:1576-9402
1989-4147

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