On strongly reflexive topological groups

Martin-Peinador, E. (E.); Chasco, M.J. (María Jesús)

Authors:

Martin-Peinador, E. (E.)

Chasco, M.J. (María Jesús)

Keywords:

Pontryagin duality theorem
Dual group
Reflexive group
Almost metrizable group
Čech-complete group
Strongly reflexive group

Issue Date:

2001

ISSN:

1989-4147

Note:

Creative Commons Attribution Non-Commercial No Derivatives License

Citation:

Martín-Peinador, E. (E.); Chasco-Ugarte, M. (María Jesús). "On strongly reflexive topological groups". Applied general topology (online). 2 (2), 2001, 219 - 226

Abstract

An Abelian topological group G is strongly reflexive if every closed subgroup and every Hausdorff quotient of G and of its dual group G^, is reflexive. In this paper we prove the following: the annihilator of a closed subgroup of an almost metrizable group is topologically isomorphic to the dual of the corresponding Hausdorff quotient, and an analogous statement holds for the character group of the starting group. As a consequence of this perfect duality, an almost metrizable group is strongly reflexive just if its Hausdorff quotients, as well as the Hausdorff quotients of its dual, are reflexive. The simplification obtained may be significant from an operative point of view.

URI:

https://hdl.handle.net/10171/58491

DOI:

10.4995/agt.2001.2151

Appears in Collections:

DA - Ciencias - Física - Artículos de Revista

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