The character of free topological groups I

The Birkhoff-Kakutani Theorem asserts that a topological group is metrizable if and only if it has countable character. We develop and apply tools for the estimation of the character for a wide class of nonmetrizable topological groups.We consider abelian groups whose topology is determined by a countable cofinal family of compact sets. These are the closed subgroups of Pontryagin-van Kampen duals of metrizable abelian groups, or equivalently, complete abelian groups whose dual is metrizable. By investigating these connections, we show that also in these cases, the character can be estimated, and that it is determined by the weights of the compact subsets of the group, or of quotients of the group by compact subgroups. It follows, for example, that the density and the local density of an abelian metrizable group determine the character of its dual group. Our main result applies to the more general case of closed subgroups of Pontryagin-van Kampen duals of abelianČech-complete groups.In the special case of free abelian topological groups, our results extend a number of results of Nickolas and Tkachenko, which were proved using combinatorial methods.In order to obtain concrete estimations, we establish a natural bridge between the studied concepts and pcf theory, that allows the direct application of several major results from that theory. We include an introduction to these results and their use.

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“…However, Theorem 1.5 does not capture all of the related results of [24,25]. The proofs in [24,25] are more combinatorially oriented than ours.…”

Section: Overview and Main Resultsmentioning

confidence: 76%

The character of topological groups, via bounded systems, Pontryagin–van Kampen duality and pcf theory

et al. 2014

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“…In a previous paper [11], we investigated the topological character of free and free abelian topological groups. The results obtained were for the free groups on uniform spaces, with applications to the free groups on topological spaces deduced as appropriate.…”

Section: Introductionmentioning

confidence: 99%

“…In this sequel to [11], we specifically investigate the characters of the free and free abelian topological groups on metrizable spaces and on compact spaces, and on certain closely related spaces, obtaining more detailed information in both cases than was available in [11].…”

Section: Introductionmentioning

confidence: 99%

The character of free topological groups II

Nickolas

Tkachenko

2005

Appl.Gen.Topol.

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A systematic analysis is made of the character of the free and free abelian topological groups on metrizable spaces and compact spaces, and on certain other closely related spaces. In the first case, it is shown that the characters of the free and the free abelian topological groups on X are both equal to the "small cardinal" d if X is compact and metrizable, but also, more generally, if X is a nondiscrete kω-space all of whose compact subsets are metrizable, or if X is a non-discrete Polish space. An example is given of a zero-dimensional separable metric space for which both characters are equal to the cardinal of the continuum. In the case of a compact space X, an explicit formula is derived for the character of the free topological group on X involving no cardinal invariant of X other than its weight; in particular the character is fully determined by the weight in the compact case. This paper is a sequel to a paper by the same authors in which the characters of the free groups were analysed under less restrictive topological assumptions.

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“…Note that w(Y ) = ω 1 , so we can apply [47, Theorem 2.1] to infer that w(A(Y )) (ℵ 1 ) ω = c (in fact, one can show that w(A(Y )) = d, see [34]). By Lemma 4.12, we can find a topological monomorphism i of A(Y ) to a direct product H = α∈A H α of second countable Abelian topological groups, where |A| c, and a countable dense subgroup S of H such that S ∩ i(A(Y )) contains only the neutral element of H .…”

Section: Lemma 47 Let E Be An Infinite Subset Of ω and γ Be A Subfamentioning

confidence: 97%

The three space problem in topological groups

Bruguera¹,

Tkachenko²

2006

Topology and its Applications

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We study compact, countably compact, pseudocompact, and functionally bounded sets in extensions of topological groups. A property P is said to be a three space property if, for every topological group G and a closed invariant subgroup N of G, the fact that both groups N and G/N have P implies that G also has P. It is shown that if all compact (countably compact) subsets of the groups N and G/N are metrizable, then G has the same property. However, the result cannot be extended to pseudocompact subsets, a counterexample exists under p = c. Another example shows that extensions of groups do not preserve the classes of realcompact, Dieudonné complete and μ-spaces: one can find a pseudocompact, non-compact Abelian topological group G and an infinite, closed, realcompact subgroup N of G such that G/N is compact and all functionally bounded subsets of N are finite. Several examples given in the article destroy a number of tempting conjectures about extensions of topological groups. (M. Bruguera), mich@xanum.uam.mx (M. Tkachenko).

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The character of free topological groups I

Cited by 10 publications

References 17 publications

The character of topological groups, via bounded systems, Pontryagin–van Kampen duality and pcf theory

The character of topological groups, via bounded systems, Pontryagin–van Kampen duality and pcf theory

The character of free topological groups II

The three space problem in topological groups

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