On subgroup topologies on fundamental groups

Torabi, Hamid; Abdolahi, Mehdi; Jamali, Noorollah; Pashae, Zeynal; Mahsayekhy, Behrooz

doi:10.15672/hujms.464056

Cited by 2 publications

(4 citation statements)

References 23 publications

(35 reference statements)

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“…However, some nice properties occur if it is open. The following proposition generalizes Proposition 2.4 in [1], by a similar argument, for the whisker topology on the nth homotopy group (n ≥ 1). Proposition 2.5.…”

Section: Remark 24 ([4]supporting

confidence: 66%

On topological homotopy groups and relation to Hawaiian groups

Mashayekhy

Babaee

Mirebrahimi

et al. 2020

Hacettepe Journal of Mathematics and Statistics

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By generalizing the whisker topology on the nth homotopy group of pointed space (X, x 0), denoted by π wh n (X, x 0), we show that π wh n (X, x 0) is a topological group if n ≥ 2. Also, we present some necessary and sufficient conditions for π wh n (X, x 0) to be discrete, Hausdorff and indiscrete. Then we prove that L n (X, x 0) the natural epimorphic image of the Hawaiian group H n (X, x 0) is equal to the set of all classes of convergent sequences to the identity in π wh n (X, x 0). As a consequence, we show that L n (X, x 0) ∼ = L n (Y, y 0) if π wh n (X, x 0) ∼ = π wh n (Y, y 0), but the converse does not hold in general, except for some conditions. Also, we show that on some classes of spaces such as semilocally n-simply connected spaces and n-Hawaiian like spaces, the whisker topology and the topology induced by the compact-open topology of n-loop space coincide. Finally, we show that n-SLT paths can transfer π wh n and hence L n isomorphically along its points.

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Section: Remark 24 ([4]supporting

confidence: 66%

On topological homotopy groups and relation to Hawaiian groups

Mashayekhy

Babaee

Mirebrahimi

et al. 2020

Hacettepe Journal of Mathematics and Statistics

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“…) is a map with image in B d (x, r/2) for some x ∈ X. Let g : S n → X be the constant map at α (1). Since e = [α * g] and…”

Section: Comparison With the Shape Topologymentioning

confidence: 99%

“…There are many ways to enrich the n-th homotopy group π n (X, x 0 ) of a based topological space (X, x 0 ) with a geometric or topological structure that remembers local features of the space X, which are "unseen" by the usual group-theoretic structure, for example, the natural quotient topology [11], the τ -topology [9], the Spanier topology [1,3], the whisker topology [2], and variations on these (e.g. coreflections in a convenient category).…”

Section: Introductionmentioning

confidence: 99%

“…To prove this result, we show that for a compact metric space (X, d) the pseudometric topology on π n (X, x 0 ) lies between the shape topology and a third topology called the Spanier topology (Definition 5.5). For Case (1), we apply a result from [3] to conclude that, in the LC n−1 case, the Spanier and shape topologies (and thus all three topologies) agree. We prove Case (2) separately using the fact that we may alter the metric on X without affecting the topologies of π met n (X, x 0 ) or π sh n (X, x 0 ).…”

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

A natural pseudometric on homotopy groups of metric spaces

Brazas,

Fabel

2023

Glasgow Math. J.

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For a path-connected metric space $(X,d)$ , the $n$ -th homotopy group $\pi _n(X)$ inherits a natural pseudometric from the $n$ -th iterated loop space with the uniform metric. This pseudometric gives $\pi _n(X)$ the structure of a topological group, and when $X$ is compact, the induced pseudometric topology is independent of the metric $d$ . In this paper, we study the properties of this pseudometric and how it relates to previously studied structures on $\pi _n(X)$ . Our main result is that the pseudometric topology agrees with the shape topology on $\pi _n(X)$ if $X$ is compact and $LC^{n-1}$ or if $X$ is an inverse limit of finite polyhedra with retraction bonding maps.

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On subgroup topologies on fundamental groups

Cited by 2 publications

References 23 publications

On topological homotopy groups and relation to Hawaiian groups

On topological homotopy groups and relation to Hawaiian groups

A natural pseudometric on homotopy groups of metric spaces

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