Ordered group invariants for one-dimensional spaces by

Yi Inhyeop

doi:10.4064/fm170-3-5

Ordered group invariants for one-dimensional spaces by

Yi Inhyeop

Department of Mathematics Education

Research output: Contribution to journal › Article › peer-review

6 Scopus citations

Abstract

We show that the Bruschlinsky group with the winding order is a homeomorphism invariant for a class of one-dimensional inverse limit spaces. In particular we show that if a presentation of an inverse limit space satisfies the Simplicity Condition, then the Bruschlinsky group with the winding order of the inverse limit space is a dimension group and is a quotient of the dimension group with the standard order of the adjacency matrices associated with the presentation.

Original language	English
Pages (from-to)	267-286
Number of pages	20
Journal	Fundamenta Mathematicae
Volume	170
Issue number	3
DOIs	https://doi.org/10.4064/fm170-3-5
State	Published - 2001

Keywords

Branched matchbox manifold
Bruschlinsky group
Dimension group
One-dimensional solenoid
Winding order

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10.4064/fm170-3-5

Cite this

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keywords = "Branched matchbox manifold, Bruschlinsky group, Dimension group, One-dimensional solenoid, Winding order",

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AB - We show that the Bruschlinsky group with the winding order is a homeomorphism invariant for a class of one-dimensional inverse limit spaces. In particular we show that if a presentation of an inverse limit space satisfies the Simplicity Condition, then the Bruschlinsky group with the winding order of the inverse limit space is a dimension group and is a quotient of the dimension group with the standard order of the adjacency matrices associated with the presentation.

KW - Branched matchbox manifold

KW - Bruschlinsky group

KW - Dimension group

KW - One-dimensional solenoid

KW - Winding order

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DO - 10.4064/fm170-3-5

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EP - 286

JO - Fundamenta Mathematicae

JF - Fundamenta Mathematicae

IS - 3

ER -

Ordered group invariants for one-dimensional spaces by

Abstract

Keywords

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