An unknotting lemma for systems of arcs in F\(\times I\) (Q908550)
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scientific article; zbMATH DE number 4135041
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | An unknotting lemma for systems of arcs in F\(\times I\) |
scientific article; zbMATH DE number 4135041 |
Statements
An unknotting lemma for systems of arcs in F\(\times I\) (English)
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1989
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A collection of arcs in a product \(F\times I\) of a closed surface and the unit interval is said to be unknotted if there is an isotopy of \(F\times I\) taking the collection to one of the form \(\{p_ 1,...,p_ n\}\times I\). It is shown that this is equivalent to the condition that the closure of the complement of a regular neighborhood of each subcollection of the arcs be a handlebody.
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unknotted arcs
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isotopy
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regular neighborhood
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0.85370207
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0.8398906
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0.8334368
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0.83101296
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0.82800436
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