Embedding a 2-complex \(K\) in \(R^ 4\) when \(H^ 2(K)\) is a cyclic group (Q911104)
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scientific article; zbMATH DE number 4143044
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Embedding a 2-complex \(K\) in \(R^ 4\) when \(H^ 2(K)\) is a cyclic group |
scientific article; zbMATH DE number 4143044 |
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Embedding a 2-complex \(K\) in \(R^ 4\) when \(H^ 2(K)\) is a cyclic group (English)
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1991
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It is proved in the paper that every finite 2-dimensional cell complex with cyclic second cohomology embeds in \({\mathbb{R}}^ 4\) tamely. The theorem is proved first for the case when the second cohomology is infinite cyclic and the second homology is generated by an embedded surface. The general case is reduced to this case by successively replacing a given complex by ``nicer'' complexes. To get tame embeddings on the 2-cells the proof uses Freedman's disk embedding theorem.
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tame embeddings into 4-space
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finite 2-dimensional cell complex
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Freedman's disk embedding theorem
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