Translations and the holonomy of complete affine flat manifolds (Q1897745)
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scientific article; zbMATH DE number 794201
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Translations and the holonomy of complete affine flat manifolds |
scientific article; zbMATH DE number 794201 |
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Translations and the holonomy of complete affine flat manifolds (English)
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10 September 1995
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The holonomy of complete affine flat manifolds is studied. For instance, if \(M = M^{2n + 1}\) with odd \(n\) is such a manifold and the linear holonomy of \(M\) is conjugate to a subgroup of \(\text{SO} (n + 1,n)\) as well as Zariski dense in \(\text{SO} (n + 1, n)\) then the holonomy is torsion-free. The proofs use results of G. Margulis and properties of purely hyperbolic elements of \(\text{SO} (n+1, n)\).
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holonomy
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affine flat manifolds
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0.92183805
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0.9016996
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0.8996877
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0.8980161
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0.8964098
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0.89473367
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0.88926977
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