Rigidity of maps from Hopf algebras to group algebras (Q1105663)
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scientific article; zbMATH DE number 4059604
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Rigidity of maps from Hopf algebras to group algebras |
scientific article; zbMATH DE number 4059604 |
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Rigidity of maps from Hopf algebras to group algebras (English)
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1988
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It is well-known in the theory of algebraic groups that one cannot deform maps from a diagonalizable group to a linear algebraic group except trivially, i.e., by conjugation with inner automorphisms of the target. This note gives a noncommutative analogue of this result in which linear algebraic groups are replaced by finitely generated bialgebras and diagonal groups are replaced by cancellative monoid algebras. The underlying field must be algebraically closed of characteristic zero. The arguments are Hopf-algebra theoretic with some differential algebra.
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rigidity
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finitely generated bialgebras
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cancellative monoid algebras
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Hopf-algebra
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0.9188427
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0.90022707
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0.89811766
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0.8970289
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0.89467895
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0.89296216
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