Quasi-bialgebra
In mathematics, quasi-bialgebras are a generalization of bialgebras: they were first defined by the Ukrainian mathematician Vladimir Drinfeld in 1990. A quasi-bialgebra differs from a bialgebra by having coassociativity replaced by an invertible element which controls the non-coassociativity. One of their key properties is that the corresponding category of modules forms a tensor category.
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Quasi-bialgebra
In mathematics, quasi-bialgebras are a generalization of bialgebras: they were first defined by the Ukrainian mathematician Vladimir Drinfeld in 1990. A quasi-bialgebra differs from a bialgebra by having coassociativity replaced by an invertible element which controls the non-coassociativity. One of their key properties is that the corresponding category of modules forms a tensor category.
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En mathématiques, la structure ...... s est une catégorie monoïdale.
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In mathematics, quasi-bialgebr ...... dules forms a tensor category.
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En mathématiques, la structure ...... s est une catégorie monoïdale.
@fr
In mathematics, quasi-bialgebr ...... dules forms a tensor category.
@en
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Quasi-bialgebra
@en
Quasi-bialgèbre
@fr