Yetter–Drinfeld category

In mathematics a Yetter–Drinfeld category is a special type of braided monoidal category. It consists of modules over a Hopf algebra which satisfy some additional axioms.

Definition

Let H be a Hopf algebra over a field k. Let denote the coproduct and S the antipode of H. Let V be a vector space over k. Then V is called a (left left) Yetter–Drinfeld module over H if

for all ,
where, using Sweedler notation, denotes the twofold coproduct of , and .

Examples

,
where each is a G-submodule of V.
, such that .

Braiding

Let H be a Hopf algebra with invertible antipode S, and let V, W be Yetter–Drinfeld modules over H. Then the map ,

is invertible with inverse
Further, for any three Yetter–Drinfeld modules U, V, W the map c satisfies the braid relation

A monoidal category consisting of Yetter–Drinfeld modules over a Hopf algebra H with bijective antipode is called a Yetter–Drinfeld category. It is a braided monoidal category with the braiding c above. The category of Yetter–Drinfeld modules over a Hopf algebra H with bijective antipode is denoted by .

References

  1. N. Andruskiewitsch and M.Grana: Braided Hopf algebras over non abelian groups, Bol. Acad. Ciencias (Cordoba) 63(1999), 658-691
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