Biproducts and Two-Cocycle Twists of Hopf Algebras
Abstract
Let H be a Hopf algebra with bijective antipode over a field k and suppose that R#H is a bi-product. Then R is a bialgebra in the Yetter--Drinfel'd category HH YD. We describe the bialgebras (R#H)op and (R#H)o explicitly as bi-products R#Hop and R#Ho respectively where R is a bialgebra in HopHop YD and R is a bialgebra in HoHo YD. We use our results to describe two-cocycle twist bialgebra structures on the tensor product of bi-products.
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