A Class of Multiplier Hopf Algebras

by Admin | May 12th, 2007 | Category: Articles

by Daele, Alfons Van; Wang, Shuanhong

We compute the Drinfel’d double for the bicrossproduct multiplier Hopf algebra A = k[G] ⋊ K(H) associated with the factorization of an infinite group M into two subgroups G and H. We also show that there is a basis-preserving self-duality structure for the multiplier Hopf algebra A = k[G] ⋊ K(H) if there is a factor-reversing group isomorphism.

DOI: 10.1007/s10468-007-9045-6
Online Date: 5/12/2007
Print publication date: 10/1/2007
View article on SpringerLink

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