Finite presentability of some metabelian Hopf algebras
Dessislava H. Kochloukova
ARTIGO
Inglês
We classify the Hopf algebras U(L)#kQ of homological type FP2 where L is a Lie algebra and Q an Abelian group such that L has an Abelian ideal A invariant under the Q-action via conjugation and U(L/A)#kQ is commutative. This generalises the classification of finitely presented metabelian Lie...
Ver mais
We classify the Hopf algebras U(L)#kQ of homological type FP2 where L is a Lie algebra and Q an Abelian group such that L has an Abelian ideal A invariant under the Q-action via conjugation and U(L/A)#kQ is commutative. This generalises the classification of finitely presented metabelian Lie algebras given by J. Groves and R. Bryant.
Ver menos
We classify the Hopf algebras U(L)#kQ of homological type FP2 where L is a Lie algebra and Q an Abelian group such that L has an Abelian ideal A invariant under the Q-action via conjugation and U(L/A)#kQ is commutative. This generalises the classification
CONSELHO NACIONAL DE DESENVOLVIMENTO CIENTÍFICO E TECNOLÓGICO - CNPQ
Aberto
Finite presentability of some metabelian Hopf algebras
Dessislava H. Kochloukova
Finite presentability of some metabelian Hopf algebras
Dessislava H. Kochloukova
Fontes
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Australian mathematical society. Bulletin (Fonte avulsa) |