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ON THE GENERALIZED H-LIE STRUCTURE OF ASSOCIATIVE ALGEBRAS IN YETTER-DRINFELD CATEGORIES - MaRDI portal

ON THE GENERALIZED H-LIE STRUCTURE OF ASSOCIATIVE ALGEBRAS IN YETTER-DRINFELD CATEGORIES

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Publication:4531147

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DOI10.1081/AGB-120006492zbMath1004.16037MaRDI QIDQ4531147

Shuan-Hong Wang

Publication date: 4 August 2002

Published in: Communications in Algebra (Search for Journal in Brave)

zbMATH Keywords

Hopf algebras Lie algebras Lie ideals nilpotent ideals Yetter-Drinfeld categories

Mathematics Subject Classification ID

Rings with involution; Lie, Jordan and other nonassociative structures (16W10) Lie (super)algebras associated with other structures (associative, Jordan, etc.) (17B60)

Related Items (7)

On Braided Lie Structures of Algebras in the Categories of Weak Hopf Bimodules ⋮ Central invariants and enveloping algebras of braided Hom-Lie algebras ⋮ AN ANALOGUE OF KEGEL'S THEOREM FOR QUASI-ASSOCIATIVE ALGEBRAS ⋮ Schur–Weyl quasi-duality and (co)triangular Hopf quasigroups ⋮ Double centralizer properties related to (co)triangular Hopf coquasigroups ⋮ On unified Hom-Yetter-Drinfeld categories ⋮ Hom–Lie Algebras in Yetter–Drinfeld Categories

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