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Central invariants and enveloping algebras of braided Hom-Lie algebras
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Let (H,?) be a monoidal Hom-Hopf algebra and HH HYD the Hom-Yetter-Drinfeld
category over (H,?). Then in this paper, we first introduce the definition
of braided Hom-Lie algebras and show that each monoidal Hom-algebra in HH
HYD gives rise to a braided Hom-Lie algebra. Second, we prove that if (A,?)
is a sum of two H-commutative monoidal Hom-subalgebras, then the commutator
Hom-ideal [A,A] of A is nilpotent. Also, we study the central invariant of
braided Hom-Lie algebras as a generalization of generalized Lie algebras.
Finally, we obtain a construction of the enveloping algebras of braided
Hom-Lie algebras and show that the enveloping algebras are H-cocommutative
Hom-Hopf algebras.
Title: Central invariants and enveloping algebras of braided Hom-Lie algebras
Description:
Let (H,?) be a monoidal Hom-Hopf algebra and HH HYD the Hom-Yetter-Drinfeld
category over (H,?).
Then in this paper, we first introduce the definition
of braided Hom-Lie algebras and show that each monoidal Hom-algebra in HH
HYD gives rise to a braided Hom-Lie algebra.
Second, we prove that if (A,?)
is a sum of two H-commutative monoidal Hom-subalgebras, then the commutator
Hom-ideal [A,A] of A is nilpotent.
Also, we study the central invariant of
braided Hom-Lie algebras as a generalization of generalized Lie algebras.
Finally, we obtain a construction of the enveloping algebras of braided
Hom-Lie algebras and show that the enveloping algebras are H-cocommutative
Hom-Hopf algebras.
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