4 research outputs found
Lie monads and dualities
We study dualities between Lie algebras and Lie coalgebras, and their
respective (co)representations. To allow a study of dualities in an
infinite-dimensional setting, we introduce the notions of Lie monads and Lie
comonads, as special cases of YB-Lie algebras and YB-Lie coalgebras in additive
monoidal categories. We show that (strong) dualities between Lie algebras and
Lie coalgebras are closely related to (iso)morphisms between associated Lie
monads and Lie comonads. In the case of a duality between two Hopf algebras -in
the sense of Takeuchi- we recover a duality between a Lie algebra and a Lie
coalgebra -in the sense defined in this note- by computing the primitive and
the indecomposables elements, respectively.Comment: 27 pages, v2: some examples added and minor change
Restricted Lie Algebras via Monadic Decomposition
We give a description of the category of restricted Lie algebras over a field (Formula presented.) of prime characteristic by means of monadic decomposition of the functor that computes the (Formula presented.)-vector space of primitive elements of a (Formula presented.)-bialgebra