A New Approach to Leibniz Bialgebras

Barreiro, Elisabete; Benayadi, Saı̈d

doi:10.1007/s10468-015-9563-6

Cited by 18 publications

(16 citation statements)

References 12 publications

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“…Any Lie algebra is obviously a symmetric Leibniz algebra, however, the class of symmetric Leibniz algebras contains strictly the class of Lie algebras. In [2,Proposition 2.11], a useful characterization of symmetric Leibniz algebras is given. Note that symmetric Leibniz algebras constitute a subclass of left (right) Leibniz algebras introduced by Bloh [6,5] under the name of D-algebras and rediscovered by Loday [15].…”

Section: Introductionmentioning

confidence: 99%

“…As a Lie bialgebra is a Lie algebra g and a Lie bracket on its dual g * which are compatible in some sens (see Section 2), a symmetric Leibniz bialgebra is a symmetric Leibniz algebra A with a symmetric Leibniz product on its dual A * which are compatible. The notion of Lie bialgebras was introduced and studied by Drinfeld in [10] and symmetric Leibniz bialgebras were characterized by Barreiro and Benayadi in 2016 (see [2]). Note that any symmetric Leibniz bialgebra has an underlying structure of Lie bialgebra.…”

Section: Introductionmentioning

confidence: 99%

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Poisson algebras and symmetric Leibniz bialgebra structures on oscillator Lie algebras

Albuquerque,

Barreiro,

Benayadi

et al. 2020

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Oscillator Lie algebras are the only non commutative solvable Lie algebras which carry a bi-invariant Lorentzian metric. In this paper, we determine all the Poisson structures, and in particular, all symmetric Leibniz algebra structures whose underlying Lie algebra is an oscillator Lie algebra. We give also all the symmetric Leibniz bialgebra structures whose underlying Lie bialgebra structure is a Lie bialgebra structure on an oscillator Lie algebra. We derive some geometric consequences on oscillator Lie groups.

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Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Poisson algebras and symmetric Leibniz bialgebra structures on oscillator Lie algebras

Albuquerque,

Barreiro,

Benayadi

et al. 2020

Preprint

Self Cite

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“…(A, •)). In [2], it was shown that (L, .) is a symmetric Leibniz algebra if and only if L − is a Lie algebra, L + is 3-nilpotent associative algebra (i.e.…”

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confidence: 99%

“…is contained in the annihilator of the commutative associative algebra L + . The aim of this paper is to give a new approach to study the representations of the symmetric Leibniz algabras by using their characterization obtained in [2]. The idea is to use results on the representations of Lie algebras to obtain information on representations of symmetric Leibniz algebras.…”

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confidence: 99%

“…is stable by π(x) and λ(x), ∀α ∈ L , ∀x ∈ L;(2) λ(x)(V α (L − )) = {0}, ∀α ∈ L \{0}, ∀x ∈ L; (3) if α ∈ L , there exists a basis of V α (L − ) such for any x ∈ L, the matrix A(x) := [a ij (x)] of π(x) | V α (L − ) with respect to this basis is upper triangular with a ii (x) = α(x), for all i; (4) there is a basis of V 0 (L − ) such for any x ∈ L, the matrices of π(x) | V 0 (L − ) and λ(x) | V0 (L − ) with respect to this basis is strictly upper triangular. Let (V, r, l) be a representation of a nilpotent symmetric Leibniz algebra (L, .)…”

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confidence: 99%

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On Representations of Symmetric Leibniz Algebras

Benayadi¹

2019

Glasgow Math. J.

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Drinfel’d double of bialgebroids for string and M theories: dual calculus framework

Çatal-Özer,

Doğan,

Yetişmişoğlu

2024

J. High Energ. Phys.

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We extend the notion of Lie bialgebroids for more general bracket structures used in string and M theories. We formalize the notions of calculus and dual calculi on algebroids. We achieve this by reinterpreting the main results of the matched pairs of Leibniz algebroids. By examining a rather general set of fundamental algebroid axioms, we present the compatibility conditions between two calculi on vector bundles which are not dual in the usual sense. Given two algebroids equipped with calculi satisfying the compatibility conditions, we construct its double on their direct sum. This generalizes the Drinfel’d double of Lie bialgebroids. We discuss several examples from the literature including exceptional Courant brackets. Using Nambu-Poisson structures, we construct an explicit example, which is important both from physical and mathematical point of views. This example can be considered as the extension of triangular Lie bialgebroids in the realm of higher Courant algebroids, that automatically satisfy the compatibility conditions. We extend the Poisson generalized geometry by defining Nambu-Poisson exceptional generalized geometry and prove some preliminary results in this framework. We also comment on the global picture in the framework of formal rackoids and we slightly extend the notion for vector bundle valued metrics.

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A New Approach to Leibniz Bialgebras

Cited by 18 publications

References 12 publications

Poisson algebras and symmetric Leibniz bialgebra structures on oscillator Lie algebras

Poisson algebras and symmetric Leibniz bialgebra structures on oscillator Lie algebras

On Representations of Symmetric Leibniz Algebras

Drinfel’d double of bialgebroids for string and M theories: dual calculus framework

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