Universal enveloping algebras and Poincaré-Birkhoff-Witt theorem for involutive Hom-Lie algebras

Guo, Li; Zhang, Bin; Zheng, Shanghua

doi:10.48550/arxiv.1607.05973

Cited by 2 publications

(8 citation statements)

References 17 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…We start by recalling some basic concepts from [47,45,24]. We use k to denote a commutative unital ring (for example a field).…”

Section: Basic Conseps On Hom-lie Algebras and Color Quasi-lie Algebrasmentioning

confidence: 99%

“…Our next goal is to recall the definition of an involutive hom-associative algebra on an involutive hom-module (M, α) from [24], which is known as the hom-tensor algebra and is denoted here by T (M ). Note that as an R-module, T (M ) is the same as the tensor algebra, i.e.…”

Section: Basic Conseps On Hom-lie Algebras and Color Quasi-lie Algebrasmentioning

confidence: 99%

“…In the article [26], for hom-associative algebras and hom-Lie algebras, the envelopment problem, operads, and the Diamond Lemma and Hilbert series for the hom-associative operad and free algebra have been studied. Recently, making use of free involutive hom-associative algebras, the authors in [24] have found an explicit constructive way to obtain the universal enveloping algebras of hom-Lie algebras, in order to prove the Poincare Birkhoff Witt theorem.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Enveloping algebras of color hom-Lie algebras

Armakan¹,

Silvestrov²,

Farhangdoost³

2019

Turk J Math

View full text Add to dashboard Cite

In this paper the universal enveloping algebra of color hom-Lie algebras is studied. A construction of the free involutive hom-associative color algebra on a hom-module is described and applied to obtain the universal enveloping algebra of an involutive hom-Lie color algebra. Finally, the construction is applied to obtain the well-known Poincaré-Birkhoff-Witt theorem for Lie algebras to the enveloping algebra of an involutive color hom-Lie algebra. of abstract quasi-Lie algebras and subclasses of quasi-Hom-Lie algebras and Hom-Lie algebras as well as their general colored (graded) counterparts in [25,36,39,58,37]. These generalized Lie algebra structures with (graded) twisted skew-symmetry and twisted Jacobi conditions by linear maps are tailored to encompass within the same algebraic framework such quasi-deformations and discretizations of Lie algebras of vector fields using σ-derivations, describing general descritizations and deformations of derivations with twisted Leibniz rule, and the well-known generalizations of Lie algebras such as color Lie algebras which are the natural generalizations of Lie algebras and Lie superalgebras.Quasi-Lie algebras are non-associative algebras for which the skew-symmetry and the Jacobi identity are twisted by several deforming twisting maps and also the Jacobi identity in quasi-Lie and quasi-Hom-Lie algebras in general contains six twisted triple bracket terms. Hom-Lie algebras is a special class of quasi-Lie algebras with the bilinear product satisfying the non-twisted skew-symmetry property as in Lie algebras, whereas the Jacobi identity contains three terms twisted by a single linear map, reducing to the Jacobi identity for ordinary Lie algebras when the linear twisting map is the identity map. Subsequently, hom-Lie admissible algebras have been considered in [45] where also the hom-associative algebras have been introduced and shown to be hom-Lie admissible natural generalizations of associative algebras corresponding to hom-Lie algebras. In [45], moreover several other interesting classes of hom-Lie admissible algebras generalising some non-associative algebras, as well as examples of finite-dimentional hom-Lie algebras have been described. Since these pioneering works [25,36,39,37,40,45], hom-algebra structures have become a popular area with increasing number of publications in various directions.Hom-Lie algebras, hom-Lie superalgebras and hom-Lie color algebras are important special classes of color (Γ-graded) quasi-Lie algebras introduced first by Larsson and Silvestrov in [39,37]. Hom-Lie algebras and hom-Lie superalgebras have been studied further in different aspects by Makhlouf, Silvestrov, Sheng, Ammar, Yau and other authors [62,61,60,45,48,46,47,68,12,44,69,64,65,66,38,51,52,57,59], and hom-Lie color algebras have been considered for example in [68,14,13,1]. In [4], the constructions of Hom-Lie and quasi-hom Lie algebras based on twisted discretizations of vector fields [25] and Hom-Lie admissible algebras have been extended to Hom-Lie superalgebras, a subclass...

show abstract

“…We start by recalling some basic concepts from [47,45,24]. We use k to denote a commutative unital ring (for example a field).…”

Section: Basic Conseps On Hom-lie Algebras and Color Quasi-lie Algebrasmentioning

confidence: 99%

Section: Basic Conseps On Hom-lie Algebras and Color Quasi-lie Algebrasmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Enveloping algebras of color hom-Lie algebras

Armakan¹,

Silvestrov²,

Farhangdoost³

2019

Turk J Math

View full text Add to dashboard Cite

show abstract

“…Our approach for construction of the HNN-extension of Hom-generalization of Lie algebras is based on the corresponding construction for its envelope. Therefore, we concentrate on the study of HNN-extensions for involutive Hom-Lie algebras in which their universal enveloping algebras have been explicitly obtained in [42]. It is worth noting that there exists another approach provided in [80] for obtaining the universal enveloping algebra of a Hom-Lie algebra as a suitable quotient of the free Hom-nonassociative algebra through weighted trees, but the point of difficulty in the approach in [80] is the size of the weighted trees.…”

Section: Introductionmentioning

confidence: 99%

“…It is worth noting that there exists another approach provided in [80] for obtaining the universal enveloping algebra of a Hom-Lie algebra as a suitable quotient of the free Hom-nonassociative algebra through weighted trees, but the point of difficulty in the approach in [80] is the size of the weighted trees. Involutive Hom-Lie algebras have been constructed in [85], and the classical theory of enveloping algebras of Lie algebras was extended to an explicit construction of the free involutive Hom-associative algebra on a Hom-module in order to obtain the universal enveloping algebra [42]. This construction leads to a Poincare-Birkhoff-Witt theorem for the enveloping associative algebra of an involutive Hom-Lie algebra.…”

Section: Introductionmentioning

confidence: 99%