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Let $K$ be an associative and commutative ring with $1$ , $k$ a subring of $K$ such that $1 \in k$ , $n \geq 2$ an integer. The paper describes subrings of the general linear Lie ring $g l_{n} (K)$ that contain the Lie ring of all traceless matrices over $k$ .

On the formula of Ślebodziński for Lie derivative of tensor fields in a differential space

Hanna Matuszczyk (1982)

Colloquium Mathematicae

On the principle of stability of invariance of physical systems

K. Tahir Shah (1976)

Annales de l'I.H.P. Physique théorique

On the q-exponential of matrix q-Lie algebras

Thomas Ernst (2017)

Special Matrices

In this paper, we define several new concepts in the borderline between linear algebra, Lie groups and q-calculus.We first introduce the ring epimorphism r, the set of all inversions of the basis q, and then the important q-determinant and corresponding q-scalar products from an earlier paper. Then we discuss matrix q-Lie algebras with a modified q-addition, and compute the matrix q-exponential to form the corresponding n × n matrix, a so-called q-Lie group, or manifold, usually with q-determinant...

Opérateurs différentiels et mesures invariantes

Jean-Yves Charbonnel (1993)

Compositio Mathematica

Operations for modules on Lie-Rinehart superalgebras.

Sophie Chemla (1995)

Manuscripta mathematica

Poisson-Nijenhuis structures

Yvette Kosmann-Schwarzbach, Franco Magri (1990)

Annales de l'I.H.P. Physique théorique

Singular operations on algebras (generalized contractions)

Maurice Ginocchio (1974)

Annales de l'I.H.P. Physique théorique

Sur certaines classes d'algèbres de Lie rigides.

R. Carles (1985)

Mathematische Annalen

The categories of free metabelian groups and Lie algebras

Vyacheslav A. Artamonov (1977)

Commentationes Mathematicae Universitatis Carolinae

The construction of 3-Lie 2-algebras

Chunyue Wang, Qingcheng Zhang (2018)

Czechoslovak Mathematical Journal

We construct a 3-Lie 2-algebra from a 3-Leibniz algebra and a Rota-Baxter 3-Lie algebra. Moreover, we give some examples of 3-Leibniz algebras.

The forms and representations of the Lie algebra ${sl}_{2} (ℤ)$ .

Yushchenko, A. V. (2002)

Sibirskij Matematicheskij Zhurnal

Topology of the space of all $2$ -dimensional Lie subalgebras of the Lie algebra $gl (2; 𝐑)$

Ivan Kulich (1985)

Mathematica Slovaca

Troisième théorème fondamental de réalisation de Cartan

Ngô van Quê, A.A.M. Rodrigues (1975)

Annales de l'institut Fourier

De même qu’avec les groupes de Lie, à tout pseudo-groupe infinitésimal de Lie $θ$ sur $R^{n}$ il est associé de façon naturelle une algèbre de Lie $L (θ)$ , qui est une sous-algèbre de Lie fermée de l’algèbre de Lie $D$ de tous les champs de vecteurs formels de $R^{n}$ , l’algèbre $D$ étant munie de la topologie définie par la filtration naturelle de l’algèbre des séries formelles. Le troisième théorème fondamental de Cartan dit qu’inversement étant donnée une sous-algèbre de Lie transitive fermée $L$ de l’algèbre $D$ , il existe...

Über Derivationen in isolierten Singularitäten auf vollständigen Durchschnitten.

Hartmut Wiebe, Günter Scheja (1977)

Mathematische Annalen

Universal central extension of direct limits of Hom-Lie algebras

Valiollah Khalili (2019)

Czechoslovak Mathematical Journal

We prove that the universal central extension of a direct limit of perfect Hom-Lie algebras $(ℒ_{i}, α_{ℒ_{i}})$ is (isomorphic to) the direct limit of universal central extensions of $(ℒ_{i}, α_{ℒ_{i}})$ . As an application we provide the universal central extensions of some multiplicative Hom-Lie algebras. More precisely, we consider a family of multiplicative Hom-Lie algebras ${({sl}_{k} (å), α_{k})}_{k \in I}$ and describe the universal central extension of its direct limit.

[unknown]

О.Г. Харлампович (1987)

Algebra i Logika

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