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Left-symmetric algebras, or pre-Lie algebras in geometry and physics

Dietrich Burde (2006)

Open Mathematics

In this survey article we discuss the origin, theory and applications of left-symmetric algebras (LSAs in short) in geometry in physics. Recently Connes, Kreimer and Kontsevich have introduced LSAs in mathematical physics (QFT and renormalization theory), where the name pre-Lie algebras is used quite often. Already Cayley wrote about such algebras more than hundred years ago. Indeed, LSAs arise in many different areas of mathematics and physics. We attempt to give a survey of the fields where LSAs...

Leibniz $A$ -algebras

David A. Towers (2020)

Communications in Mathematics

A finite-dimensional Lie algebra is called an $A$ -algebra if all of its nilpotent subalgebras are abelian. These arise in the study of constant Yang-Mills potentials and have also been particularly important in relation to the problem of describing residually finite varieties. They have been studied by several authors, including Bakhturin, Dallmer, Drensky, Sheina, Premet, Semenov, Towers and Varea. In this paper we establish generalisations of many of these results to Leibniz algebras.

L'ensemble des algèbres de lie algébriques n'est pas Zariski-dense dans la variété des algèbres de Lie de dimension M ... 9.

R. Carles (1989)

Mathematische Annalen

Leonard pairs from the equitable basis of $s l_{2}$ .

Alnajjar, Hasan, Curtin, Brian (2010)

ELA. The Electronic Journal of Linear Algebra [electronic only]

Les $(a, b)$ -algèbres à homotopie près

Walid Aloulou (2010)

Annales mathématiques Blaise Pascal

On étudie dans cet article les notions d’algèbre à homotopie près pour une structure définie par deux opérations $.$ et $[,]$ . Ayant déterminé la structure des $G_{\infty}$ algèbres et des $P_{\infty}$ algèbres, on généralise cette construction et on définit la stucture des $(a, b)$ -algèbres à homotopie près. Etant donnée une structure d’algèbre commutative et de Lie différentielle graduée pour deux décalages des degrés donnés par $a$ et $b$ , on donnera une construction explicite de l’algèbre à homotopie près associée et on précisera...

Les endomorphismes $k$ -finis des modules de Whittaker

Aboubeker Zahid (1989)

Bulletin de la Société Mathématique de France

Les modules simples sphériques d'une algèbre de Lie nilpotente

Yves Benoist (1990)

Compositio Mathematica

Les représentations des algèbres de Lie affines : applications à quelques problèmes de physique

Jean-Louis Verdier (1981/1982)

Séminaire Bourbaki

Les sous-algèbres de Cartan réelles et la frontière d'une orbite ouverte dansune variété de drapeaux.

Jacques Carmona (1973)

Manuscripta mathematica

Level One Kac-Moody Characters and Modular Invariance

Claude Itzykson (1988)

Recherche Coopérative sur Programme n°25

Level one standard modules for affine symplectic Lie algebras.

Kailash C. Misra (1990)

Mathematische Annalen

L'homologie cyclique des algèbres enveloppantes.

Christian Kassel (1988)

Inventiones mathematicae

Lie algebra cohomology and generating functions.

Tolpygo, Alexei (2004)

Homology, Homotopy and Applications

Lie Algebra Cohomology and the Resolution of Certain Harish-Chandra Modules.

Joseph F. Johnson (1984)

Mathematische Annalen

Lie Algebra Homology and the Macdonald-kac Formulas.

James Lepowsky, Howard Garland (1976)

Inventiones mathematicae

Lie algebraic characterization of manifolds

Janusz Grabowski, Norbert Poncin (2004)

Open Mathematics

Results on characterization of manifolds in terms of certain Lie algebras growing on them, especially Lie algebras of differential operators, are reviewed and extended. In particular, we prove that a smooth (real-analytic, Stein) manifold is characterized by the corresponding Lie algebra of linear differential operators, i.e. isomorphisms of such Lie algebras are induced by the appropriate class of diffeomorphisms of the underlying manifolds.

Lie algebras

George Seligman (1987)

Beiträge zur Algebra und Geometrie = Contributions to algebra and geometry

Lie algebras all of whose subalgebras are supersolvable.

Alberto C. Elduque Palomo, Vicente R. Varea Agudo (1986)

Extracta Mathematicae

A Lie algebra L is said to be minimal non supersolvable if all its subalgebras, except L itself, are supersolvable.

Lie algebras and coverings.

Christine Riedtmann (1994)

Commentarii mathematici Helvetici

Lie algebras connected with associative ones

Grabowski, Janusz (1985)

Proceedings of the Winter School "Geometry and Physics"

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