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Displaying 41 – 60 of 146

Déformations des algèbres de Lie locales et analogue du théorème d'algébricité de Carles.

Rupert W.T. Yu (1995)

Mathematische Annalen

Déformations différentielles à coefficients constants et produits de Moyal généralisés

Guy Patissier (1979)

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

Deformations of CR-structures on a real Lie-algebra

Daniele Gouthier (1999)

Bollettino dell'Unione Matematica Italiana

Sia $g_{0}$ unalgebra di Lie e (p, J) una sua struttura di Cauchy-Riemann, vale a dire J è una struttura complessa integrabile del sottospazio vettoriale p. Come è stato fatto per il caso delle strutture complesse, cfr. [GT], introduciamo il concetto di deformazione di una struttura CR. Per mezzo dei gruppi di coomologia $H^{k} (g, q)$ vengono provati risultati di rigidità. In particolare ogni struttura di Lie- CR che è semisemplice è rigida. Alcuni esempi chiariscono le soluzioni particolari esposte.

Deformations of Lie brackets: cohomological aspects

Marius Crainic, Ieke Moerdijk (2008)

Journal of the European Mathematical Society

We introduce a new cohomology for Lie algebroids, and prove that it provides a differential graded Lie algebra which “controls” deformations of the structure bracket of the algebroid.

Degree one cohomology for the Lie algebras of derivations.

Skryabin, Serge (2004)

Lobachevskii Journal of Mathematics

Dérivations et déformations de certaines algèbres de Lie infinies classiques

André Lichnerowicz (1976)

Publications du Département de mathématiques (Lyon)

Des espaces homogènes à la résolution de Koszul

André Haefliger (1987)

Annales de l'institut Fourier

Cette note évoque les premiers travaux de J.-L. Koszul (1947-1950) en les replaçant dans leur cadre historique et retrace en particulier le chemin qui a conduit Koszul à la résolution qui porte son nom.

Different methods for the study of obstructions in the schemes of Jacobi

Roger Carles, M. Carmen Márquez (2011)

Annales de l’institut Fourier

In this paper the problem of obstructions in Lie algebra deformations is studied from four different points of view. First, we illustrate the method of local ring, an alternative to Gerstenhaber’s method for Lie deformations. We draw parallels between both methods showing that an obstruction class corresponds to a nilpotent local parameter of a versal deformation of the law in the scheme of Jacobi. Then, an elimination process in the global ring, which defines the scheme, allows us to obtain nilpotent...

Effacement et déformation

Gérard Rauch (1972)

Annales de l'institut Fourier

Soit $k$ un corps de caractéristique zéro. La variété des algèbres de Lie sur $k$ n’est pas réduite en général. Si $L$ est une algèbre de Lie dimension finie sur $k$ l’application quadratique $S q : H^{2} (L, L) \to H^{3} (L, L)$ se factorise à travers le sous-espace des trois-classes de cohomologie effaçables.

Explicit expression of Cartan’s connection for Levi-nondegenerate 3-manifolds in complex surfaces, and identification of the Heisenberg sphere

Joël Merker, Masoud Sabzevari (2012)

Open Mathematics

We study effectively the Cartan geometry of Levi-nondegenerate C 6-smooth hypersurfaces M 3 in ℂ2. Notably, we present the so-called curvature function of a related Tanaka-type normal connection explicitly in terms of a graphing function for M, which is the initial, single available datum. Vanishing of this curvature function then characterizes explicitly the local biholomorphic equivalence of such M 3 ⊂ ℂ2 to the Heisenberg sphere ℍ3, such M’s being necessarily real analytic.

Explicit formulae for cocycles of holomorphic vector fields with values in $λ$ densities.

Wagemann, Friedrich (2001)

Journal of Lie Theory

Extension functors of modular Lie algebras.

Rolf Fransteiner (1990)

Mathematische Annalen

Extensions Between Generalized Verma Modules: The Hermitian Symmetric Cases.

Brad Shelton (1988)

Mathematische Zeitschrift

Extensions of super Lie algebras.

Alekseevsky, Dmitri, Michor, Peter W., Ruppert, W.A.F. (2005)

Journal of Lie Theory

Extensions of symplectic groupoids and quantization.

Alan Weinstein, Ping Xu (1991)

Journal für die reine und angewandte Mathematik

Formal deformations and principal series representations of $SL (2, ℝ)$ and $SL (2, ℂ)$

Benjamin Cahen (2020)

Czechoslovak Mathematical Journal

In this note, we study formal deformations of derived representations of the principal series representations of $SL (2, ℝ)$ . In particular, we recover all the representations of the derived principal series by deforming one of them. Similar results are also obtained for $SL (2, ℂ)$ .

Currently displaying 41 – 60 of 146