Search and download archives of mathematical journals |
|||
|
|
Table of contents for this issue | Previous article | Next article Chemla, Sophie Poincaré duality for $k$-$A$ Lie superalgebras. Bulletin de la Société Mathématique de France, 122 no. 3 (1994), p. 371-397 Full text djvu | pdf | Reviews MR 95i:16024 | Zbl 0840.16032 stable URL: http://www.numdam.org/item?id=BSMF_1994__122_3_371_0 Bibliography [Bou] BOURBAKI (N.). — Algèbre commutative, chap. 2. — Hermann, [B-C] BOE (B.D.) and COLLINGWOOD (D.H.). — A comparison theorem for the structures of induced representations, J. Algebra, t. 94, [B-L] BROWN (K.A.) and LEVASSEUR (T.). — Cohomology of bimodules over enveloping algebras, Math. Z., t. 189, Article | MR 86m:17011 | Zbl 0566.17005 [Br] BRYLINSKI (J.L.). — A differential complex for Poisson manifolds, J. Differential Geom., t. 28, [C] CHEMLA (S.). — Propriétés de dualité dans les représentations coinduites de superalgèbres de Lie, Thèse, Université Paris 7, [C-S] COLLINGWOOD (D.H.) and SHELTON (B.). — A duality theorem for extensions of induced highest weight modules, Pacific J. Math., t. 146, 2, Article | MR 91m:22029 | Zbl 0733.17005 [D1] DUFLO (M.). — Sur les idéaux induits dans les algèbres enveloppantes, Invent. Math., t. 67, Article | MR 83m:17005 | Zbl 0501.17006 [D2] DUFLO (M.). — Open problems in representation theory of Lie groups, in Proceedings of the Eighteenth International Symposium, division of mathematics, the Taniguchi Foundation. [F] FEL'DMAN (G.L.). — Global dimension of rings of differential operators, Trans. Moscow Math. Soc., t. 1, [Fu] FUKS (D.B.). — Cohomology of infinite dimensional Lie algebras, Contemporary Soviet Mathematics, [G] GYOJA (A.). — A duality theorem for homomorphisms between generalized Verma modules, Preprint Kyoto University. [H] HARTSHORNE (R.). — Algebraic geometry. — Graduate Text in Mathematics, [Hu1] HUEBSCHMANN (J.). — Poisson cohomology and quantization, J. Reine Angew. Math., t. 408, [Hu2] HUEBSCHMANN (J.). — Some remarks about Poisson homology, Preprint Universität Heidelberg, [Hus] HUSSEMOLLER (D.). — Fiber bundles. — Graduate Texts in Mathematics, [K] KEMPF (G.R.). — The Ext-dual of a Verma module is a Verma module, J. Pure Appl. Algebra, t. 75, [Kn] KNAPP (A.). — Lie groups, Lie algebras and cohomology. — Princeton University Press, [Ko] KOSTANT (B.). — Graded manifolds, graded Lie theory and prequantization, Lecture Notes in Math., t. 570, [Kos] KOSZUL (J.L.). — Crochet de Schouten-Nijenhuis et cohomologie, in É. Cartan et les mathématiciens d'aujourd'hui, Lyon 25-29 juin [L1] LEITES (D.A.). — Introduction to the theory of supermanifolds, Uspeki Mat. Nauk, t. 35, 1, [L2] LEITES (D.A.). — Spectra of graded commutative ring, Uspeki Mat. Nauk, t. 29, 3, [M] MANIN (Y.I.). — Gauge field theory and complex geometry, A Series of comprehensive studies in mathematics, Springer-Verlag, [P] PENKOV (I.B.). — D-modules on supermanifolds, Invent. Math., t. 71, Article | MR 85b:32015 | Zbl 0528.32012 [R] RINEHART (G.S.). — Differential form on general commutative algebras, Trans. Amer. Math. Soc., t. 108, [S] SWAN (R.G.). — Vector bundles and projective modules, Trans. Amer. Math. Soc., t. 115, 2, [We] WELLS (R.O.). — Differential analysis on complex manifolds. — Prentice-Hall, Inc., |
||
| Copyright Cellule MathDoc 2005 | Credit | Site Map | |||