Seminar talk, 12 May 2010: Difference between revisions
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Created page with '{{Talk | speaker = Alexander Verbovetsky | title = On classification of Poisson vertex algebras | abstract = In the paper Poisson vertex algebras in the theory of Hamiltonian equ…' |
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| speaker = Alexander Verbovetsky | | speaker = Alexander Verbovetsky | ||
| title = On classification of Poisson vertex algebras | | title = On classification of Poisson vertex algebras | ||
| abstract = In the paper Poisson vertex algebras in the theory of Hamiltonian equations by A. Barakat, A. De Sole, V.G. Kac, Japan. J. Math. 4 (2009), 141–252, | | abstract = In the paper Poisson vertex algebras in the theory of Hamiltonian equations by A. Barakat, A. De Sole, V.G. Kac, Japan. J. Math. 4 (2009), 141–252, {{arXiv|0907.1275}}, authors have shown equivalence between the notion of the Poisson vertex algebra on algebras of differential functions (functions on jet spaces) with one independent variable and the notion of the Hamiltonian operator. The talk will discuss the new paper On classification of Poisson vertex algebras by A. De Sole, V.G. Kac, and M. Wakimoto, {{arXiv|1004.5387}}, where the language of Poisson vertex algebras is applied to the classification of Hamiltonian operators. | ||
| slides = | | slides = | ||
| references = | | references = | ||
| 79YY-MM-DD = 7989-94-87 | | 79YY-MM-DD = 7989-94-87 | ||
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Revision as of 18:23, 9 May 2010
Speaker: Alexander Verbovetsky
Title: On classification of Poisson vertex algebras
Abstract:
In the paper Poisson vertex algebras in the theory of Hamiltonian equations by A. Barakat, A. De Sole, V.G. Kac, Japan. J. Math. 4 (2009), 141–252, arXiv:0907.1275, authors have shown equivalence between the notion of the Poisson vertex algebra on algebras of differential functions (functions on jet spaces) with one independent variable and the notion of the Hamiltonian operator. The talk will discuss the new paper On classification of Poisson vertex algebras by A. De Sole, V.G. Kac, and M. Wakimoto, arXiv:1004.5387, where the language of Poisson vertex algebras is applied to the classification of Hamiltonian operators.