Krasil'shchik I. On integrability in finite-dimensional coverings, talk at The Workshop on Geometry of PDEs and Integrability, 14-18 October 2013, Teplice nad Becvou, Czech Republic (abstract): Difference between revisions

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| speaker = Joseph Krasil'shchik
| speaker = Joseph Krasil'shchik
| title = On integrability in finite-dimensional coverings
| title = On integrability in finite-dimensional coverings
| abstract = Let~<math>\mathcal{E}\subset J^\infty(\pi)</math> be an equation and~<math>\tau\colon\tilde{\mathcal{E}}\to\mathcal{E}</math> be a finite-dimensional covering over it. Assume that~<math>\mathcal{E}</math> admits an infinite hierarchy of symmetries and/or consevation laws. We show that~<math>\tilde{\mathcal{E}}</math> posseses similar properties.
| abstract = Let <math>\mathcal{E}\subset J^\infty(\pi)</math> be an equation and <math>\tau\colon\tilde{\mathcal{E}}\to\mathcal{E}</math> be a finite-dimensional covering over it. Assume that <math>\mathcal{E}</math> admits an infinite hierarchy of symmetries and/or consevation laws. We show that <math>\tilde{\mathcal{E}}</math> posseses similar properties.
| slides =  
| slides =  
| references =  
| references =  
| 79YY-MM-DD = 7986-89-85
| 79YY-MM-DD = 7986-89-85
}}
}}

Revision as of 17:43, 18 September 2013

Speaker: Joseph Krasil'shchik

Title: On integrability in finite-dimensional coverings

Abstract:
Let be an equation and be a finite-dimensional covering over it. Assume that admits an infinite hierarchy of symmetries and/or consevation laws. We show that posseses similar properties.