Seminar talk, 2 September 2009: Difference between revisions
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Title: Coverings and the fundamental group in the category of partial differential equations. Part 6 | Title: Coverings and the fundamental group in the category of partial differential equations. Part 6 | ||
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Coverings in the category of partial differential equations are generalizations of Bäcklund transformations and Lax pairs from soliton theory. It is known that in topology coverings are determined by actions of the fundamental group. In the talk we continue to describe the analog of the fundamental group for the coverings in the category of partial differential equations. This analog is not a group but a system (often infinite dimensional) Lie algebras. | Coverings in the category of partial differential equations are generalizations of Bäcklund transformations and Lax pairs from soliton theory. It is known that in topology coverings are determined by actions of the fundamental group. In the talk we continue to describe the analog of the fundamental group for the coverings in the category of partial differential equations. This analog is not a group but a system (often infinite dimensional) Lie algebras. | ||
[[Category: Seminar|Seminar talk | Ref.: | ||
[[Category: Seminar abstracts|Seminar talk | |||
[http://www.math.uu.nl/people/igonin/preprints/cfg-2009.pdf S.Igonin Analogues of coverings and the fundamental group for the category of partial differential equations, Preprint] | |||
[[Category: Seminar|Seminar talk 7990-90-97]] | |||
[[Category: Seminar abstracts|Seminar talk 7990-90-97]] | |||
Latest revision as of 23:06, 15 January 2014
Speaker: Sergei Igonin
Title: Coverings and the fundamental group in the category of partial differential equations. Part 6
Abstract:
Coverings in the category of partial differential equations are generalizations of Bäcklund transformations and Lax pairs from soliton theory. It is known that in topology coverings are determined by actions of the fundamental group. In the talk we continue to describe the analog of the fundamental group for the coverings in the category of partial differential equations. This analog is not a group but a system (often infinite dimensional) Lie algebras.
Ref.: