Seminar talk, 22 November 2023: Difference between revisions
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Created page with "{{Talk | speaker = Irina Bobrova | title = On a classification of non-Abelian Painlevé equations | abstract = The famous Painlevé equations define the most general special functions and appear ubiquitously in integrable models. Since the latter have been intensively studied in the matrix or, more general, non-abelian case, examples of non-abelian Painlevé equations arise. We will discuss the problem of classifying such equations. This talk is based on a series of pa..." |
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| title = On a classification of non-Abelian Painlevé equations | | title = On a classification of non-Abelian Painlevé equations | ||
| abstract = The famous Painlevé equations define the most general special functions and appear ubiquitously in integrable models. Since the latter have been intensively studied in the matrix or, more general, non-abelian case, examples of non-abelian Painlevé equations arise. | | abstract = The famous Painlevé equations define the most general special functions and appear ubiquitously in integrable models. Since the latter have been intensively studied in the matrix or, more general, non-abelian case, examples of non-abelian Painlevé equations arise. | ||
We will discuss the problem of classifying such equations. This talk is based on a series of papers joint with Vladimir Sokolov and an ongoing project with Vladimir Retakh, Vladimir Rubtsov, and Georgy Sharygin. | We will discuss the problem of classifying such equations. This talk is based on a series of papers joint with Vladimir Sokolov and an ongoing project with Vladimir Retakh, Vladimir Rubtsov, and Georgy Sharygin. | ||
Revision as of 19:40, 12 November 2023
Speaker: Irina Bobrova
Title: On a classification of non-Abelian Painlevé equations
Abstract:
The famous Painlevé equations define the most general special functions and appear ubiquitously in integrable models. Since the latter have been intensively studied in the matrix or, more general, non-abelian case, examples of non-abelian Painlevé equations arise.
We will discuss the problem of classifying such equations. This talk is based on a series of papers joint with Vladimir Sokolov and an ongoing project with Vladimir Retakh, Vladimir Rubtsov, and Georgy Sharygin.