Seminar talk, 13 September 2017: Difference between revisions

Latest revision as of 01:56, 6 September 2017

Title: 2D reductions of the equation $u_{yy}=u_{tx}+u_{y}u_{xx}-u_{x}u_{xy}$ and their nonlocal symmetries

Abstract:
We consider the 3D equation $u_{yy}=u_{tx}+u_{y}u_{xx}-u_{x}u_{xy}$ and its 2D reductions: (1) $u_{yy}=(u_{y}+y)u_{xx}-u_{x}u_{xy}-2$ (which is equivalent to the Gibbons-Tsarev equation) and (2) $u_{yy}=(u_{y}+2x)u_{xx}+(y-u_{x})u_{xy}-u_{x}$ . Using reduction of the known Lax pair for the 3D equation, we describe nonlocal symmetries of (1) and (2) and show that the Lie algebras of these symmetries are isomorphic to the Witt algebra.

Joint work with P. Holba, O. I. Morozov, and P. Vojčák.

References:
arXiv:1707.07645

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 | abstract = We consider the 3D equation <math>u_{yy} = u_{tx} + u_y u_{xx} - u_x u_{xy}</math> and its 2D reductions: (1) <math>u_{yy} = (u_y + y) u_{xx} - u_x u_{xy} - 2</math> (which is equivalent to the Gibbons-Tsarev equation) and (2) <math>u_{yy} = (u_y + 2x) u_{xx} + (y - u_x) u_{xy} - u_x</math>.  Using reduction of the known Lax pair for the 3D equation, we describe nonlocal symmetries of (1) and (2) and show that the Lie algebras of these symmetries are isomorphic to the Witt algebra.
-Joint work with P.Holba, O.I.Morozov, and P.Vojčák.
+Joint work with P. Holba, O. I. Morozov, and P. Vojčák.
 | video =
 | slides =

Seminar talk, 13 September 2017: Difference between revisions

Latest revision as of 01:56, 6 September 2017

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