SOLITON EQUATIONS IN 2+1 DIMENSIONS AND DIFFERENTIAL GEOMETRY OF CURVES/SURFACES

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dc.contributor.author Ratbay MYRZAKULOV
dc.date.accessioned 2012-11-20T16:57:59Z
dc.date.available 2012-11-20T16:57:59Z
dc.date.issued 2012-11-20
dc.identifier.uri http://repository.enu.kz/handle/123456789/2410
dc.description Some aspects of the relation between differential geometry of curves and surfaces and (2+1)-dimensional soliton equations are discussed. For the (2+1)-dimensional case, self-cordination of geometrical formalism with the Hirota’s bilinear method is established. A connection between supersymmetry, geometry and soliton equations is also considered. en_US
dc.description.abstract Some aspects of the relation between differential geometry of curves and surfaces and (2+1)-dimensional soliton equations are discussed. For the (2+1)-dimensional case, self-cordination of geometrical formalism with the Hirota’s bilinear method is established. A connection between supersymmetry, geometry and soliton equations is also considered. en_US
dc.title SOLITON EQUATIONS IN 2+1 DIMENSIONS AND DIFFERENTIAL GEOMETRY OF CURVES/SURFACES en_US
dc.type Article en_US


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