SELF-DUAL YANG-MILLS EQUATION AND DEFORMATION OF SURFACES

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dc.contributor.author N. S. Serikbaev
dc.contributor.author Kur. Myrzakul
dc.contributor.author S. K. Saiymbetova
dc.contributor.author A. D. Koshkinbaev
dc.contributor.author R. Myrzakulov
dc.date.accessioned 2013-04-19T08:45:12Z
dc.date.available 2013-04-19T08:45:12Z
dc.date.issued 2013-04-19
dc.identifier.uri http://repository.enu.kz/handle/123456789/7006
dc.description http://www.enu.kz ru_RU
dc.description.abstract Several nonlinear phenomena in physics, modelled by the nonlinear differential equations, can describe also the evolution of surfaces in time. The interaction between differential geometry of surfaces and nonlinear differential equations has been studied since the 19th century. This relationship is based on the fact that most of the local properties of surfaces are expressed in terms of nonlinear dif­ ferential equations. Since the famous sine-Gordon and Liouville equations, the interrelation between nonlinear differential equations of the classical differential geometry of surfaces and modern soliton equations has been studied from vari­ ous points of view in numerous papers. In particular, the relationship between deformations of surfaces and integrable systems in 2+1 dimensions was studied by several authors. ru_RU
dc.language.iso en ru_RU
dc.subject SELF-DUAL ru_RU
dc.subject YANG-MILLS ru_RU
dc.subject DEFORMATION ru_RU
dc.subject SURFACES ru_RU
dc.title SELF-DUAL YANG-MILLS EQUATION AND DEFORMATION OF SURFACES ru_RU
dc.type Article ru_RU


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