2n维空间中的广义自对偶Yang-Mills方程的达布变换

Abstract

Abstract:

A generalized self-dual Yang-Mills equation with negative powers of the spectral parameter is proposed by a set of spectral problems. It contains some well-known Lax integrable equations such the Takasaki case, the Belavin-Zakharov case, the Ablowitz-Chakravarty-Takhtajan case and the Ma case. The explicit formulation of Darboux transformation is established for this equation.

Key words: Darboux transformation, Self-dual Yang-Mills equation, Lax integrable, Spectral problem

CLC Number:

Shen Shoufeng, Yu Shuimeng, Li Chunxia, Jin Yongyang. Darboux Transformation for A Generalized Self-Dual Yang-Mills Equation in 2n Dimensions[J].Acta mathematica scientia,Series A, 2015, 35(3): 478-486.

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References

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Darboux Transformation for A Generalized Self-Dual Yang-Mills Equation in 2n Dimensions

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