本文研究了辛群胚上的拉格朗日双截面。
In this paper, we study the Lagrange bisection at the symplectic groupoids.
本文研究了李群的余切丛上的辛群胚结构。
In this paper, we study the symplectic groupoids structure on the cotangent bundle of Lie group.
本文主要以李群、辛流形及群胚等为基本研究对象。
In this paper, Lie group, Symplectic manifolds, Groupoids are treated as fundamental research subjects.
本文研究了矩映射在泊松g -空间及辛群胚中的应用。
In this paper, we study the application of the momentum mapping to a Possion G-space and symplectic groupoids.
本文利用群胚的有关知识证明了李群在基本群胚上的提升作用有余伴随等变的动量映射这一结论,进而刻划了辛群胚的几何性质。
In this paper, in accordance with the knowledge of Groupoid, we proved that the nature life of Lie Group on a Fundamental Groupoid has a coadjoint equivariant momentum mapping.
然后,我们将看到微分同胚群作用下的辛商为特殊子流形模空间上的以环面为结构群的丛。
And then we will see that in the framework of diffeomorphism group the symplectic quotient is torus bundle over the moduli space of special submanifold.
然后,我们将看到微分同胚群作用下的辛商为特殊子流形模空间上的以环面为结构群的丛。
And then we will see that in the framework of diffeomorphism group the symplectic quotient is torus bundle over the moduli space of special submanifold.
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