In this paper, we study the symplectic groupoids structure on the cotangent bundle of Lie group.
本文研究了李群的余切丛上的辛群胚结构。
In this paper, we mainly discuss the procedure for computing the rational cohomology of quotients group actions in symplectic geometry.
本文主要讨论辛几何中群作用的商的有理上同调的计算方法。
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。
In this paper, Lie group, Symplectic manifolds, Groupoids are treated as fundamental research subjects.
本文主要以李群、辛流形及群胚等为基本研究对象。
Since the symplectic structure plays a universal role in all domains of physics. Consequently, nearly all conserved quantities can be obtained as moments of a suitable chosen dynamical group.
鉴于辛结构在物理学的各个领域都起着一个普遍法则的作用,所以几乎所有的守恒量都能作为一个适当选择的动力学群的矩而得到。
In this paper, Lie group, Symplectic manifolds, Groupoids are treated as fundamental research subjects.
讨论了李群胚在流形上的作用及其无穷小作用。
In this paper, Lie group, Symplectic manifolds, Groupoids are treated as fundamental research subjects.
讨论了李群胚在流形上的作用及其无穷小作用。
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