四元单位球的切片规则莫比乌斯变换的几何图形

Raul Quiroga-Barranco
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引用次数: 0

摘要

对于四元单位球 $\mathbb{B}$,让我们用$\mathcal{M}(\mathbb{B})$ 表示映射 $\mathbb{B}$ 到自身的片正则莫比乌斯变换集。我们在$\mathcal{M}(\mathbb{B})$上引入了一种光滑流形结构,对于这种结构,$\mathcal{M}(\mathbb{B})$在$\mathbb{B}$上的评价(-作用)映射是光滑的。在 $\mathcal{M}(\mathbb{B})$ 上考虑的流形结构是通过把这个集合实现为李群 $\mathrm{Sp}(1,1)$ 的商来得到的,而且,事实证明 $\mathbb{B}$ 也是 $\mathcal{M}(\mathbb{B})$ 和 $\mathrm{Sp}(1,1)$ 的商。这些商都是主纤维束意义上的。流形 $\mathcal{M}(\mathbb{B})$ 与 $mathbb{R}^4 \times S^3$ 是差分同构的。
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Geometry of the slice regular Möbius transformations of the quaternionic unit ball
For the quaternionic unit ball $\mathbb{B}$, let us denote by $\mathcal{M}(\mathbb{B})$ the set of slice regular M\"obius transformations mapping $\mathbb{B}$ onto itself. We introduce a smooth manifold structure on $\mathcal{M}(\mathbb{B})$, for which the evaluation(-action) map of $\mathcal{M}(\mathbb{B})$ on $\mathbb{B}$ is smooth. The manifold structure considered on $\mathcal{M}(\mathbb{B})$ is obtained by realizing this set as a quotient of the Lie group $\mathrm{Sp}(1,1)$, Furthermore, it turns out that $\mathbb{B}$ is a quotient as well of both $\mathcal{M}(\mathbb{B})$ and $\mathrm{Sp}(1,1)$. These quotients are in the sense of principal fiber bundles. The manifold $\mathcal{M}(\mathbb{B})$ is diffeomorphic to $\mathbb{R}^4 \times S^3$.
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