作为框架流形的特殊单元群 $SU(2n)$

Haruo Minami
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引用次数: 0

摘要

让 $[SU(2n),\mathscr{L}]$ 表示$SU(2n)$(n\ge 2)$的边界类,并配有左不变帧 $\mathscr{L}$。那么众所周知,$e_\mathbb{C}([SU(2n), \mathscr{L}])=0$ in $\mathbb{O}/\mathbb{Z}$ 其中$e_\mathbb{C}$ 表示复亚当斯不变量$e$。在本注释中,我们将证明用一个特定的映射把 $mathscr{L}$ 替换成扭曲的框架,它就可以转换成 $\mathrm{Im} 的一个生成器。\e_\mathbb{C}$.除此以外,我们还证明了同样的过程可以为$SU(2n+1)$的圆子群的含水子群提供类似的结果,圆子群以通常的方式从$SU(2n+1)$继承了一个典型的框架。
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The special unitary groups $SU(2n)$ as framed manifolds
Let $[SU(2n),\mathscr{L}]$ denote the bordism class of $SU(2n)$ $(n\ge 2)$ equipped with the left invariant framing $\mathscr{L}$. Then it is well known that $e_\mathbb{C}([SU(2n), \mathscr{L}])=0$ in $\mathbb{O}/\mathbb{Z}$ where $e_\mathbb{C}$ denotes the complex Adams $e$-invariant. In this note we show that replacing $\mathscr{L}$ by the twisted framing by a specific map it can be transformed into a generator of $\mathrm{Im} \, e_\mathbb{C}$. In addition to that we also show that the same procedure affords an analogous result for a quotient of $SU(2n+1)$ by a circle subgroup which inherits a canonical framing from $SU(2n+1)$ in the usual way.
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