关于具有闭合 \texorpdfstring{$ν$}{G2} 结构的两步无常域的\texorpdfstring{$ν$}{nu}不变量

Anna Fino, Gueo Grantcharov, Giovanni Russo
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引用次数: 0

摘要

对于黎曼$7$-manifold上的每一个非消失旋量场,克劳利、戈埃特和诺德斯特罗姆引入了所谓的$\nu$-不变式。它是一个模为48$的整数,可以用马赛-奎伦电流、谐波旋量以及自旋狄拉克和奇异符号算子的$\eta$-不变量来定义。我们计算了接纳不变闭$\mathrm G_2$结构的紧凑两阶零曼形体的这些数据,特别是确定了自旋狄拉克算子谱的谐波旋量和相关对称性。然后我们推导出 $\nu$-invariants 的消失。
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On the \texorpdfstring{$ν$}{nu}-invariant of two-step nilmanifolds with closed \texorpdfstring{$\mathrm G_2$}{G2}-structure
For every non-vanishing spinor field on a Riemannian $7$-manifold, Crowley, Goette, and Nordstr\"om introduced the so-called $\nu$-invariant. This is an integer modulo $48$, and can be defined in terms of Mathai--Quillen currents, harmonic spinors, and $\eta$-invariants of spin Dirac and odd-signature operator. We compute these data for the compact two-step nilmanifolds admitting invariant closed $\mathrm G_2$-structures, in particular determining the harmonic spinors and relevant symmetries of the spectrum of the spin Dirac operator. We then deduce the vanishing of the $\nu$-invariants.
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