$\mathrm{G}_2^*$ 和各向同性结构的差分旋量

C. S. Shahbazi, Alejandro Gil-García
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引用次数: 0

摘要

我们得到了签名为$(4,3)$的伪黎曼流形$(M,g)$上的不可还原实微分旋子与满足$(M,g)$的K\"ahler-Atiyah束中的二阶同次代数方程的三形式的相关微分系统解之间的对应关系。特别是,我们得到了$\mathrm{G}_2^*$结构的内在代数描述,并首次明确描述了各向同性不可还原旋量在旋量束上的一般连接下平行于签名$(4,3)$的特征,我们将其应用于具有扭转的度量连接的旋量提升。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Differential spinors for $\mathrm{G}_2^*$ and isotropic structures
We obtain a correspondence between irreducible real differential spinors on pseudo-Riemannian manifolds $(M,g)$ of signature $(4,3)$ and solutions to an associated differential system for three-forms that satisfy a homogeneous algebraic equation of order two in the K\"ahler-Atiyah bundle of $(M,g)$. In particular, we obtain an intrinsic algebraic characterization of $\mathrm{G}_2^*$-structures and we provide the first explicit characterization of isotropic irreducible spinors in signature $(4,3)$ parallel under a general connection on the spinor bundle, which we apply to the spinorial lift of metric connections with torsion.
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