异质 SU(3) 模态空间的局部描述

Hannah de Lázari, Jason D. Lotay, Henrique Sá Earp, Eirik Eik Svanes
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引用次数: 0

摘要

异弦$SU(3)$系统,又称赫尔--斯特罗姆格系统,产生于异弦理论在六维空间的紧凑化。本文使用向量束 $Q=(T^{1,0}X)^*\oplus {End}(E) \oplus T^{1,0}X$,其中 $E\to X$ 是该系统中出现的经典规规束,研究了该系统在紧凑的 6 维曲面 $X$ 上的解的模空间的局部结构。我们确定模空间的期望维度为零。我们通过研究与微分算子$\bar{D}$相关的变形复数来实现这一点,它模仿了$Q$上的全形结构,并证明了两个同调群之间的同构性,这两个同调群支配着系统变形理论中的无限小变形和障碍。我们还提供了一个将这些同调群与\v{C}ech 同调群联系起来的多尔博式定理,这一结果可能会引起独立的兴趣,并对未来的研究具有潜在的价值。
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Local descriptions of the heterotic SU(3) moduli space
The heterotic $SU(3)$ system, also known as the Hull--Strominger system, arises from compactifications of heterotic string theory to six dimensions. This paper investigates the local structure of the moduli space of solutions to this system on a compact 6-manifold $X$, using a vector bundle $Q=(T^{1,0}X)^* \oplus {End}(E) \oplus T^{1,0}X$, where $E\to X$ is the classical gauge bundle arising in the system. We establish that the moduli space has an expected dimension of zero. We achieve this by studying the deformation complex associated to a differential operator $\bar{D}$, which emulates a holomorphic structure on $Q$, and demonstrating an isomorphism between the two cohomology groups which govern the infinitesimal deformations and obstructions in the deformation theory for the system. We also provide a Dolbeault-type theorem linking these cohomology groups to \v{C}ech cohomology, a result which might be of independent interest, as well as potentially valuable for future research.
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