微局域剪切理论中的线性结构

Pub Date : 2024-03-14 DOI:10.1112/topo.12325
Xin Jin, David Treumann
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引用次数: 0

摘要

让 L$L$ 成为共切束 T∗M$T^* M$ 的精确拉格朗日子平面,渐近于 Legendrian 子平面Λ⊂T∞M$\Lambda \subset T^{\infty } M$ 。M$.我们研究的是 L$L$ 上的∞$\infty$-类的局部常数层,称为 "蝶恋花结构层 "或 "BraneL$\mathrm{Brane}_L$"。它的纤维是光谱的∞$infty$类别,我们构建了一个从Γ(L,BraneL)$\Gamma (L,\mathrm{Brane}_L)$到 M$M$ 上具有Λ$Lambda$奇异支持的光谱剪切的∞$infty$类别的哈密顿不变全忠函数。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

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Brane structures in microlocal sheaf theory

Let L $L$ be an exact Lagrangian submanifold of a cotangent bundle T M $T^* M$ , asymptotic to a Legendrian submanifold Λ T M $\Lambda \subset T^{\infty } M$ . We study a locally constant sheaf of $\infty$ -categories on L $L$ , called the sheaf of brane structures or Brane L $\mathrm{Brane}_L$ . Its fiber is the $\infty$ -category of spectra, and we construct a Hamiltonian invariant, fully faithful functor from Γ ( L , Brane L ) $\Gamma (L,\mathrm{Brane}_L)$ to the $\infty$ -category of sheaves of spectra on M $M$ with singular support in Λ $\Lambda$ .

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