单极花同调、本征多重性与Seifert-Weber十二面体空间

arXiv: Geometric Topology Pub Date : 2020-03-25 DOI:10.1093/imrn/rnaa310

Francesco Lin, Michael Lipnowski

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引用次数: 5

摘要

我们证明了Seifert-Weber十二面体空间$\mathsf{SW}$是一个$L$-空间。这个证明建立在我们关于双曲三流形的花同调和谱几何的工作的基础上。由于问题的计算复杂性，直接应用我们前面的技术会遇到困难。我们利用$\mathsf{SW}$的大对称群和算术四面体群结构，证明了$ $1$-形式上的小特征值必须具有大的多重性。

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Monopole Floer Homology, Eigenform Multiplicities, and the Seifert–Weber Dodecahedral Space

We show that the Seifert-Weber dodecahedral space $\mathsf{SW}$ is an $L$-space. The proof builds on our work relating Floer homology and spectral geometry of hyperbolic three-manifolds. A direct application of our previous techniques runs into difficulties arising from the computational complexity of the problem. We overcome this by exploiting the large symmetry group and the arithmetic and tetrahedral group structure of $\mathsf{SW}$ to prove that small eigenvalues on coexact $1$-forms must have large multiplicity.

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arXiv: Geometric Topology

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