斯密同态与 Spin$^h$ 结构

arXiv - MATH - Algebraic Topology Pub Date : 2024-06-12 DOI:arxiv-2406.08237

Arun Debray, Cameron Krulewski

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摘要

本文回答了布坎南-麦克金（arXiv:2312.08209）关于具有自旋$^h$结构的流形的边界问题：我们在$\mathbb{RP}^\infty$的还原自旋$^h$边界和pin$^{h-}$边界之间建立了史密斯同构，并为同构$\Omega_{4k}^{mathrm{Spin}^c}提供了几何解释。\cong \Omega_{4k}^{mathrm{Spin}^h}\$.我们的证明使用了我们在 arXiv:2405.04649 中与 Devalapurkar、Liu、Pacheco-Tallaj 和 Thorngren 共同开发的扭曲自旋结构和史密斯同态的一般理论，特别是史密斯同态参与了一个具有明确的、可计算项的长精确序列。

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Smith homomorphisms and Spin$^h$ structures

In this article, we answer two questions of Buchanan-McKean (arXiv:2312.08209) about bordism for manifolds with spin$^h$ structures: we establish a Smith isomorphism between the reduced spin$^h$ bordism of $\mathbb{RP}^\infty$ and pin$^{h-}$ bordism, and we provide a geometric explanation for the isomorphism $\Omega_{4k}^{\mathrm{Spin}^c} \otimes\mathbb Z[1/2] \cong \Omega_{4k}^{\mathrm{Spin}^h} \otimes\mathbb Z[1/2]$. Our proofs use the general theory of twisted spin structures and Smith homomorphisms that we developed in arXiv:2405.04649 joint with Devalapurkar, Liu, Pacheco-Tallaj, and Thorngren, specifically that the Smith homomorphism participates in a long exact sequence with explicit, computable terms.

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arXiv - MATH - Algebraic Topology

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