构型空间的卢宾-塔特理论：I

Pub Date : 2024-10-20 DOI:10.1112/topo.70000

D. Lukas B. Brantner, Jeremy Hahn, Ben Knudsen

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引用次数: 0

摘要

我们构建了一个收敛于无序配置空间的卢宾-塔特理论（即莫拉瓦 E $E$ -理论）的谱序列，并将其 E 2 ${\mathrm{E}^2}$ -页确定为赫克李代数的切瓦利-艾伦伯格类复数的同调。在此基础上，我们计算了球面迭代环空间的权 p $p$ 和的 E $E$ 理论（参数化了 E n $\mathbb {E}_n$ -代数的权 p $p$ 运算），以及穿刺面上 p $p$ 点的配置空间的 E $E$ 理论。我们读出了相应的莫拉瓦 K $K$ 理论群，它们出现在拉文内尔的一个猜想中。最后，我们计算了穿刺面上 p $p$ 粒子无序配置空间的 F p $\mathbb {F}_p$ -同调。

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The Lubin–Tate theory of configuration spaces: I

We construct a spectral sequence converging to the Lubin–Tate theory, that is, Morava $E$ -theory, of unordered configuration spaces and identify its $E^{2}$ -page as the homology of a Chevalley–Eilenberg-like complex for Hecke Lie algebras. Based on this, we compute the $E$ -theory of the weight $p$ summands of iterated loop spaces of spheres (parameterizing the weight $p$ operations on $E_{n}$ -algebras), as well as the $E$ -theory of the configuration spaces of $p$ points on a punctured surface. We read off the corresponding Morava $K$ -theory groups, which appear in a conjecture by Ravenel. Finally, we compute the $F_{p}$ -homology of the space of unordered configurations of $p$ particles on a punctured surface.

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