Wilson spaces, snaith constructions, and elliptic orientations

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS ACS Applied Bio Materials Pub Date : 2024-02-15 DOI:10.1007/s00222-024-01239-3

Hood Chatham, Jeremy Hahn, Allen Yuan

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Abstract

We construct a canonical family of even periodic \(\mathbb{E}_{\infty}\)-ring spectra, with exactly one member of the family for every prime \(p\) and chromatic height \(n\). At height 1 our construction is due to Snaith, who built complex \(K\)-theory from \(\mathbb{CP}^{\infty}\). At height 2 we replace \(\mathbb{CP}^{\infty}\) with a \(p\)-local retract of \(\mathrm{BU} \langle 6 \rangle \), producing a new theory that orients elliptic, but not generic, height 2 Morava \(E\)-theories.

In general our construction exhibits a kind of redshift, whereby \(\mathrm{BP}\langle n-1 \rangle \) is used to produce a height \(n\) theory. A familiar sequence of Bocksteins, studied by Tamanoi, Ravenel, Wilson, and Yagita, relates the \(K(n)\)-localization of our height \(n\) ring to work of Peterson and Westerland building \(E_{n}^{hS\mathbb{G}^{\pm}}\) from \(\mathrm{K}(\mathbb{Z},n+1)\).

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威尔逊空间、斯奈斯构造和椭圆定向

我们构建了一个偶周期性（\mathbb{E}_{\infty}\）-环谱的典型家族，对于每个素数（p）和色度高度（n），家族中都有一个成员。在高度 1 上，我们的构造归功于斯奈思，他从\(\mathbb{CP}^{\infty}\)建立了复\(K\)理论。在高度2上，我们用(\mathrm{BU} \langle 6 \rangle \)的\(p\)-局部回缩取代了\(\mathbb{CP}^{\infty}\)，产生了一个新的理论，它定向于椭圆的，但不是一般的，高度2的莫拉瓦\(E\)-理论。一般来说，我们的构造表现出一种再移位，即用（\mathrm{BP}\langle n-1 \rangle）产生一个高度（n）理论。由塔马诺伊（Tamanoi）、雷文尔（Ravenel）、威尔逊（Wilson）和雅吉塔（Yagita）研究的博克斯特恩（Bocksteins）序列，将我们的高度（n）环的（K（n））定位与彼得森（Peterson）和韦斯特兰（Westerland）从（\\mathrm{K}(\mathbb{Z},n+1)）建立（E_{n}^{hSmathbb{G}^{\pm}}）的工作联系起来。

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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