Topological resolutions in K(2)-local homotopy theory at the prime 2

Irina Bobkova; Paul G. Goerss

arXiv:1610.00158·math.AT·June 8, 2021

Topological resolutions in K(2)-local homotopy theory at the prime 2

Irina Bobkova, Paul G. Goerss

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TL;DR

This paper constructs a topological duality resolution for a specific spectrum in K(2)-local homotopy theory at prime 2, enabling the building of the K(2)-local sphere through spectra associated with automorphisms of a formal group.

Contribution

It introduces a novel topological duality resolution at prime 2, analogous to prime 3 cases, with distinct methods for identifying the top fiber using Henn's centralizer resolution.

Findings

01

Constructed a topological duality resolution for $E_2^{h ext{S}_2^1}$.

02

Established an analogy with prime 3 resolutions but with different techniques.

03

Performed calculations to identify the top fiber using Henn's centralizer resolution.

Abstract

We provide a topological duality resolution for the spectrum $E_{2}^{h S_{2}^{1}}$ , which itself can be used to build the $K (2)$ -local sphere. The resolution is built from spectra of the form $E_{2}^{h F}$ where $E_{2}$ is the Morava spectrum for the formal group of a supersingular curve at the prime $2$ and $F$ is a finite subgroup of the automorphisms of that formal group. The results are in complete analogy with the resolutions of Goerss, Henn, Mahowald, and Rezk at the prime $3$ , but the methods are of necessity very different. As in the prime $3$ case, the main difficulty is in identifying the top fiber; to do this, we make calculations using Henn's centralizer resolution.

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