Chromatic splitting for the \(K(2)\)-local sphere at \(p=2\)
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Publication:2138596
DOI10.2140/gt.2022.26.377zbMath1494.55016arXiv1712.08182OpenAlexW2779075432MaRDI QIDQ2138596
Hans-Werner Henn, Agnès Beaudry, Paul G. Goerss
Publication date: 12 May 2022
Published in: Geometry \& Topology (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1712.08182
chromatic homotopy theorychromatic splitting conjectureMorava \(K\)-theory localization of the sphere
Localization and completion in homotopy theory (55P60) Stable homotopy theory, spectra (55P42) (v_n)-periodicity (55Q51)
Related Items (6)
Chromatic homotopy theory is asymptotically algebraic ⋮ The topological modular forms of RP2$\mathbb {R}P^2$ and RP2∧CP2$\mathbb {R}P^2 \wedge \mathbb {C}P^2$ ⋮ Exotic Picard groups and chromatic vanishing via the Gross-Hopkins duality ⋮ The 𝛼-family in the 𝐾(2)-local sphere at the prime 2 ⋮ The centralizer resolution of the 𝐾(2)-local sphere at the prime 2 ⋮ String bordism and chromatic characteristics
Cites Work
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- The homotopy groups of \(S_{E(2)}\) at \(p\geq 5\) revisited
- Towards the homotopy of the \(K(2)\)-local Moore spectrum at \(p=2\)
- The algebraic duality resolution at \(p= 2\)
- Topological modular forms of level 3
- Noetherian localisations of categories of cobordism comodules
- The cohomology of the Morava stabilizer algebras
- Periodic phenomena in the Adams-Novikov spectral sequence
- The Adams-Novikov \(E_2\)-term for computing \(\pi_*(L_2 V(0))\) at the prime 2
- Homotopy fixed point spectra for closed subgroups of the Morava stabilizer groups.
- Gross-Hopkins duality
- A mini-course on Morava stabilizer groups and their cohomology
- Operations and co-operations in Morava \(E\)-theory
- The homotopy groups \(\pi_ * (L_ 2 S^ 0)\)
- The image of J in the EHP sequence
- The Adams-Novikov \(E_2\)-term for \(\pi_*(L_2S^0)\) at the prime 2
- The rational homotopy of the \(K(2)\)-local sphere and the chromatic splitting conjecture for the prime 3 and level 2
- The chromatic splitting conjecture at \(n = p = 2\)
- The homotopy of the \(K(2)\)-local Moore spectrum at the prime 3 revisited
- A resolution of the \(K(2)\)-local sphere at the prime 3
- \(p\)-adic analytic groups
- Localization with Respect to Certain Periodic Homology Theories
- Calculation of Lin's Ext groups
- Nilpotence and Periodicity in Stable Homotopy Theory. (AM-128)
- Morava 𝐾-theories and localisation
- The rigid analytic period mapping, Lubin-Tate space, and stable homotopy theory
- Topological resolutions in K(2)‐local homotopy theory at the prime 2
- A Lyndon-Hochschild-Serre spectral sequence for certain homotopy fixed point spectra
- Chromatic structures in stable homotopy theory
- The centralizer resolution of the 𝐾(2)-local sphere at the prime 2
- On the Iwasawa theory of the Lubin–Tate moduli space
- Nilpotence and stable homotopy theory. II
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