Dyer-Lashof operations as extensions of Brown-Gitler Modules
| Autor: | Kuhn, Nicholas J. |
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| Rok vydání: | 2023 |
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| Druh dokumentu: | Working Paper |
| Popis: | At the prime 2, let T(n) be the n dual of the nth Brown-Gitler spectrum with mod 2 homology G(n). Our previous work on computing the homology of an infinite loopspaces led us to observe that there are extensions between various of the right A-modules G(n) such that splicing with these gives an action of the Dyer-Lashof algebra on the sum over s and n of Ext_A^{s,s}(G(n),M). We give explicit constructions of these `Dyer-Lashof operation' extensions: one construction relates them to the cofiber sequence associated to the C_2-transfer. Another relates key `squaring' Dyer-Lashof operations to the Mahowald short exact sequences. Finally, properties of the spectra T(n) allow us to geometrically realize our extensions by cofibration sequences, with the implication that the sum over n of all the Adams spectral sequences computing [T(n),X] is a spectral sequence of modules over the Dyer-Lashof algebra. Comment: 21 pages The November, 2024 version is a major revision of the original (including the abstract), which hopefully makes everything easier to follow, with clearer motivation. There is also one new result - Theorem 1.7 - which I like |
| Databáze: | arXiv |
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