On the James and Hilton-Milnor splittings, and the metastable EHP sequence

IF 0.9 3区数学 Q2 MATHEMATICS

Documenta Mathematica Pub Date : 2021-01-01 DOI:10.4171/dm/845

Sanath K. Devalapurkar, Peter J. Haine

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引用次数: 4

Abstract

This note provides modern proofs of some classical results in algebraic topology, such as the James Splitting, the Hilton–Milnor Splitting, and the metastable EHP sequence. We prove fundamental splitting results ΣΩΣX ≃ ΣX ∨ (X ∧ ΣΩΣX) and Ω(X ∨ Y ) ≃ ΩX × ΩY × ΩΣ(ΩX ∧ ΩY ) in the maximal generality of an ∞-category with finite limits and pushouts in which pushouts squares remain pushouts after basechange along an arbitrary morphism (i.e., Mather’s Second Cube Lemma holds). For connected objects, these imply the classical James and Hilton–Milnor Splittings. Moreover, working in this generality shows that the James and Hilton–Milnor splittings hold in many new contexts, for example in: elementary ∞-topoi, profinite spaces, and motivic spaces over arbitrary base schemes. The splitting results in this last context extend Wickelgren and Williams’ splitting result for motivic spaces over a perfect field. We also give two proofs of the metastable EHP sequence in the setting of ∞-topoi: the first is a new, non-computational proof that only utilizes basic connectedness estimates involving the James filtration and the Blakers–Massey Theorem, while the second reduces to the classical computational proof. 2020 Mathematics Subject Classification: 55P35, 55P40, 55P99, 55Q20, 18N60, 14F42

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詹姆斯分裂和希尔顿-米尔诺分裂，以及亚稳态EHP序列

本文给出了代数拓扑中一些经典结果的现代证明，如James分裂、Hilton-Milnor分裂和亚稳态EHP序列。我们证明基本分割结果ΣΩΣX≃ΣX∨(X∧ΣΩΣX)和Ω(X∨Y)≃ΩX××YΩΩΣ(ΩX∧ΩY)的最大共性∞类别与有限的限制和推出推出广场后推出basechange沿任意射(例如,马瑟第二立方体引理持有)。对于连接对象，这意味着经典的詹姆斯分裂和希尔顿-米尔诺分裂。此外，在这种一般性下的工作表明，James和Hilton-Milnor分裂在许多新的情况下都成立，例如:初等∞-拓扑、无限空间和任意基格式上的动机空间。最后一种情况下的分裂结果扩展了Wickelgren和Williams在理想场上的动力空间的分裂结果。我们还给出了∞-拓扑下亚稳态EHP序列的两个证明:第一个证明是一种新的、非计算性的证明，它只利用了涉及James滤波和Blakers-Massey定理的基本连通性估计，而第二个证明则简化为经典的计算性证明。2020数学学科分类:55P35、55P40、55P99、55Q20、18N60、14F42

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来源期刊

Documenta Mathematica 数学-数学

CiteScore

1.60

自引率

11.10%

发文量

审稿时长

>12 weeks

期刊介绍： DOCUMENTA MATHEMATICA is open to all mathematical fields und internationally oriented Documenta Mathematica publishes excellent and carefully refereed articles of general interest, which preferably should rely only on refereed sources and references.