群与李代数滤波与球的同伦群

Pub Date : 2023-06-01 DOI:10.1112/topo.12301

Laurent Bartholdi, Roman Mikhailov

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引用次数: 1

摘要

我们在球面的同伦群和群中的交换微积分之间建立了一座桥梁，并通过提供一个与Sjogren定理相反的定理来解决“维数问题”：每个有界指数的阿贝尔群都可以嵌入群的维数商中。这是通过将任意s，d$s，d$的同伦群πs（Sd）$\pi_s（s^d）$的扭转嵌入到维数商中来证明的，通过Wu的结果。特别是，这使文献中一些长期存在的结果无效，因为对于每个素数p$p$，由于Serre的结果，π2p（S2）$\pi_{2p}（S^2）$中存在一些p$p$-扭转。我们用这种方式解释了Rips关于维数猜想的著名反例，即同伦群π4（S2）=Z/2Z$\pi_4（s^2）=\mathbb{Z}/2\mathbb｛Z}$。我们最后在李环的上下文中得到了类似的结果：对于每个素数p$p$，在某个维数商中存在一个具有p$p$-扭转的李环。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

Group and Lie algebra filtrations and homotopy groups of spheres

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Group and Lie algebra filtrations and homotopy groups of spheres

We establish a bridge between homotopy groups of spheres and commutator calculus in groups, and solve in this manner the “dimension problem” by providing a converse to Sjogren's theorem: every abelian group of bounded exponent can be embedded in the dimension quotient of a group. This is proven by embedding for arbitrary $s, d$ the torsion of the homotopy group $π_{s} (S^{d})$ into a dimension quotient, via a result of Wu. In particular, this invalidates some long-standing results in the literature, as for every prime $p$ , there is some $p$ -torsion in $π_{2 p} (S^{2})$ by a result of Serre. We explain in this manner Rips's famous counterexample to the dimension conjecture in terms of the homotopy group $π_{4} (S^{2}) = Z / 2 Z$ . We finally obtain analogous results in the context of Lie rings: for every prime $p$ there exists a Lie ring with $p$ -torsion in some dimension quotient.

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