不稳定同伦理论的李代数模型

Handbook of Homotopy Theory Pub Date : 2019-07-30 DOI:10.1201/9781351251624-16

Gijs Heuts

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引用次数: 1

摘要

Quillen展示了如何用微分梯度李代数描述单连通有理空间的同伦理论。本文研究了用谱李代数描述同伦理论(其中有理数对应于n=0)的$v_n$周期局域化的Quillen结果的推广。后者将李代数理论推广到稳定同伦理论的集合。这是为Haynes Miller编辑的《同伦理论手册》所写的一章。

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Lie algebra models for unstable homotopy theory

Quillen showed how to describe the homotopy theory of simply-connected rational spaces in terms of differential graded Lie algebras. Here we survey a generalization of Quillen's results that describes the $v_n$-periodic localizations of homotopy theory (where rational corresponds to $n=0$) in terms of spectral Lie algebras. The latter form an extension of the theory of Lie algebras to the setting of stable homotopy theory. This is a chapter written for the Handbook of Homotopy Theory edited by Haynes Miller.

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Handbook of Homotopy Theory

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