$p$-紧群作为Kac-Moody群的极大秩子群

J. Bover
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引用次数: 2

摘要

在[28]中,Kitchloo构造了一个映射f: BX→BK∧p,其中K是一个秩2的KacMoody群,X是一个秩2的模p有限环空间,f是一个偶维模p上同构群。其中B表示分类空间函子,(−)p表示Bousfield-Kan fp补全函子([8])。这个空间X -或者更确切地说是三重(X∧p, BX∧p, e)其中e: X ' ΩBX -是一个特殊的例子,被称为p紧群。Dwyer和Wilkerson在[15]中引入这些对象作为同伦理论框架,从同伦的角度研究有限环空间和紧李群。基础论文b[15]连同Dwyer-Wilkerson和其他作者的许多后续论文代表了现在一个活跃的、建立良好的研究领域,其中包含了同伦理论中一些最重要的最新进展。虽然p紧群现在是相当容易理解的对象,但我们从同伦的角度对Kac-Moody群及其分类空间的理解还远远不能令人满意。Kitchloo在[28]中的工作启动了一个项目,该项目还涉及Broto, Saumell, Ruiz和本文作者,并产生了一系列结果([2],[3],[10]),这些结果显示了该理论与p紧群理论之间有趣的相似之处,以及非平凡的挑战性差异。本文的目标是推广上面提到的Kitchloo的构造,以得到广义的p紧群x族的保秩映射BX→BK∧p。这些映射可以理解为同伦类似于单态,在第13节中会详细说明。我们证明:
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$p$-compact groups as subgroups of maximal rank of Kac-Moody groups
In [28], Kitchloo constructed a map f : BX → BK∧ p where K is a certain KacMoody group of rank two, X is a rank two mod p finite loop space and f is such that it induces an isomorphism between even dimensional mod p cohomology groups. Here B denotes the classifying space functor and (−)p denotes the Bousfield-Kan Fp-completion functor ([8]). This space X —or rather the triple (X∧ p , BX ∧ p , e) where e : X ' ΩBX— is a particular example of what is known as a p-compact group. These objects were introduced by Dwyer and Wilkerson in [15] as the homotopy theoretical framework to study finite loop spaces and compact Lie groups from a homotopy point of view. The foundational paper [15] together with its many sequels by Dwyer-Wilkerson and other authors represent now an active, well established research area which contains some of the most important recent advances in homotopy theory. While p-compact groups are nowadays reasonably well understood objects, our understanding of Kac-Moody groups and their classifying spaces from a homotopy point of view is far from satisfactory. The work of Kitchloo in [28] started a project which has also involved Broto, Saumell, Ruiz and the present author and has produced a series of results ([2], [3], [10]) which show interesting similarities between this theory and the theory of p-compact groups, as well as non trivial challenging differences. The goal of this paper is to extend the construction of Kitchloo that we have recalled above to produce rank-preserving maps BX → BK∧ p for a wide family of p-compact groups X. These maps can be understood as the homotopy analogues to monomorphisms, in a sense that will be made precise in section 13. We prove:
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期刊介绍: Papers on pure and applied mathematics intended for publication in the Kyoto Journal of Mathematics should be written in English, French, or German. Submission of a paper acknowledges that the paper is original and is not submitted elsewhere.
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