Geometric Baum-Connes assembly map for twisted Differentiable Stacks

P. C. Rouse, Bai-Ling Wang
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引用次数: 7

Abstract

We construct the geometric Baum-Connes assembly map for twisted Lie groupoids, that means for Lie groupoids together with a given groupoid equivariant $PU(H)-$principle bundle. The construction is based on the use of geometric deformation groupoids, these objects allow in particular to give a geometric construction of the associated pushforward maps and to establish the functoriality. The main results in this paper are to define the geometric twisted K-homology groups and to construct the assembly map. Even in the untwisted case the fact that the geometric twisted K-homology groups and the geometric assembly map are well defined for Lie groupoids is new, as it was only sketched by Connes in his book for general Lie groupoids without any restrictive hypothesis, in particular for non Hausdorff Lie groupoids. We also prove the Morita invariance of the assembly map, giving thus a precise meaning to the geometric assembly map for twisted differentiable stacks. We discuss the relation of the assembly map with the associated assembly map of the $S^1$-central extension. The relation with the analytic assembly map is treated, as well as some cases in which we have an isomorphism. One important tool is the twisted Thom isomorphism in the groupoid equivariant case which we establish in the appendix.
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扭曲可微堆栈的几何Baum-Connes装配映射
我们构造了扭曲李群的几何Baum-Connes集合映射,即对于给定的李群具有等价的$PU(H)-$原理束。构造是基于使用几何变形类群,这些对象特别允许给出相关的前推映射的几何构造并建立功能。本文的主要成果是定义了几何扭曲k -同调群,构造了组合映射。即使在不扭曲的情况下,几何扭曲k -同调群和几何集合映射对于李群是有定义的这一事实也是新的,因为它只是由Connes在他的书中对一般李群,特别是对非Hausdorff李群,没有任何限制性假设的情况下勾画出来的。我们还证明了组合映射的Morita不变性,从而给出了扭曲可微堆栈的几何组合映射的精确意义。讨论了$S^1$-中心扩展的组合映射与关联的组合映射之间的关系。讨论了与解析装配映射的关系,以及具有同构的一些情况。一个重要的工具是我们在附录中建立的群样等变情况下的扭曲Thom同构。
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Homology and $K$-Theory of Torsion-Free Ample Groupoids and Smale Spaces An identification of the Baum-Connes and Davis-L\"uck assembly maps Algebraic K-theory of quasi-smooth blow-ups and cdh descent Note on linear relations in Galois cohomology and étale K-theory of curves Weibel’s conjecture for twisted K-theory
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