Multiplicative Structures and the Twisted Baum-Connes Assembly map

No'e B'arcenas, P. C. Rouse, Mario Vel'asquez
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引用次数: 5

Abstract

Using a combination of Atiyah-Segal ideas on one side and of Connes and Baum-Connes ideas on the other, we prove that the Twisted geometric K-homology groups of a Lie groupoid have an external multiplicative structure extending hence the external product structures for proper cases considered by Adem-Ruan in [1] or by Tu,Xu and Laurent-Gengoux in [24]. These Twisted geometric K-homology groups are the left hand sides of the twisted geometric Baum-Connes assembly maps recently constructed in [9] and hence one can transfer the multiplicative structure via the Baum-Connes map to the Twisted K-theory groups whenever this assembly maps are isomorphisms.
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乘法结构和扭曲的Baum-Connes组装图
利用一边是Atiyah-Segal思想,另一边是Connes和Baum-Connes思想的组合,我们证明了Lie群的扭曲几何k -同调群具有一个外部乘法结构,从而扩展了Adem-Ruan[1]或Tu,Xu和Laurent-Gengoux[24]所考虑的适当情况下的外部积结构。这些扭曲几何k -同构群是最近在[9]中构造的扭曲几何Baum-Connes组合映射的左侧,因此只要这些组合映射是同构的,就可以通过Baum-Connes映射将乘法结构转移到扭曲k理论群中。
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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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