On the equivariant K-homology of PSL\_2 of the imaginary quadratic integers

Alexander D. Rahm
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引用次数: 5

Abstract

We establish formulae for the part due to torsion of the equivariant K-homology of all the Bianchi groups (PSL\_2 of the imaginary quadratic integers), in terms of elementary number-theoretic quantities. To achieve this, we introduce a novel technique in the computation of Bredon homology: representation ring splitting, which allows us to adapt the recent technique of torsion subcomplex reduction from group homology to Bredon homology.
虚二次整数的PSL\_2的等变k -同调
我们用初等数论量建立了所有Bianchi群(虚二次整数的PSL\_2)的等变k -同调的挠性部分的公式。为了实现这一目标,我们在Bredon同调的计算中引入了一种新的技术:表示环分裂,它允许我们将最近的从群同调的扭转子复约技术应用到Bredon同调中。
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