Alexander Kupers, Ezekiel Lemann, Cary Malkiewich, Jeremy Miller, Robin J. Sroka
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引用次数: 0
摘要
在任何具有合理覆盖概念的范畴中,每个对象都有一个剪刀自动形群。我们证明,在温和的条件下,这个群的同调与对象无关,可以用扎哈雷维奇定义的剪刀同调 K 理论谱来表示。因此,我们既获得了扎哈雷维奇高阶剪刀同构 K 理论的群论解释,也获得了计算剪刀同构群同调的方法。我们将其应用于不同的群族,如间隔交换群和布林-汤普森群,恢复了希米克-华尔、李和坦纳的结果,同时也获得了新的结果。
In any category with a reasonable notion of cover, each object has a group of
scissors automorphisms. We prove that under mild conditions, the homology of
this group is independent of the object, and can be expressed in terms of the
scissors congruence K-theory spectrum defined by Zakharevich. We therefore
obtain both a group-theoretic interpretation of Zakharevich's higher scissors
congruence K-theory, as well as a method to compute the homology of scissors
automorphism groups. We apply this to various families of groups, such as
interval exchange groups and Brin--Thompson groups, recovering results of
Szymik--Wahl, Li, and Tanner, and obtaining new results as well.
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