Bounds for the rank of the finite part of operator $K$-theory

Süleyman Kağan Samurkaş
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引用次数: 6

Abstract

We derive a lower and an upper bound for the rank of the finite part of operator $K$-theory groups of maximal and reduced $C^*$-algebras of finitely generated groups. The lower bound is based on the amount of polynomially growing conjugacy classes of finite order elements in the group. The upper bound is based on the amount of torsion elements in the group. We use the lower bound to give lower bounds for the structure group $S(M)$ and the group of positive scalar curvature metrics $P(M)$ for an oriented manifold $M$. We define a class of groups called "polynomially full groups" for which the upper bound and the lower bound we derive are the same. We show that the class of polynomially full groups contains all virtually nilpotent groups. As example, we give explicit formulas for the ranks of the finite parts of operator $K$-theory groups for the finitely generated abelian groups, the symmetric groups and the dihedral groups.
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算子K有限部分的秩界
我们导出了有限生成群的极大和约C^*$代数的算子K -理论群的有限部分秩的下界和上界。下界是基于群中有限阶元素的多项式增长共轭类的数量。上限是基于组中扭转元素的数量。我们利用下界给出了有向流形的结构群S(M)和正标量曲率度量群P(M)的下界。我们定义了一类称为“多项式满群”的群,它的上界和下界是相同的。我们证明多项式满群类包含所有虚幂零群。作为例子,我们给出了有限生成的阿贝尔群、对称群和二面体群的算子K -理论群有限部分的秩的显式公式。
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