$G\textrm{-}CW$-配合物的等变$L^2$-欧拉特性

IF 0.8 4区 数学 Q2 MATHEMATICS
J. Jo
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引用次数: 0

摘要

我们证明,如果$X$是紧致$G\textrm{-}CW$ -复,使得每个各向同性子群$G_\sigma$在任意交换环$k$上都是$L^{(2)}$ -好,则$X$满足某种不动点公式,该公式是1982年Brown公式的$L^{(2)}$ -类似物。利用这一结果,我们给出了紧实固有$G\textrm{-}CW$ -络合物的不动点公式,该公式将不动点$CW$ -络合物$X^s$的等变$L^{(2)}$ -欧拉特性与$X/G$的欧拉特性联系起来。作为推论,我们分别证明了1976年的Atiyah定理、1999年的Akita公式和2009年的Chatterji-Mislin结果。我们还证明,如果X是一个自由的$G\textrm{-}CW$ -复合体,使得$C_{*} (X)$是链同伦等价于有限生成的有限长度的投影$Z \pi_1 (X)$ -模的链复合体,并且$X$满足$\mathbb{Q}$或$\mathbb{C}$上的某个不动点公式,该公式是Brown公式的$L^{(2)}$ -类似物,则$\chi (X/G) = \chi^{(2)} (X)$。作为一个应用,我们证明了弱Bass猜想对于满足以下条件的任何有限呈现群$G$成立:对于具有$\pi_1 (Y)=G, \widetilde{Y}$的任何有限支配的$CW$ -复合体$Y$满足$\mathbb{Q}$或$\mathbb{C}$上的不动点公式,该公式是Brown公式的$L^{(2)}$ -类似物。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Equivariant $L^2$-Euler characteristics of $G\textrm{-}CW$-complexes
We show that if $X$ is a cocompact $G\textrm{-}CW$-complex such that each isotropy subgroup $G_\sigma$ is $L^{(2)}$-good over an arbitrary commutative ring $k$, then $X$ satisfies some fixed-point formula which is an $L^{(2)}$-analogue of Brown’s formula in 1982. Using this result we present a fixed point formula for a cocompact proper $G\textrm{-}CW$-complex which relates the equivariant $L^{(2)}$-Euler characteristic of a fixed point $CW$-complex $X^s$ and the Euler characteristic of $X/G$. As corollaries, we prove Atiyah’s theorem in 1976, Akita’s formula in 1999 and a result of Chatterji–Mislin in 2009. We also show that if X is a free $G\textrm{-}CW$-complex such that $C_{*} (X)$ is chain homotopy equivalent to a chain complex of finitely generated projective $Z \pi_1 (X)$-modules of finite length and $X$ satisfies some fixed-point formula over $\mathbb{Q}$ or $\mathbb{C}$ which is an $L^{(2)}$-analogue of Brown’s formula, then $\chi (X/G) = \chi^{(2)} (X)$. As an application, we prove that the weak Bass conjecture holds for any finitely presented group $G$ satisfying the following condition: for any finitely dominated $CW$-complex $Y$ with $\pi_1 (Y)=G, \widetilde{Y}$ satisfies some fixed-point formula over $\mathbb{Q}$ or $\mathbb{C}$ which is an $L^{(2)}$-analogue of Brown’s formula.
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来源期刊
Arkiv for Matematik
Arkiv for Matematik 数学-数学
CiteScore
1.10
自引率
0.00%
发文量
7
审稿时长
>12 weeks
期刊介绍: Publishing research papers, of short to moderate length, in all fields of mathematics.
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