The Segal conjecture for smash powers

Pub Date : 2023-04-11 DOI:10.1112/topo.12290

Håkon Schad Bergsaker, John Rognes

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Abstract

We prove that the comparison map from $G$ -fixed points to $G$ -homotopy fixed points, for the $G$ -fold smash power of a bounded below spectrum $B$ , becomes an equivalence after $p$ -completion if $G$ is a finite $p$ -group and $H_{*} (B; F_{p})$ is of finite type. We also prove that the map becomes an equivalence after $I (G)$ -completion if $G$ is any finite group and $π_{*} (B)$ is of finite type, where $I (G)$ is the augmentation ideal in the Burnside ring.

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粉碎力的西格尔猜想

我们证明了当G$G$是有限的p$p$-群并且H*（B；Fp）$H_*{F}_p)$是有限类型。我们还证明了当G$G$是任何有限群并且π*（B）$\pi_*（B。

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