阿诺索夫子群的帕特森-沙利文度量的非集中特性

Pub Date : 2024-09-18 DOI:10.1017/etds.2024.55

DONGRYUL M. KIM, HEE OH

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引用次数: 0

摘要

让 G 是一个连通的半简单实代数群。对于相对于抛物子群 $P_\theta $ 的扎里斯基密集阿诺索夫子群 $\Gamma <G$，我们证明任何 $\Gamma $ -帕特森-沙利文度量在 $G/P_\theta $ 的任何适当子变上都不带质量。更广义地说，我们证明了对于一个扎里斯基密集的 $\theta $ -反子群 $\Gamma <G$ ，任何 $(\Gamma , \psi )$ -帕特森-沙利文度量在 $G/P_\theta $ 的任何适当子变上都不收取质量，只要 $\Gamma $ 的 $\psi $ -波因卡雷数列在其收敛的上位发散。特别是，我们的结果也适用于相对阿诺索夫子群。

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