Normalisers in Limit Groups

Normalisers in Limit Groups

Let $\G$ be a limit group, $S\subset\G$ a subgroup, and $N$ the normaliser of $S$. If $H_1(S,\mathbb Q)$ has finite $\Q$-dimension, then $S$ is finitely generated and either $N/S$ is finite or $N$ is abelian. This result has applications to the study of subdirect products of limit groups.

書誌詳細
主要な著者:	Bridson, M, Howie, J
フォーマット:	Journal article
言語:	English
出版事項:	2005

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