Integrable tautness of isometries of complex hyperbolic spaces
Consider $n \geq 2$. In this paper we prove that the group $\text{PU}(n,1)$ is $1$-taut. This result concludes the study of $1$-tautness of rank-one Lie groups of non-compact type. Additionally the tautness property implies a classification of finitely generated groups which are $\text{L}^1$-measure...
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| Zusammenfassung: | Consider $n \geq 2$. In this paper we prove that the group $\text{PU}(n,1)$
is $1$-taut. This result concludes the study of $1$-tautness of rank-one Lie
groups of non-compact type. Additionally the tautness property implies a
classification of finitely generated groups which are $\text{L}^1$-measure
equivalent to lattices of $\text{PU}(n,1)$. More precisely, we show that
$\text{L}^1$-measure equivalent groups must be extensions of lattices of
$\text{PU}(n,1)$ by a finite group. |
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| DOI: | 10.48550/arxiv.2003.05237 |