On regular subgroups of SL3(R)
Abstract
Motivated by a question of M. Kapovich, we show that the Z2 subgroups of SL3(R) that are regular in the language of Kapovich--Leeb--Porti, or divergent in the sense of Guichard--Wienhard, are precisely the lattices in minimal horospherical subgroups. This rules out any relative Anosov subgroups of SL3(R) that are not in fact Gromov-hyperbolic. By work of Oh, it also follows that a Zariski-dense discrete subgroup of SL3(R) contains a regular Z2 if and only if is commensurable to a conjugate of SL3(Z). In particular, a Zariski-dense regular subgroup of SL3(R) contains no Z2 subgroups.
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