Rigidity and flexibility results for groups with a common cocompact envelope

Abstract

A locally compact group G is a cocompact envelope of a group if G contains a copy of as a discrete and cocompact subgroup. We study the problem that takes two finitely generated groups , having a common cocompact envelope, and asks what properties must be shared between and . We first consider the setting where the common cocompact envelope is totally disconnected. In that situation we show that if admits a finitely generated nilpotent normal subgroup A, then virtually admits a normal subgroup B such that A and B are virtually isomorphic. We establish both rigidity and flexibility results when belongs to the class of solvable groups of finite rank. On the rigidity perspective, we show that if is solvable of finite rank, and the locally finite radical of is finite, then must be virtually solvable of finite rank. On the flexibility perspective, we exhibit groups , with a common cocompact envelope such that is solvable of finite rank, while is not virtually solvable. In particular the class of solvable groups of finite rank is not QI-rigid. We also exhibit flexibility behaviours among finitely presented groups, and more generally among groups with type Fn for arbitrary n ≥ 1.

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