Coarse obstructions to cocompact cubulation
Abstract
We provide geometric methods to give bounds on the large-scale dimension of CAT(0) cube complexes quasiisometric to a given group G. In situations where these bounds conflict we obtain obstructions to G being cocompactly cubulated. More strongly, the obstructions prevent G from being a coarse median space. As applications, we show that many free-by-cyclic groups cannot be cocompactly cubulated, even virtually, and prove that any tubular group with a coarse median is virtually compact special. We also exhibit a group that is CAT(0), C(6), and virtually special, yet is not quasiisometric to any CAT(0) cube complex. This is the first example of a C(6) group that cannot be cocompactly cubulated, resolving a question of Jankiewicz and partially answering a question of Wise.
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