Dimension invariants of outer automorphism groups
Abstract
The geometric dimension for proper actions gd(G) of a group G is the minimal dimension of a classifying space for proper actions EG. We construct for every integer r≥ 1, an example of a virtually torsion-free Gromov-hyperbolic group G such that for every group which contains G as a finite index normal subgroup, the virtual cohomological dimension vcd() of equals gd() but such that the outer automorphism group Out(G) is virtually torsion-free, admits a cocompact model for EOut(G) but nonetheless has vcd(Out(G))gd(Out(G))-r.
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