Subgroups of word hyperbolic groups in rational dimension 2
Abstract
A result of Gersten states that if G is a hyperbolic group with integral cohomological dimension cdZ(G)=2 then every finitely presented subgroup is hyperbolic. We generalize this result for the rational case cdQ(G)=2. In particular, our result applies to the class of torsion-free hyperbolic groups G with cdZ(G)=3 and cdQ(G)=2 discovered by Bestvina and Mess.
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