L2-Betti numbers of Dehn fillings
Abstract
We initiate the study of the L2-Betti numbers of group-theoretic Dehn fillings. For a broad class of virtually special groups G, we prove that the L2-Betti numbers of sufficiently deep Dehn fillings G are equal to those of G. As applications, we verify the Singer Conjecture for certain Einstein manifolds, establish a virtual fibering criterion for G, obtain bounds on deficiency of G, and provide new examples of hyperbolic groups with exotic subgroups that arise as Dehn fillings of any cusped arithmetic hyperbolic manifold of dimension at least four.
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