Virtual rational Betti numbers of nilpotent-by-abelian groups
Abstract
In this paper we study virtual rational Betti numbers of a nilpotent-by-abelian group G, where the abelianization N/N' of its nilpotent part N satisfies certain tameness property. More precisely, we prove that if N/N' is 2(c(n-1)-1)-tame as a G/N-module, c the nilpotency class of N, then vbj(G):=M∈AGQ Hj(M,Q) is finite for all 0≤ j≤ n, where AG is the set of all finite index subgroups of G.
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