On Profinite Groups of Type FP∞
Abstract
Suppose R is a profinite ring. We construct a large class of profinite groups L' HRF, including all soluble profinite groups and profinite groups of finite cohomological dimension over R. We show that, if G ∈ L' HRF is of type FP∞ over R, then there is some n such that HRn(G,R [[ G ]]) ≠ 0, and deduce that torsion-free soluble pro-p groups of type FP∞ over Zp have finite rank, thus answering the torsion-free case of a conjecture of Kropholler.
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