Cohomology and profinite topologies for solvable groups of finite rank

Abstract

Assume G is a solvable group whose elementary abelian sections are all finite. Suppose, further, that p is a prime such that G fails to contain any subgroups isomorphic to Cp∞. We show that if G is nilpotent, then the pro-p completion map G Gp induces an isomorphism H(Gp,M) H(G,M) for any discrete Gp-module M of finite p-power order. For the general case, we prove that G contains a normal subgroup N of finite index such that the map H(Np,M) H(N,M) is an isomorphism for any discrete Np-module M of finite p-power order. Moreover, if G lacks any Cp∞-sections, the subgroup N enjoys some additional special properties with respect to its pro-p topology.