On the Hausdorff spectra of free pro-p groups and certain p-adic analytic groups

Abstract

We establish that finitely generated non-abelian direct products G of free pro-p groups have full Hausdorff spectrum with respect to the lower p-series L. This complements similar results with respect to other standard filtration series and a recent theorem showing that the Hausdorff spectrum hspecL(G) of a p-adic analytic pro-p group G is discrete and consists of at most 2(G) rational numbers. The latter also left some room for improvement regarding the upper bound. Indeed, for finitely generated nilpotent pro-p groups G we obtain the stronger assertion that the cardinality of the Hausdorff spectrum is at most the analytic dimension of G. Moreover, we produce a corresponding result when the p-adic analytic pro-p group G is just infinite, which holds not just for the lower p-series but for arbitrary filtration series. Finally, we show that, if G is a countably based pro-p group with an open subgroup mapping onto the free abelian pro-p group Zp Zp, then for every prescribed finite set \0,1\ ⊂eq X ⊂eq [0,1] there is a filtration series S such that hspecS(G) = X; in particular, |hspecS(G)| is unbounded, as S runs through all filtration series of G with |hspecS(G)| < ∞.