Prüfer rank

In mathematics, especially in the area of algebra known as group theory, the Prüfer rank of a pro-p group measures the size of a group in terms of the ranks of its elementary abelian sections.[1] The rank is well behaved and helps to define analytic pro-p-groups. The term is named after Heinz Prüfer.

Definition

The Prüfer rank of pro-p-group G {\displaystyle G} is

sup { d ( H ) | H G } {\displaystyle \sup\{d(H)|H\leq G\}}

where d ( H ) {\displaystyle d(H)} is the rank of the abelian group

H / Φ ( H ) {\displaystyle H/\Phi (H)} ,

where Φ ( H ) {\displaystyle \Phi (H)} is the Frattini subgroup of H {\displaystyle H} .

As the Frattini subgroup of H {\displaystyle H} can be thought of as the group of non-generating elements of H {\displaystyle H} , it can be seen that d ( H ) {\displaystyle d(H)} will be equal to the size of any minimal generating set of H {\displaystyle H} .

Properties

Those profinite groups with finite Prüfer rank are more amenable to analysis.

Specifically in the case of finitely generated pro-p groups, having finite Prüfer rank is equivalent to having an open normal subgroup that is powerful. In turn these are precisely the class of pro-p groups that are p-adic analytic – that is groups that can be imbued with a p-adic manifold structure.

References

  1. ^ Yamagishi, Masakazu (2007), "An analogue of the Nielsen-Schreier formula for pro-p-groups", Archiv der Mathematik, 88 (4): 304–315, doi:10.1007/s00013-006-1878-4, MR 2311837, S2CID 120424528, Zbl 1119.20035.