Frattini-resistant direct products of pro-p groups

Abstract

A pro-p group G is called strongly Frattini-resistant if the function H (H), from the poset of all closed subgroups of G into itself, is a poset embedding. Frattini-resistant pro-p groups appear naturally in Galois theory. Indeed, every maximal pro-p Galois group over a field that contains a primitive pth root of unity (and also contains -1 if p=2) is strongly Frattini-resistant. Let G1 and G2 be non-trivial pro-p groups. We prove that G1 × G2 is strongly Frattini-resistant if and only if one of the direct factors G1 or G2 is torsion-free abelian and the other one has the property that all of its closed subgroups have torsion-free abelianization. As a corollary we obtain a group theoretic proof of a result of Koenigsmann on maximal pro-p Galois groups that admit a non-trivial decomposition as a direct product. In addition, we give an example of a group that is not strongly Frattini-resistant, but has the property that its Frattini-function defines an order self-embedding of the poset of all topologically finitely generated subgroups.