Let p be a prime. Following Snopce-Tanushevski, a pro-p group G is called Frattini-resistant if the function H↦Φ(H), from the poset of all closed topologically finitely generated subgroups of G into itself, is a poset embedding. We prove that for an oriented right-angled Artin pro-p group (oriented pro-p RAAG) G associated to a finite directed graph the following four conditions are equivalent: the associated directed graph is of elementary type; G is Frattini-resistant; every topologically finitely generated closed subgroup of G is an oriented pro-p RAAG; G is the maximal pro-p Galois group of a field containing a root of 1 of order p. Also, we conjecture that in the Z/p-cohomology of a Frattini-resistant pro-p group there are no essential triple Massey products.
Directed graphs, Frattini-resistance, and maximal pro-p Galois groups
Quadrelli C.
2025-01-01
Abstract
Let p be a prime. Following Snopce-Tanushevski, a pro-p group G is called Frattini-resistant if the function H↦Φ(H), from the poset of all closed topologically finitely generated subgroups of G into itself, is a poset embedding. We prove that for an oriented right-angled Artin pro-p group (oriented pro-p RAAG) G associated to a finite directed graph the following four conditions are equivalent: the associated directed graph is of elementary type; G is Frattini-resistant; every topologically finitely generated closed subgroup of G is an oriented pro-p RAAG; G is the maximal pro-p Galois group of a field containing a root of 1 of order p. Also, we conjecture that in the Z/p-cohomology of a Frattini-resistant pro-p group there are no essential triple Massey products.
| File | Dimensione | Formato | |
|---|---|---|---|
|
orRAAGs_fratres.pdf
accesso aperto
Descrizione: file su arxiv
Tipologia:
Versione Editoriale (PDF)
Licenza:
Creative commons
Dimensione
440.93 kB
Formato
Adobe PDF
|
440.93 kB | Adobe PDF | Visualizza/Apri |
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
