Right-angled Artin pro-p groups

Abstract

Let p be a prime. The right-angled Artin pro-p group G associated to a fnite simplicial graph is the pro-p completion of the right-angled Artin group associated to . We prove that the following assertions are equivalent: (i) no induced subgraph of is a square or a line with four vertices (a path of length 3); (ii) every closed subgroup of G is itself a right-angled Artin pro-p group (possibly infinitely generated); (iii) G is a Bloch-Kato pro-p group; (iv) every closed subgroup of G has torsion free abelianization; (v) G occurs as the maximal pro-p Galois group GK(p) of some field K containing a primitive pth root of unity; (vi) G can be constructed from Zp by iterating two group theoretic operations, namely, direct products with Zp and free pro-p products. This settles in the affirmative a conjecture of Quadrelli and Weigel. Also, we show that the Smoothness Conjecture of De Clercq and Florens holds for right-angled Artin pro-p groups. Moreover, we prove that G is coherent if and only if each circuit of of length greater than three has a chord.