Weak commutativity for pro-p groups
Abstract
We define and study a pro-p version of Sidki's weak commutativity construction. This is the pro-p group Xp(G) generated by two copies G and G of a pro-p group, subject to the defining relators [g,g] for all g ∈ G. We show for instance that if G is finitely presented or analytic pro-p, then Xp(G) has the same property. Furthermore we study properties of the non-abelian tensor product and the pro-p version of Rocco's construction (H). We also study finiteness properties of subdirect products of pro-p groups. In particular we prove a pro-p version of the (n-1)-n-(n+1) Theorem.
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