Higher dimensional algebraic fiberings for pro-p groups

Abstract

We prove some conditions for higher dimensional algebraic fibering of pro-p group extensions and we establish corollaries about incoherence of pro-p groups. In particular, if G = K is a pro-p group, a finitely generated free pro-p group with d() ≥ 2, K a finitely presented pro-p group with N a normal pro-p subgroup of K such that K/ N Zp and N not finitely generated as a pro-p group, then G is incoherent (in the category of pro-p groups). Furthermore we show that if K is a free pro-p group with d(K) = 2 then either Aut0(K) is incoherent (in the category of pro-p groups) or there is a finitely presented pro-p group, without non-procyclic free pro-p subgroups, that has a metabelian pro-p quotient that is not finitely presented i.e. a pro-p version of a result of Bieri-Strebel does not hold.

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