Higher incoherence of the automorphism groups of a free group
Abstract
Let Fn be the free group on n ≥ 2 generators. We show that for all 1 ≤ m ≤ 2n-3 (respectively for all 1 ≤ m ≤ 2n-4) there exists a subgroup of Aut(Fn) (respectively Out(Fn)) which has finiteness of type Fm but not of type FPm+1(Q), hence it is not m-coherent. In both cases, the new result is the upper bound m= 2n-3 (respectively m = 2n-4), as it cannot be obtained by embedding direct products of free noncyclic groups, and certifies higher incoherence up to the virtual cohomological dimension and is therefore sharp. As a tool of the proof, we discuss the existence and nature of multiple inequivalent extensions of a suitable finite-index subgroup K4 of Aut(F2) (isomorphic to the quotient of the pure braid group on four strands by its center): the fiber of four of these extensions arise from the strand-forgetting maps on the braid groups, while a fifth is related with the Cardano-Ferrari epimorphism.
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