Homomorphisms from automorphism groups of free groups

Abstract

The automorphism group of a finitely generated free group is the normal closure of a single element of order 2. If m is less than n then a homomorphism Aut(Fn) Aut(Fm) can have cardinality at most 2. More generally, this is true of homomorphisms from (Fn) to any group that does not contain an isomorphic copy of the symmetric group Sn+1. Strong constraints are also obtained on maps to groups that do not contain a copy of Wn= ( Z/2)n Sn, or of Zn-1. These results place constraints on how (Fn) can act. For example, if n 3 then any action of (Fn) on the circle (by homeomorphisms) factors through det:Aut(Fn) Z2 .

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