Normal closure of finite subgroups of Aut(Fn) and Out(Fn)
Abstract
For n≥ 3, let G be a nontrivial finite subgroup of Aut(Fn) with |G| not a power of 2. We prove that the normal closure N(G) is SAut(Fn) if G⊂SAut(Fn) and N(G) is Aut(Fn) otherwise. When |G| is a power of 2, we have a partial theorem. Similarly, let G' be a nontrivial finite subgroup of Out(Fn) with |G'| not a power of 2. Then the normal closure N(G') is SOut(Fn) if G'⊂SOut(Fn) and N(G') is Out(Fn) otherwise. When |G'| is a power of 2, we have a partial theorem as well.
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