The automorphism group of a free-by-cyclic groups in rank 2

Abstract

Let φ be an automorphism of a free group Fn of rank n, and let Mφ=Fn φ Z be the corresponding mapping torus of φ. We study the group Out(Mφ) under certain technical conditions on φ. Moreover, in the case of rank 2, we classify the cases when this group is finite or virtually cyclic, depending on the conjugacy class of the image of φ in GL2(Z).

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