On two-generator subgroups of mapping torus groups

Abstract

We prove that if Gφ= F, t| t x t-1 =φ(x), x∈ F is the mapping torus group of an injective endomorphism φ: F F of a free group F (of possibly infinite rank), then every two-generator subgroup H of Gφ is either free or a (finitary) sub-mapping torus. As an application we show that if φ∈ Out(Fr) (where r 2) is a fully irreducible atoroidal automorphism then every two-generator subgroup of Gφ is either free or has finite index in Gφ.

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