Twisted conjugacy in generalized Thompson groups of type F
Abstract
If φ is an automorphism of a group G and x,y∈ G, we say that x and y are φ-twisted conjugates if there exists an z∈ G such that y=z.x.φ(z-1). This is an equivalence relation. If there are infinitely many φ-twisted conjugacy classes for every automorphism φ of G we say that G has the R∞-property. We prove that the generalized Richard Thompson groups Fn and F(l,A,P) have the R∞-property.
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