Twisted conjugacy in Richard Thompson's group T
Abstract
Let f be an automorphism of a group G. Two elements x, y in G are said to be in the same f-twisted conjugacy class if there exists an element z in G such that y=z x f(z-1). This is an equivalence relation known as f-twisted conjugacy. If the number R(f) of f-twisted conjugacy classes is infinite for every automorphism f of G one says that G has the R∞-property. We show that the Richard Thompson group T has the R∞-property.
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