Abstract
AbstractGolan and Sapir proved that Thompson’s groups F, T and V have linear divergence. In the current paper, we focus on the divergence property of several generalisations of the Thompson groups. We first consider the Brown-Thompson groups $$F_n$$ F n , $$T_n$$ T n and $$V_n$$ V n (also called Brown-Higman-Thompson group in some other context) and find that these groups also have linear divergence functions. We then focus on the braided Thompson groups BF, $$\widehat{BF}$$ BF ^ and $$\widehat{BV}$$ BV ^ and prove that these groups have linear divergence. The case of BV has also been done independently by Kodama.
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