The word problem of the Brin-Higman-Thompson groups

Abstract

We show that the word problem of the Brin-Higman-Thompson group n Gk,1 is coNP-complete for all n 2 and all k 2. For this we prove that n Gk,1 is finitely generated, and that n Gk,1 contains a subgroup of 2 G2,1 that can represent bijective circuits. We also show that for all n 1 and k 2: \ If \,K = 1 + (k-1)\,N\, for some N 1, then n GK,1 n Gk,1. In particular, n GK,1 n G2,1 for all K 2.