Isomorphisms of Brin-Higman-Thompson groups

Abstract

Let m, m', r, r',t, t' be positive integers with r, r' 2. Let Lr denote the ring that is universal with an invertible 1 × r matrix. Let Mm(Lr t) denote the ring of m × m matrices over the tensor product of t copies of Lr. In a natural way, Mm(Lr t) is a partially ordered ring with involution. Let PUm(Lr t) denote the group of positive unitary elements. We show that PUm(Lr t) is isomorphic to the Brin-Higman-Thompson group t Vr,m; the case t =1 was found by Pardo, that is, PUm(Lr) is isomorphic to the Higman-Thompson group Vr,m. We survey arguments of Abrams, \'Anh, Bleak, Brin, Higman, Lanoue, Pardo, and Thompson that prove that t' Vr',m' tVr,m if and only if r' = r, t'=t and (m',r'-1) = (m,r-1) (if and only if Mm'(Lr' t') and Mm(Lr t) are isomorphic as partially ordered rings with involution).