Nombre de classes de conjugaison d'\'el\'ements d'ordre fini dans les groupes de Brown-Thompson

Abstract

We extend a result of Matucci on the number of conjugacy classes of finite order elements in the Thompson group T. According to Liousse, if gcd(m-1,q) is not a divisor of r then there does not exist element of order q in the Brown-Thompson group Tr,m. We show that if gcd(m-1,q) is a divisor of r then there are exactly (q). gcd(m-1,q) conjugacy classes of elements of order q in Tr,m, where is the Euler function phi. As a corollary, we obtain that the Thompson group T is isomorphic to none of the groups Tr,m, for m=2 and any morphism from T into Tr,m, with m=2 and r= 0 mod \ (m-1), is trivial.