Injectivity on the set of conjugacy classes of some monomorphisms between Artin groups

Abstract

There are well-known monomorphisms between the Artin groups of finite type n, n=n and affine type n-1, n-1. The Artin group A(n) is isomorphic to the (n+1)-strand braid group Bn+1, and the other three Artin groups are isomorphic to some subgroups of Bn+1. The inclusions between these subgroups yield monomorphisms A(n) A(n), A( n-1) A(n) and A( n-1) A(n). There are another type of monomorphisms A(d) A(md-1), A(d) A(md) and A(d) A(md) which are induced by isomorphisms between Artin groups of type and centralizers of periodic braids. In this paper, we show that the monomorphisms A(d) A(md-1), A(d) A(md) and A(d) A(md) induce injective functions on the set of conjugacy classes, and that none of the monomorphisms A(n) A(n), A( n-1) A(n) and A( n-1) A(n) does so.