The R∞ property for pure Artin braid groups

Abstract

In this paper we prove that all pure Artin braid groups Pn (n≥ 3) have the R∞ property. In order to obtain this result, we analyse the naturally induced morphism Aut(Pn) Aut(2 (Pn)/3(Pn)) which turns out to factor through a representation Sn+1 Aut(2 (Pn)/3(Pn)). We can then use representation theory of the symmetric groups to show that any automorphism α of Pn acts on the free abelian group 2 (Pn)/3(Pn) via a matrix with an eigenvalue equal to 1. This allows us to conclude that the Reidemeister number R(α) of α is ∞.