Palindromic Automorphisms of Free Groups

Abstract

Let Fn be the free group of rank n with free basis X=\x1,…,xn \. A palindrome is a word in X 1 that reads the same backwards as forwards. The palindromic automorphism group An of Fn consists of those automorphisms that map each xi to a palindrome. In this paper, we investigate linear representations of An, and prove that A2 is linear. We obtain conjugacy classes of involutions in A2, and investigate residual nilpotency of An and some of its subgroups. Let IAn be the group of those automorphisms of Fn that act trivially on the abelianisation, P In be the palindromic Torelli group of Fn, and E An be the elementary palindromic automorphism group of Fn. We prove that PIn=IAn E An'. This result strengthens a recent result of Fullarton.