On the irreducibility of the extensions of Burau and Gassner representations

Abstract

We study the nth degree representations G of Cbn and B of Cn, defined by Valerij G. Bardakov, where Cbn is the group of basis conjugating automorphisms and Cn is the group of conjugating automorphisms. We prove that G is reducible and its (n-1)th degree composition factor φG is irreducible if and only if ti≠ 1 for all 1≤ i ≤ n. Also we prove that B is reducible and its (n-1)th degree composition factor φB is irreducible if and only if t≠ 1. Moreover, for n=3, we prove that φG(t1,t2,t3) φG(m1,m2,m3) is irreducible if and only if (t1,t2,t3) and (m1,m2,m3) are distinct vectors, and the representation φB(t) φB(m) is irreducible if and only if t ≠ m.