On the subgroup of B4 that contains the kernel of Burau representation

Abstract

It is known that there are braids α and β in the braid group B4, such that the group α, β is a fee subgroup 7, which contains the kernel K of the Burau map 4 : B4 G L(3, Z[t,t-1]) 6, 4. In this paper we will prove that K is subgroup of G= τ, , where τ and are fourth and square roots of the generator θ of the center Z of the group B4. Consequently, we will write elements of K in terms of τi,~~i=1,2,3 and . Moreover, we will show that the quotient group G/Z is isomorphic to the free product Z4 *Z2.