Twin groups representations

Abstract

We construct two representations of the twin group Tn, n≥ 2, namely η1: Tn → Aut(Fn) and η2: Tn → GLn(Z[t 1]), where Fn is a free group with n generators and t is indeterminate. We then analyze some characteristics of these two representations, such as irreducibility and faithfulness. Moreover, we prove that both representations can be extended to the virtual twin group VTn in the 2-local extension way, for n≥ 2, and we find their 2-local extensions. On the other hand, we obtain a different result for the welded twin group WTn. More deeply, we show that η1 cannot be extended to WTn in the 2-local extension way, for n≥ 3, while η2 can be extended to WTn in the 2-local extension way, for n≥ 2, and we find its 2-local extensions.