The Drinfel'd centres of String 2-groups

Abstract

Let G be a compact connected Lie group and k ∈ H4(BG,Z) a cohomology class. The String 2-group Gk is the central extension of G by the 2-group [/U(1)] classified by k. It has a close relationship to the level k extension of the loop group LG. We compute the Drinfel'd centre of Gk as a smooth 2-group. When G is semisimple, we prove that the Drinfel'd centre is equal to the invertible part of the category of positive energy representations of LG at level k (as long as we exclude factors of E8 at level 2).