The non-Abelian Chern-Simons path integral on M= × S1 in the torus gauge: a review

Abstract

In the present paper we review the main results of a series of recent papers on the non-Abelian Chern-Simons path integral on M= × S1 in the so-called "torus gauge". More precisely, we study the torus gauge fixed version of the Chern-Simons path integral expressions Z( × S1,L) associated to G and k ∈ N where is a compact, connected, oriented surface, L is a framed, colored link in × S1, and G is a simple, simply-connected, compact Lie group. We demonstrate that the torus gauge approach allows a rather quick explicit evaluation of Z( × S1,L). Moreover, we verify in several special cases that the explicit values obtained for Z( × S1,L) agree with the values of the corresponding Reshetikhin-Turaev invariant. Finally, we sketch three different approaches for obtaining a rigorous realization of the torus gauge fixed CS path integral. It remains to be seen whether also for general L the explicit values obtained for Z( × S1,L) agree with those of the corresponding Reshetikhin-Turaev invariant. If this is indeed the case then this could lead to progress towards the solution of several open questions in Quantum Topology.