Equivalence of toral Chern-Simons and Reshetikhin-Turaev theories

Abstract

We prove a natural isomorphism between toral Chern-Simons theory with gauge group T= t/ U(1)n and the Reshetikhin-Turaev theory associated with the finite quadratic module determined by an even, integral, nondegenerate symmetric bilinear form K:× Z. More precisely, let GK=*/K be the discriminant group of K, equipped with its induced quadratic form qK, and let C(GK,qK) be the corresponding pointed modular category. Using the geometric quantization formulation of toral Chern-Simons theory, we show that the resulting TQFT is naturally isomorphic to the Reshetikhin--Turaev TQFT determined by C(GK,qK). The equivalence is established at the level of closed 3-manifold invariants, bordism operators for manifolds with boundary, and the extended (2+1)-dimensional structure, yielding a natural isomorphism of extended TQFTs.