The 3d A-model and generalised symmetries, Part I: bosonic Chern-Simons theories

Abstract

The 3d A-model is a two-dimensional approach to the computation of supersymmetric observables of three-dimensional N=2 supersymmetric gauge theories. In principle, it allows us to compute half-BPS partition functions on any compact Seifert three-manifold (as well as of expectation values of half-BPS lines thereon), but previous results focussed on the case where the gauge group G is a product of simply-connected and/or unitary gauge groups. We are interested in the more general case of a compact gauge group G= G/, which is obtained from the G theory by gauging a discrete one-form symmetry. In this paper, we discuss in detail the case of pure N=2 Chern-Simons theories (without matter) for simple groups G. When G= G is simply-connected, we demonstrate the exact matching between the supersymmetric approach in terms of Seifert fibering operators and the 3d TQFT approach based on topological surgery in the infrared Chern-Simons theory Gk, including through the identification of subtle counterterms that relate the two approaches. We then extend this discussion to the case where the Chern-Simons theory Gk can be obtained from Gk by the condensation of abelian anyons which are bosonic. Along the way, we revisit the 3d A-model formalism by emphasising its 2d TQFT underpinning.