A Master Superspace Action for 3D S-Duality
Abstract
We formulate a `master' partition function in three-dimensional N=2 superspace that realises, upon integrating out complementary superfields, both the electric Maxwell--Chern--Simons (MCS) theory and its magnetic S-dual: a non-gauge Deser--Jackiw self-dual massive vector times a decoupled level-k Chern--Simons term. The two descriptions share the topological mass M=g2k2π and obey an exact partition-function identity Z mag(gm2,k)= Z ele(ge2,k) with ge gm=2π, mapping a weakly coupled MCS theory to a strongly coupled Deser--Jackiw CS theory. Special limits reproduce pure Chern--Simons/Gaiotto--Witten (g2=0) and Maxwell/compact-scalar duality (k=0). We extend the construction to a non-Abelian U(N) gauge group obtaining N=2 Yang--Mills--Chern--Simons on the electric side and a massive non-gauge vector coupled to level-k Chern--Simons on the magnetic side; the interaction terms between the massive vector and the Chern-Simons term vanish in the Abelian case. Decomposing the N=2 vector into an N=1 vector and a real-linear multiplet factorises the master action and yields the N=1 counterparts. This uplifts the bosonic duality formulated recently to N=2 and clarifies its non-Abelian and N=1 reductions.
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