Coulomb Branches of Noncotangent Type: a Physics Perspective
Abstract
We study the Coulomb-branch sector of 3D N=4 gauge theories with half-hypermultiplets in general pseudoreal representations R ("noncotangent" theories). This yields (short) quantization of the Coulomb branch and correlators of the Coulomb branch operators captured by the 1d topological sector. This is done by extending the hemisphere partition function approach to noncotangent matter. In this setting one must first cancel the parity anomaly, and overcome an obstacle that (2,2) boundary conditions for half-hypers are generically incompatible with gauge symmetry. Using the Dirichlet boundary conditions for the gauge fields and a careful treatment of half-hypermultiplet boundary data, we describe the resulting shift/difference operators implementing monopole insertions (including bubbling effects) on HS3, and use the HS3 partition function as a natural module on which the Coulomb-branch operator algebra AC is represented. As applications we derive generators and relations of AC for SU(2) theories with general matter (including half-integer spin representations), analyze theories with Coulomb branch y2=z(x2-1), compute the Coulomb branch of an An quiver with spin-32 half-hypers, and check consistency of a general monopole-antimonopole two-point function.
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