Abelian dualities of N=(0,4) boundary conditions

Abstract

We propose dual pairs of N=(0,4) half-BPS boundary conditions for 3d N=4 Abelian gauge theories related to mirror symmetry and S-duality by showing the matching of boundary 't Hooft anomalies and supersymmetric indices. We find simple N=(0,4) mirror symmetry between 2d N=(0,4) Abelian gauge theories and free Fermi multiplets that generalizes N=(0,2) Abelian duality. We also propose a prescription for computing half-index of enriched Neumann boundary condition including 2d boundary bosonic matters by gauging the 2d boundary flavor symmetry of Dirichlet boundary condition. By coupling N=(0,4) half-BPS boundary configurations of 3d N=4 gauge theories to quarter-BPS corner configurations of 4d N=4 Super Yang-Mills theories, we further obtain a new type of 4d-3d-2d duality that may involve 3d non-Abelian gauge symmetry.