Four-Dimensional N=2 Supersymmetric Theory with Boundary as a Two-Dimensional Complex Toda Theory

Abstract

We perform a series of dimensional reductions of the 6d, N=(2,0) SCFT on S2×× I× S1 down to 2d on . The reductions are performed in three steps: (i) a reduction on S1 (accompanied by a topological twist along ) leading to a supersymmetric Yang-Mills theory on S2×× I, (ii) a further reduction on S2 resulting in a complex Chern--Simons theory defined on × I, with the real part of the complex Chern-Simons level being zero, and the imaginary part being proportional to the ratio of the radii of S2 and S1, and (iii) a final reduction to the boundary modes of complex Chern--Simons theory with the Nahm pole boundary condition at both ends of the interval I, which gives rise to a complex Toda CFT on the Riemann surface . As the reduction of the 6d theory on would give rise to an N=2 supersymmetric theory on S2× I× S1, our results imply a 4d-2d duality between four-dimensional N=2 supersymmetric theory with boundary and two-dimensional complex Toda theory.