Mirror symmetry in three dimensional gauge theories

  title={Mirror symmetry in three dimensional gauge theories},
  author={Kenneth A. Intriligator and Nathan Seiberg},
  journal={Physics Letters B},
Two-dimensional mirror symmetry from M-theory
On Mirror Symmetry in Three Dimensional Abelian Gauge Theories
We present an identity relating the partition function of N = 4 supersymmetric QED to that of its dual under mirror symmetry. The identity is a generalized Fourier transform. Many known properties of
Mirror symmetry and toric geometry in three-dimensional gauge theories
We study three dimensional gauge theories with = 2 supersymmetry. We show that the Coulomb branches of such theories may be rendered compact by the dynamical generation of Chern-Simons terms and
New IR dualities in supersymmetric gauge theory in three dimensions
We present nontrivial examples of d = 3 gauge theories with sixteen and eight supercharges which are infrared dual at special points in the moduli space. This duality is distinct from mirror
Mirror Symmetry in 3 d supersymmetric gauge theories
An introduction to studies of moduli spaces of vacua for the purposes of mirror symmetry in 3dN = 4 supersymmetric gauge theories is presented. We first consider the established techniques of
Dynamics of N=2 supersymmetric gauge theories in three-dimensions
Dynamics of N=2 Supersymmetric Chern-Simons Theories
We discuss several aspects of three dimensional N=2 supersymmetric gauge theories coupled to chiral multiplets. The generation of Chern-Simons couplings at low-energies results in novel behaviour
Three-dimensional gauge theories and monopoles


Probing F-theory with branes
The moduli space of vacua of N = 2 SUSY QCD and duality in N = 1 SUSY QCD
Gauge Dynamics And Compactification To Three Dimensions
We study four dimensional $N=2$ supersymmetric gauge theories on $R^3 \times S^1$ with a circle of radius $R$. They interpolate between four dimensional gauge theories ($R=\infty$) and $N=4$
F-theory and orientifolds
Branes within branes
Superstring theory has a rich spectrum of solitonic states, and over the last years much has been learned about their important roles in the theory, in strong-weak coupling duality and in resolving