Tadashi Okazaki scite author profile

Two-dimensional N = (0, 4) supersymmetric quiver gauge theories are realized as D3-brane box configurations (two dimensional intervals) which are bounded by NS5-branes and intersect with D5-branes. The periodic brane configuration is mapped to D1-D5-D5 brane system at orbifold singularity via T-duality. The matter content and interactions are encoded by the N = (0, 4) quiver diagrams which are determined by the brane configurations. The Abelian gauge anomaly cancellation indicates the presence of Fermi multiplets at the NS-NS junction. We also discuss the brane construction of N = (0, 4) supersymmetric boundary conditions in 3d N = 4 gauge theories involving two-dimensional boundary degrees of freedom that cancel gauge anomaly.

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Sphere correlation functions and Verma modules

Gaiotto

Okazaki

2020

J. High Energ. Phys.

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Supersymmetric Boundary Conditions in 3D N=2 Theories

Okazaki¹,

Yamaguchi²

2014

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We study supersymmetric boundary conditions in three-dimensional N = 2 Landau-Ginzburg models and Abelian gauge theories. In the Landau-Ginzburg model the boundary conditions that preserve (1, 1) supersymmetry (A-type) and (2, 0) supersymmetry (B-type) on the boundary are classified in terms of subspaces of the target space ("brane"). An A-type brane is a Lagrangian submanifold on which the imaginary part of the superpotential is constant, while a B-type brane is a holomorphic submanifold on which the superpotential is constant. We also consider the N = 2 Maxwell theory with boundary and the Abelian duality. Finally we make some comments on N = 2 SQED with boundary condition and the mirror symmetry.

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Dualities of corner configurations and supersymmetric indices

Gaiotto

Okazaki

2019

J. High Energ. Phys.

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We compute supersymmetric indices which count local operators at certain half-BPS interfaces and quarter-BPS junctions of interfaces in four-dimensional $$ \mathcal{N} $$ N = 4 Super Yang-Mills theory. We use the indices as very stringent tests of a variety of string theory-inspired conjectures about the action of S-duality on such defects.

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Supersymmetric boundary conditions in three-dimensionalN=2theories

Okazaki

Yamaguchi

2013

Phys. Rev. D

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We study supersymmetric boundary conditions in three-dimensional N ¼ 2 Landau-Ginzburg models and Abelian gauge theories. In the Landau-Ginzburg model the boundary conditions that preserve (1,1) supersymmetry (A-type) and (2,0) supersymmetry (B-type) on the boundary are classified in terms of subspaces of the target space (''brane''). An A-type brane is a Lagrangian submanifold on which the imaginary part of the superpotential is constant, while a B-type brane is a holomorphic submanifold on which the superpotential is constant. We also consider the N ¼ 2 Maxwell theory with boundary and the Abelian duality. Finally we make some comments on N ¼ 2 SQED with boundary condition and the mirror symmetry.1 Here we use the term ''membrane'' in a broad meaning. We do not claim that our membrane is the same as that considered in M theory.

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Tadashi Okazaki

(0,4) brane box models

Sphere correlation functions and Verma modules

Supersymmetric Boundary Conditions in 3D N=2 Theories

Dualities of corner configurations and supersymmetric indices

Supersymmetric boundary conditions in three-dimensionalN=2theories

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