B-branes and supersymmetric quivers in 2d
From MaRDI portal
Publication:1748743
DOI10.1007/JHEP02(2018)051zbMath1387.81347arXiv1711.10195WikidataQ65683186 ScholiaQ65683186MaRDI QIDQ1748743
Jirui Guo, Eric Sharpe, Cyril Closset
Publication date: 14 May 2018
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1711.10195
String and superstring theories in gravitational theory (83E30) Supersymmetric field theories in quantum mechanics (81T60) Calabi-Yau manifolds (algebro-geometric aspects) (14J32) Calabi-Yau theory (complex-analytic aspects) (32Q25) Topological field theories in quantum mechanics (81T45) Space-time singularities, cosmic censorship, etc. (83C75)
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Cites Work
- Unnamed Item
- Unnamed Item
- Half-twisted correlators from the Coulomb branch
- A mathematical theory of quantum sheaf cohomology
- Quantum sheaf cohomology on Grassmannians
- The gravitational sector of 2d (0, 2) F-theory vacua
- Large volume perspective on branes at singularities
- Duality in two-dimensional \((2,2)\) supersymmetric non-abelian gauge theories
- Homogeneous vector bundles
- Notes on certain \((0,2)\) correlation functions
- Computation of superpotentials for D-branes
- Dimer models from mirror symmetry and quivering amoebæ
- Two-dimensional twisted sigma models and the theory of chiral differential operators
- Chiral algebras of \((0,2)\) models: Beyond perturbation theory
- Notes on certain other \((0,2)\) correlation functions
- A large-\(N\) reduced model as superstring
- Orbifold resolution by D-branes
- D-branes, orbifolds, and Ext groups
- D-branes and quotient singularities of Calabi-Yau four-folds.
- Superconformal field theory on threebranes at a Calabi-Yau singularity
- Brane box realization of chiral gauge theories in two dimensions
- Anomalous \(\text{U}(1)\)'s in type I and type IIB \(D=4\), \(N=1\) string vacua
- D-branes, derived categories, and Grothendieck groups
- D-brane gauge theories from toric singularities and toric duality
- Brane brick models, toric Calabi-Yau 4-folds and 2d \((0,2)\) quivers
- Localization of twisted \( \mathcal{N}=(0,2)\) gauged linear sigma models in two dimensions
- F-theory and \(2d (0, 2)\) theories
- Chiral 2d theories from \(N=4\) SYM with varying coupling
- Brane brick models in the mirror
- Quadrality for supersymmetric matrix models
- A proposal for \((0, 2)\) mirrors of toric varieties
- Non-spherical horizons. I
- D-branes on Calabi-Yau manifolds and superpotentials
- On the geometry of quiver gauge theories (stacking exceptional collections)
- Violation of the phase space general covariance as a diffeomorphism anomaly in quantum mechanics
- Exact solutions of 2d supersymmetric gauge theories
- Phases of \(N=2\) theories in two dimensions
- Topological heterotic rings
- Lie algebra cohomology and the generalized Borel-Weil theorem
- Two-dimensional models with \((0,2)\) supersymmetry: perturbative aspects
- Physical aspects of quantum sheaf cohomology for deformations of tangent bundles of toric varieties
- Chiral operators in two-dimensional \((0,2)\) theories and a test of triality
- 2d (0,2) quiver gauge theories and D-branes
- D-branes, categories and N=1 supersymmetry
- 4D Conformal Field Theories and Strings on Orbifolds
- D-branes on the quintic
- Introduction to \(A\)-infinity algebras and modules
- A geometric unification of dualities
