Gauge theories, tessellations \& Riemann surfaces
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Publication:270758
DOI10.1007/JHEP06(2014)053zbMath1333.81250arXiv1402.3846MaRDI QIDQ270758
Publication date: 7 April 2016
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1402.3846
Supersymmetric field theories in quantum mechanics (81T60) Yang-Mills and other gauge theories in quantum field theory (81T13) Tilings in (2) dimensions (aspects of discrete geometry) (52C20) Relationships between algebraic curves and physics (14H81) Riemann surfaces (30Fxx)
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Bipartite field theories and D-brane instantons, Gauge theories and dessins d'enfants: beyond the torus
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Cites Work
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- The statistics of vacuum geometry
- The geometry of on-shell diagrams
- Quivers as calculators: counting, correlators and Riemann surfaces
- String theory origin of bipartite scfts
- New directions in bipartite field theories
- On the classification of brane tilings
- Gravity in twistor space and its Grassmannian formulation
- Counting BPS operators in gauge theories: quivers, syzygies and plethystics
- The beta ansatz: a tale of two complex structures
- Toric CFTs, permutation triples, and Belyi pairs
- Calabi-Yau orbifolds and torus coverings
- Numerical elimination and moduli space of vacua
- Scattering amplitudes and toric geometry
- Double handled brane tilings
- Exploring the vacuum geometry of \(\mathcal N=1\) gauge theories
- Children's drawings from Seiberg-Witten curves
- Mastering the master space
- D-brane gauge theories from toric singularities and toric duality
- Brane tilings and specular duality
- Network and Seiberg duality
- Bipartite field theories: from D-brane probes to scattering amplitudes
- Editorial. Computational algebraic geometry in string and gauge theory
- Characterizing the vertex neighbourhoods of semi-regular polyhedra
- Brane tilings and reflexive polygons
- Dimer models and Calabi-Yau algebras
- BIPARTITA: PHYSICS, GEOMETRY & NUMBER THEORY
- Algebraic Combinatorics
- Modular subgroups, dessins d’enfants and elliptic K3 surfaces
- SINGULAR
- ${\cal N}=2$ N = 2 gauge theories: Congruence subgroups, coset graphs, and modular surfaces
