An \(\mathcal{N} = 1\) Lagrangian for an \(\mathcal{N} = 3\) SCFT
From MaRDI portal
Publication:2024232
DOI10.1007/JHEP01(2021)062zbMath1459.81115arXiv2007.14955OpenAlexW3118579597MaRDI QIDQ2024232
Publication date: 3 May 2021
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2007.14955
Supersymmetric field theories in quantum mechanics (81T60) Renormalization group methods applied to problems in quantum field theory (81T17)
Related Items (9)
S-confining gauge theories and supersymmetry enhancements ⋮ Branes and symmetries for \(\mathcal{N} = 3\) S-folds ⋮ Dualities of adjoint SQCD and supersymmetry enhancement ⋮ Multi-planarizable quivers, orientifolds, and conformal dualities ⋮ Exceptional moduli spaces for exceptional \(\mathcal{N} = 3\) theories ⋮ Vanishing short multiplets in rank one 4d/5d SCFTs ⋮ \(S^1\) reduction of 4D \(\mathcal{N} = 3\) SCFTs and squashing independence of ABJM theories ⋮ 1-form symmetry, isolated \(\mathcal{N} = 2\) SCFTs, and Calabi-Yau threefolds ⋮ Deconfining \(\mathcal{N} = 2\) SCFTs or the art of brane bending
Cites Work
- Tinkertoys for the \(D_N\) series
- Sicilian gauge theories and \(\mathcal{N} = 1\) dualities
- Tinkertoys for Gaiotto duality
- Central charges of \(\mathcal N = 2\) superconformal field theories in four dimensions
- S-duality in \(N = 2\) supersymmetric gauge theories
- On the superconformal index of \(\mathcal{N} = 1\) IR fixed points. A holographic check
- Bootstrapping \( \mathcal{N}=3 \) superconformal theories
- 4d \( \mathcal{N}=1 \) from 6d (1, 0)
- Differential operators for superconformal correlation functions
- \(N = 3\) SCFTs in 4 dimensions and non-simply laced groups
- Weakly coupled conformal manifolds in \(4d\)
- IR free or interacting? A proposed diagnostic
- Applications of the superconformal index for protected operators and \(q\)-hypergeometric identities to \({\mathcal N}=1\) dual theories
- The exact superconformal \(R\)-symmetry maximizes \(a\)
- Electric-magnetic duality in supersymmetric non-abelian gauge theories
- Exactly marginal operators and duality in four-dimensional \(N=1\) supersymmetric gauge theory
- New phenomena in \(\text{SU}(3)\) supersymmetric gauge theory
- 4d \( \mathcal{N}=3 \) indices via discrete gauging
- On 4d rank-one \( \mathcal{N}=3 \) superconformal field theories
- Deformations of superconformal theories
- \( \mathcal{N} =1\) deformations and RG flows of \( \mathcal{N} =2\) SCFTs. II: Non-principal deformations
- \( \mathcal{N}=3 \) four dimensional field theories
- On four dimensional \(N=3\) superconformal theories
- Expanding the landscape of \( \mathcal{N}= 2\) rank 1 SCFTs
- S-folds and 4d \( \mathcal{N} =3\) superconformal field theories
- Studying superconformal symmetry enhancement through indices
- A ``Lagrangian for the \(E_7\) superconformal theory
- Compactifications of 5\(d\) SCFTs with a twist
- \( \mathcal{N}=1 \) deformations and RG flows of \(\mathcal{N}=2 \) SCFTs
- 4d \(\mathcal{N} =2\) theories with disconnected gauge groups
- \( \mathcal{N} =1\) Lagrangians for generalized Argyres-Douglas theories
- Exceptional \( \mathcal{N}=3 \) theories
- Anomaly matching on the Higgs branch
- Lagrangians for generalized Argyres-Douglas theories
- Geometric constraints on the space of \( \mathcal{N}=2 \) SCFTs. I: Physical constraints on relevant deformations
- Geometric constraints on the space of \( \mathcal{N}=2\) SCFTs. II: Construction of special Kähler geometries and RG flows
- Geometric constraints on the space of \( \mathcal{N}=2\) SCFTs. III: Enhanced Coulomb branches and central charges
- Generalized global symmetries
- \(N=4\) dualities
- An \(N=2\) superconformal fixed point with \(E_6\) global symmetry
- New \(N = 2\) superconformal field theories in four dimensions
- Gauge theories and Macdonald polynomials
- The superconformal index of the \(E_{6}\) SCFT
- Infinite chiral symmetry in four dimensions
- Reflection groups and 3d \(\mathcal{N} \geq 6\) SCFTs
- \(\mathcal{N} = 1\) conformal dualities
- An index for 4 dimensional super conformal theories
- Geometric classification of 4d \( \mathcal{N}=2 \) SCFTs
- Multiplets of superconformal symmetry in diverse dimensions
- Exactly marginal deformations and global symmetries
- An \(\mathcal{N} = 1\) Lagrangian for the rank 1 \( E_6\) superconformal theory
- Superconformal index of ${ \mathcal N }=3$ orientifold theories
- The supersymmetric index in four dimensions
- Correlation functions of conserved currents in calN = 2 superconformal theory
- Finite-N corrections to the superconformal index of S-fold theories
This page was built for publication: An \(\mathcal{N} = 1\) Lagrangian for an \(\mathcal{N} = 3\) SCFT
