Quantum Seiberg-Witten curve and universality in Argyres-Douglas theories
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Publication:2316112
DOI10.1016/j.physletb.2019.03.024zbMath1416.81191arXiv1903.00168OpenAlexW2920252597MaRDI QIDQ2316112
Katsushi Ito, Takafumi Okubo, Saki Koizumi
Publication date: 26 July 2019
Published in: Physics Letters. B (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1903.00168
Supersymmetric field theories in quantum mechanics (81T60) Yang-Mills and other gauge theories in quantum field theory (81T13)
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Cites Work
- Deformed prepotential, quantum integrable system and Liouville field theory
- Seiberg-Witten prepotential from instanton counting
- ABCD of instantons
- Erratum: Electric-magnetic duality, monopole condensation, and confinement in \(N=2\) supersymmetric Yang-Mills theory
- New phenomena in \(\text{SU}(3)\) supersymmetric gauge theory
- Solutions to the reflection equation and integrable systems for \(N=2\) SQCD with classical groups
- Quantum periods for \(\mathcal{N} = 2 \operatorname{SU}(2)\) SQCD around the superconformal point
- Integrable systems and supersymmetric gauge theory
- New \(N = 2\) superconformal field theories in four dimensions
- Study of \(N=2\) superconformal field theories in 4 dimensions
- Recursive method for the Nekrasov partition function for classical Lie groups
- Nekrasov functions from exact Bohr–Sommerfeld periods: the case ofSU(N)
- Spectral determinants for Schrödinger equation and \({\mathbb{Q}}\)-operators of conformal field theory
